Abstract:
A variable gain impedance controller for use in a control system for controlling a motorized prosthetic or orthotic apparatus provided with a joint The controller comprises a sensor input for receiving a signal indicative of an interaction between the apparatus and the ground, a torque sensor input for receiving a signal indicative of the torque at the joint and a variable gain scheduler in communication with the sensor input so as to receive data therefrom thereby providing a variable torque gain. The variable gain impedance controller adjusts its control on the apparatus based on the variable torque gain and the indicated torque so as to a) increase the joint resistance to motion when the signal received from the sensor input indicates an interaction between the apparatus and the ground and b) decrease the joint resistance to motion when the signal received from the sensor input indicates an absence of interaction between the apparatus and the ground.

Description:
CROSS-REFERENCE TO RELATED APPLICATION 
       [0001]    The present application claims the benefits of U.S. provisional patent application No. 60/881,168 filed Jan. 19, 2007, which is hereby incorporated by reference. 
     
    
     TECHNICAL FIELD 
       [0002]    The present invention relates to a reactive layer control system for prosthetic and orthotic devices. 
       BACKGROUND 
       [0003]    Prosthetic and orthotic devices for restoring or replacing lost lower-limb functions have been available for many years. Until recently, both types of devices were found as purely mechanical linkages making advantageous usage of simple mechanisms in order to preclude knee buckling in level walking stance phase, while still ensuring some form of swing motion during the aerial phase. While this type of device was shown to be fairly efficient in restoring the structural aspects of the lower-limb role in gait, their incapacity to properly sustain the wide variety of lower-limb dynamics associated with the various gait locomotion activities performed on a daily basis appeared as a sufficient limitation to sustain the development of more advanced devices. 
         [0004]    While significant efforts were directed towards designing more advanced mechanisms allowing easier adjustment, or more progressive action, through pneumatics and hydraulics, the rapid advances in energy storage and computer technologies soon allowed to extend the realm of capacities associated with typical orthotic and prosthetic devices. Real-time configuration of passive braking devices such as disclosed, for example, in U.S. Pat. No. 5,383,939 and US Patent Application Publication No. 2006/0136072 A1, greatly improved the adaptability of prosthetic devices to user gait specificities or to variations of the environment in which the locomotion tasks are performed. Moreover, these prosthetic devices allowed the addressing of energy dissipative locomotion tasks in a physiologically-compliant manner never seen before. Although showing increased performance and dynamic adaptation with respect to the locomotion tasks being undertaken when compared to their predecessors, this first generation of computer-controlled prosthetic devices still lacked the adaptability and flexibility required to smoothly integrate into users daily lives. 
         [0005]    Integration of computer controls to the prosthetic and orthotic devices brought about the necessity for some sort of control system in order to link sensory inputs to the now dynamically configurable actuator. However, the purely dissipative nature of these devices greatly simplifies the problem as mechanical power exchanges between the user and the device are unidirectional (i.e., user has to initiate all tasks and provide mechanical power). 
         [0006]    Latest efforts in the field of advanced orthotic and prosthetic devices, such as disclosed, for example, in US Patent Application Publication No. 2004/0181289 A1, partly resolved some of the limitations observed in the first generation of computer-controlled orthotic and prosthetic devices by providing a fully motorized prosthetic platform, allowing to address all major locomotion tasks, irrespective of their generative or dissipative nature. Requirements for computer-controlled system appeared quite more complex as the interactions between the user and the prosthetic or orthotic device were no longer solely initiated by the user himself. Through the use of a two layer control system, the motorized prosthetic or orthotic device allowed to efficiently manage the mechanical power exchange between the user and the device, such that the synergy between user and motorized prosthetic or orthotic device globally benefited the user. Adequate usage of the prosthetic or orthotic device capacity to generate mechanical power was observed to lead to increased gait quality and activity levels. 
         [0007]    Nevertheless, the use of strict state machines to implement the artificial intelligence engine as the highest layer of the prosthetic or orthotic device control system is observed to impose a certain formalism on the manner in which the user executes typical locomotion tasks. While generating a certain learning burden on the user side, the use of firm triggers in order to trigger either distinct state transition or specific joint behavior greatly affects man-machine symbiosis. Moreover, limitations associated with the use of a strict state machine artificial intelligence engine when working in a highly variable environment (i.e., external environment and user himself) are well known and quickly show up as robustness issues from a system perspective. Finally, processing associated with the extraction of complex features associated with specific locomotion task detection is also known to generate a latency between measurement of the sensors value and implementation of the actual actions, which is often observed to greatly affect the prosthetic or orthotic device usability and performance. 
         [0008]    Furthermore, common prosthetic or orthotic devices lack the ability to properly reproduce natural knee joint behavior and dynamic properties when used in a context that significantly differs from typical locomotion tasks. While generation of proper joint dynamics during cyclical locomotion portions ensure high symbiosis and user benefits, limitations observed in the capacity to reproduce natural joint compliance, or motions, in either non-locomotor or non-cyclical tasks significantly affect orthotic, or prosthetic, device usability and, accordingly, associated user benefits. 
         [0009]    Based on these last observations, it clearly appears that requirements for an improved orthotic and prosthetic control system exist. More specifically, a need to develop a control system architecture and associated engines that are able to sustain more efficiently limited ambulation, as well as non-cyclical and cyclical gait for users suffering of either amputation of-the lower-limb or dysfunction requiring the use of an orthosis or prosthesis exists. 
       SUMMARY 
       [0010]    In accordance with an aspect of the present invention there is provided a variable gain impedance controller for use in a control system for controlling a prosthetic or orthotic apparatus provided with a joint, the controller comprising:
       a sensor input for receiving a signal indicative of an interaction between the apparatus and the ground;   a torque sensor input for receiving a signal indicative of the torque at the joint and   a variable gain scheduler in communication with the sensor input so as to receive data therefrom thereby providing a variable torque gain;   wherein the variable gain impedance controller adjusts its control on the apparatus based on the variable torque gain and the indicated torque so as to increase the joint resistance to motion when the signal received from the sensor input indicates an interaction between the apparatus and the ground.       
 
         [0015]    In accordance with another aspect of the present invention there is provided a variable gain impedance controller for use in a control system for controlling a motorized prosthetic or orthotic apparatus provided with a joint, the controller comprising:
       a sensor input for receiving a signal indicative of an interaction between the apparatus and the ground;   a torque sensor input for receiving a signal indicative of the torque at the joint; and   a variable gain scheduler in communication with the sensor input so as to receive data therefrom thereby providing a variable torque gain;   wherein the variable gain impedance controller adjusts its control on the apparatus based on the variable torque gain and the indicated torque so as to decrease the joint resistance to motion when the signal received from the sensor input indicates an absence of interaction between the apparatus and the ground.       
 
         [0020]    In accordance with a further aspect of the present invention there is provided a variable gain impedance controller for use in a control system for controlling a motorized prosthetic or orthotic apparatus provided with a joint, the controller comprising:
       a sensor input for receiving a signal indicative of an interaction between the apparatus and the ground;   a torque sensor input for receiving a signal indicative of the torque at the joint; and   a variable gain scheduler in communication with the sensor input so as to receive data therefrom thereby providing a variable torque gain;   wherein the variable gain impedance controller adjusts its control on the apparatus based on the variable torque gain and the indicated torque so as to a) increase the joint resistance to motion when the signal received from the sensor input indicates an interaction between the apparatus and the ground, and b) decrease the joint resistance to motion when the signal received from the sensor input indicates an absence of interaction between the apparatus and the ground.       
 
     
    
     
       BRIEF DESCRIPTION OF THE FIGURES 
         [0025]    Embodiments of the invention will be described by way of example only with reference to the accompanying drawings, in which: 
           [0026]      FIG. 1  is a block diagram of the interaction between various control system layers and major building blocks of a motorized prosthetic and/or orthotic device; 
           [0027]      FIG. 2  is an isometric view of a motorized knee prosthesis; 
           [0028]      FIG. 3  is a schematic representation of the lower-limb mechanical power exchange during ground contact phase; 
           [0029]      FIG. 4  is a schematic representation of the lower-limb mechanical power exchange during aerial phase; 
           [0030]      FIG. 5  is a block diagram of a variable gains impedance controller basic formulation; 
           [0031]      FIG. 6  is a flow diagram of a gain scheduling mechanism and associated reference engine; 
           [0032]      FIG. 7  is a block diagram of a variable gains impedance controller with breaking feedback transfer function; 
           [0033]      FIG. 8  is a chart illustrating the braking reactive behavior activation subspace; and 
           [0034]      FIG. 9  is a block diagram of a variable gains impedance controller with energy injection feedforward function. 
       
    
    
     DETAILED DESCRIPTION 
       [0035]    Generally stated, the non-limitative illustrative embodiment of the present invention provides a reactive layer control system for motorized prosthetic or orthotic devices for restoring lost locomotor functions, or facilitate gait re-education resulting from various pathologies occurrence. The reactive layer control system is part of a multi-layered controller and is based on impedance control, which directly manages a subset of lower-limb joint behaviors allowing the sustaining of highly efficient mechanical power exchanges between the user and a prosthetic or orthotic apparatus. 
         [0036]    Referring to  FIG. 1 , there is shown a block diagram of a motorized prosthetic and/or orthotic device  200  which comprises a multi-layered controller  100  that may be used to control a motorized prosthetic or orthotic apparatus  140  such as, for example, the motorized knee prosthesis  10  of  FIG. 2 . 
         [0037]    Referring now to  FIG. 2 , the motorized knee prosthesis  10  includes a proximal connector  17  sitting on top of an actuator  12  which is axially mounted at the knee joint  11  level. In this example, the actuator  12  may be, for example, a DC brushless motor serially connected to a reduction mechanism. The reduction mechanism of the actuator  12  allows the conversion of the motor high-speed low-torque output characteristics into a low-speed high-torque output that is more coherent with the requirements associated with the human knee joint role in most commonly encountered locomotor tasks. A second transmission stage is then provided in order to connect the reduction mechanism output to the shank structure  13  of the motorized knee prosthesis  10 . This second transmission stage is composed of a compliant linkage  14 , allowing both measurement of the net torque present at the interface between the shank structure  13  and the actuator  12  output and high-efficiency level walking stance flexion energy storage and return. 
         [0038]    The motorized knee prosthesis  10  also integrates sensors required to sustain the multi-layered controller  100  (see  FIG. 1 ). A first position encoder (not shown) is integrated to the transmission assembly of the actuator  12  such that the relative position between the user thigh segment (not shown) and the reduction mechanism output is measured in real-time. Net torque present at the interface between the shank structure  13  and the actuator  12  output is measured through the deflection of the compliant linkage  14  transmitting motion between both parts  12 ,  13 , using a second position encoder (not shown) mounted in the transmission assembly of the actuator  12  for that purpose. A load cell assembly  19  containing one or two load cells  16  is located at the distal shank portion  15 , between the shank structure  13  and the distal connector  18  of the motorized knee prosthesis  10 , to quantify the stress found in the distal shank portion  15 . 
         [0039]    It is to be understood that although the motorized knee prosthesis  10  described above has been given as an example of the motorized prosthetic or orthotic apparatus  140 , the multi-layered controller  100  may be similarly used with other motorized prostheses or orthoses having general characteristics similar to that of the motorized knee prosthesis  10 . More specifically, the multi-layered controller  100  may be similarly used with motorized or actuated prostheses or orthoses having means for measuring the net torque of its actuator output, means for detecting ground contact and means for measuring the position of its actuator. 
         [0040]    Referring back to  FIG. 1 , the multi-layered controller  100  is particularly well suited for optimizing the synergy between a user and motorized prosthetic and/or orthotic device  200  through the implementation of motorized prosthetic or orthotic apparatus  140  joint behaviors similar to those which may be observed on a sound human knee joint. 
         [0041]    The multi-layered controller  100  includes, but is not limited to, three layers herein referred to as the learning layer  110 , the inference layer  120  and the reactive layer  130 . Layering of the multi-layered controller  100  aims at providing a systematic way of distributing the functionalities of the multi-layered controller  100  with respect to their level of abstraction, hence allowing the definition of a coherent and straightforward architecture. It is to be understood that the multi-layered controller  100  may include more or less than three layers. 
         [0042]    In order to interact with the environment  150  it evolves in, the motorized prosthetic and/or orthotic device  200  includes, but is not limited to, sensors  142  providing information about the environment  150  and the motorized prosthetic or orthotic apparatus  140  to the multi-layered controller  100 , and one or more actuator  144 , controlled by the multi-layered controller  100 , to generate behavior allowing to sustain an optimal interaction with the environment  150 . For example, in the case of the motorized knee prosthesis  10  of  FIG. 2 , the first and second position encoders (not shown), the compliant linkage  14  and the load cells  16  would compose sensors  142  while the actuator  12  would compose actuator  144 . 
       Multi-Layered Controller 
       [0043]    While all three layers  110 ,  120 ,  130  of the multi-layered controller  100  operate as stand-alone entities, information is propagated across the layers  110 ,  120 ,  130  such that lower-level layer mechanisms may beneficiate from information provided by higher-level layers. In such a multi-layered controller  100 , decisions are performed independently inside of the different layers  110 ,  120 ,  130  characterized by different data abstraction levels, while propagation of information towards the lower-level layers ensures the adaptation of the lower-level layer mechanisms. In a similar fashion, information provided by the lower-level layers is merged into higher abstraction level representations when moved towards the higher-level layers. 
       Learning Layer 
       [0044]    The learning layer  110  represents the highest data abstraction level of the multi-layered controller  100 . More specifically, the data abstraction level associated with this layer is characterized as the user data. Functionalities associated with this level of the multi-layered controller  100  relate to the recursive improvement of the high level strategies to address locomotion tasks, as they are accomplished, and their relative performance assessed. At this level, representations of the user gait specificities identified during the evolution of the synergy between the user and the motorized prosthetic and/or orthotic device  200  are updated and stored. 
       Inference Layer 
       [0045]    The inference layer  120  contains locomotion task level information and functionalities. At this abstraction level are found the engines required to perform locomotion task identification and characterization. Most of the work performed at this level consists in extracting typical features from the raw input data stream from the sensors  142  such that the locomotion task performed by the user may be characterized and system behavior adjusted according to the high-level information readily available from the learning layer  110 . 
       Reactive Layer 
       [0046]    At the lowest level, the reactive layer  130  sustains the implementation of general classes of joint behaviors that are common to a large subset of locomotor and non-locomotor activities. Similarly to the arc-reflex present in the human locomotor system, the reactive layer  130  is used in order to directly link low-level sensory inputs from the sensors  142  to either joint actions or behaviors of motorized prosthetic or orthotic apparatus  140  through the actuator(s)  144 . Major benefits associated with integration of such reactive behaviors in a multi-layered controller  100  arise from the fact that these behaviors allow a reduced dependency on high-level decisions in order to implement specific actions. 
         [0047]    Reducing dependency between high-level decision making and actions allows the reduction of latencies related to processing of high-level information and to generate simpler, more robust, mapping between sensory inputs from the sensors  142  and actions via the actuator(s)  144 . Moreover, while generating more human-like behaviors from a user perspective, such implementation provides greater flexibility to the user who now find himself in full control of the motorized prosthetic or orthotic device&#39;s  200  most basic behaviors. 
         [0048]    Linking low-level triggering mechanisms to the basic joint behaviors increases system conviviality and realm of performance, as it is still possible to trigger higher-level mechanisms generating more complex joint behaviors or motions, that will be simply defined as specialization of the more basic behaviors. This way, complex motions or elaborate joint behaviors may be generated from adding specific information to the basic behavior implicitly provided by the lowest-level layers of the multi-layered controller  100 . 
         [0049]    An example of a controller implementing a learning layer  110  and an inference layer  120  is shown in US Patent Application Publication No. 2006/0122710 A1 entitled “CONTROL DEVICE AND SYSTEM FOR CONTROLLING AN ACTUATED PROSTHESIS” by Bedard. The reactive layer  130  will be further explained below. 
         [0050]    Reactive Layer Control System 
         [0051]    A reactive layer control system for motorized prosthetic or orthotic devices according to an illustrative embodiment of the present invention relates to the definition of a reactive layer engine which may be used within the context of a multi-layered controller, such as the multi-layered controller  100  of  FIG. 1 . 
         [0052]    The reactive layer control system is based on a variable gain impedance controller and has for goal to increase the synergy between the user and the motorized prosthetic and/or orthotic device  200  for all types of locomotion activities while directing specific attention towards system performance improvement for non-cyclical ambulation tasks. Improvement of motorized prosthetic and/or orthotic device  200  performance for limited ambulation locomotion tasks requires a greater flexibility of the reactive layer  130  such that general motorized prosthetic and/or orthotic device  200  behaviors may fulfill user requirements in a non-model based framework. Use of a model-based framework to manage locomotion tasks not presenting obvious physiological characteristics or high inter-subject variability presents severe limitation to the motorized prosthetic and/or orthotic device  200 . Failure to generate a complete and robust mapping between the sensory inputs and the required actions actually impairs the general feasibility of a model-based framework. 
         [0053]    However, definition of basic motorized prosthetic or orthotic apparatus  140  joint behaviors showing high correlation to the lower-limb joints physiological behavior and their integration to the lowest level of a multi-layered controller, such as the multi-layered controller  100  of  FIG. 1 , allows to implicitly fulfill specific tasks requirements, while leaving full control of the motorized prosthetic and/or orthotic device  200  behavior to the user. 
         [0054]    The overall objective of the reactive layer control system is to reduce the dependency between decision and action for a general class of behaviors that may be compared to human arc-reflex. The general class of behaviors is found as the basic behaviors underlying most of the locomotion tasks. Implementation of reactive behaviors in the motorized prosthetic and/or orthotic device  200  leads to an increase in robustness and a significant reduction of the constraints associated with traditional decision process for a system where all actions are sustained by explicit decisions. 
         [0055]    High fidelity reproduction of the human knee joint natural behavior is required in order to properly sustain limited ambulation tasks, generally improve mechanical power exchange management and ease constraints related to synchronization of the motorized prosthetic or orthotic apparatus  140  joint behavior transition with overall dynamics of the user. 
         [0056]    Human knee joint role in gait for locomotor and non-locomotor tasks may be classified in general classes of joint behaviors as illustrated in the following table: 
         [0000]    
       
         
               
             
               
               
               
             
           
               
                 TABLE 1 
               
             
             
               
                   
               
               
                 Joint behavior classes 
               
             
          
           
               
                   
                   
                 Reactive Controller 
               
               
                 Joint behavior class 
                 Behavior 
                 Behavior 
               
               
                   
               
               
                 Passive 
                 motion without force (e.g., 
                 perturbation force 
               
               
                   
                 aerial phase) 
                 matching 
               
               
                 Isometric 
                 support without motion 
                 perturbation force 
               
               
                   
                 (e.g., contact phase) 
                 rejection 
               
               
                 Eccentric 
                 energy dissipation 
                 braking 
               
               
                 Concentric 
                 mechanical power 
                 energy injection 
               
               
                   
                 generation 
               
               
                   
               
             
          
         
       
     
         [0057]    These general classes of joint behavior may then be directly managed through the implementation of an associated reactive layer controller behavior. 
         [0058]    Impedance Control 
         [0059]    The reactive layer control system is built around a typical implementation of an impedance controller. The impedance controller was first introduced by Hogan in 1985, see [1], [2] and [3], as a first step in defining a general and unified approach to the control of manipulation by robotic devices. While being very general, this specific control scheme is rather well suited for managing tasks where highly dynamic interactions between a robotic device and the environment are present. Apart from other traditional control schemes targeting the individual control of actuator variables such as torque or position control, impedance control implements a scheme where the overall objective is defined as implementing a dynamic relationship between actuator variables, such as torque and position. In other words, the impedance controller does not try to track specific trajectories, but instead attempts to regulate the relationship between actuator velocity and force. The dynamic relationship between actuator force and velocity is generally known as “mechanical impedance”. This nomenclature arise from similarity to the electrical quantity found as the ratio of an effort variable (i.e. voltage) to a flow variable (i.e. current). In the Laplace domain, mechanical impedance may be represented as follows: 
         [0000]    
       
         
           
             
               
                 
                   
                     Z 
                      
                     
                       ( 
                       s 
                       ) 
                     
                   
                   = 
                   
                     
                       F 
                        
                       
                         ( 
                         s 
                         ) 
                       
                     
                     
                       V 
                        
                       
                         ( 
                         s 
                         ) 
                       
                     
                   
                 
               
               
                 
                   Equation 
                    
                   
                       
                   
                    
                   1 
                 
               
             
           
         
       
     
         [0060]    where
       Z(s) is the mechanical impedance;   F(s) is the actuator force; and   V(s) is the actuator velocity.       
 
         [0064]    At the opposite, mechanical admittance describes the dynamic relationship between actuator velocity and force. In the Laplace domain, mechanical admittance may be represented as follows: 
         [0000]    
       
         
           
             
               
                 
                   
                     Y 
                      
                     
                       ( 
                       s 
                       ) 
                     
                   
                   = 
                   
                     
                       V 
                        
                       
                         ( 
                         s 
                         ) 
                       
                     
                     
                       F 
                        
                       
                         ( 
                         s 
                         ) 
                       
                     
                   
                 
               
               
                 
                   Equation 
                    
                   
                       
                   
                    
                   2 
                 
               
             
           
         
       
     
         [0065]    where
       Y(s) is the mechanical admittance;   V(s) is the actuator velocity; and   F(s) is the actuator force.       
 
         [0069]    While the relationships represented by Equations 1 and 2 are generally interchangeable for linear systems operating at finite frequencies, this is not the case for typical prosthetic or orthotic applications, which are generally highly non-linear. Moreover, due to the input-output specificities of the mechanical system behaviors described above, it is only possible to physically connect components of different nature. Failure to fulfill this requirement actually makes impossible proper management of the mechanical power exchanges at the interface ports, as both components will try to impose the same physical quantity. 
         [0070]    As far as the description of lower-limb joints physical behavior is concerned, one has first to consider that the structure of the human lower-limb, coupled with locomotor and non-locomotor gait specificities, generate two different mechanical configurations  30 ,  40 , represented conceptually in  FIGS. 3 and 4 , respectively. In a first configuration  30 , the lower-limb joint  34  is located between the external environment (i.e. ground)  32  and the user&#39;s upper body mass  36 . In a second configuration  40 , the lower-limb joint  44  is located between the hanging distal limb mass  42  and the user&#39;s upper body mass  46 , and is thus submitted to significant dynamic efforts. For the first configuration  30 , velocity constraints are imposed on the lower-limb joints  34  (i.e. healthy joints and prosthetic or orthotic joints) by the ground  32  on the distal end and by the user&#39;s upper body mass  36  on the proximal end. As for the second configuration  40 , velocity constraints are imposed on the lower-limb joints  44  (i.e. healthy joints and prosthetic or orthotic joints) by the distal limb  42  (residual limb or prosthesis) dynamics on the distal end and by the user&#39;s upper body mass  46  on the proximal end. 
         [0071]    It is to be understood that “ground” is meant to mean, in the context of this specification, any surface on which a user may use the motorized prosthetic and/or orthotic device  200  during locomotion activities 
         [0072]    Ground Contact Phase 
         [0073]      FIG. 3  provides a high-level representation of the lower-limb components interactions during ground contact phase through the use of mechanical impedance/admittance. An impedance is a system characterized by its capacity to accept a flow input V(s) (i.e., velocity) and yield an effort F(s) (i.e., force). An admittance is a system characterized by its capacity to accept effort inputs F(s) (i.e., force) and yield a flow V(s) (i.e., velocity). 
         [0074]    In order for mechanical power exchange to take place between both types of system, input-output variables V(s) and F(s) must be matched. Since it is not possible to impose a velocity to the ground  32 , it is modeled as an admittance. Connecting any type of lower-limb device to the ground  32  then requires this latter to be defined as an impedance. Furthermore, the upper body mass  36  is also modeled as a admittance as it may only impose velocity on the lower-limb joints  34  and segments. Force observed in the lower-limb joints  34  during the ground contact phase then arise from the impedance of the joints themselves. Thus, it may be observed that in configuration  30 , the lower-limb joints  34  form a system optimally represented as an impedance interacting with the user&#39;s body mass  36  and ground  32 , both modeled as admittance. 
       Aerial Phase 
       [0075]      FIG. 4  provides a high-level representation of the lower-limb components interactions during the aerial phase. In this configuration  40 , the lower-limb joints  44  are mainly submitted to the effects of the distal limbs mass  42  and upper body mass  46 . Again, a mass being characterized as an element that accepts force F(s) as input while yielding velocity V(s) as output, it appears necessary to define the behavior of the lower-limb joints  44  as an impedance in order to ensure that stable mechanical power exchanges may take place. Based on these observations, it appears clear that the definition of any lower-limb prosthetic or orthotic devices, motorized or not, must take the form of an impedance if it is desired to optimize user-device synergy and properly manage mechanical power exchange. 
         [0076]    Furthermore, this is also coherent with the role of the lower-limb joints in cyclical locomotion activities, which consists in absorbing shocks generated by the ground contact occurrence, such that body centre of mass trajectory is regulated and smooth progression occurs. Use of an impedance controller in order to manage the prosthetic or orthotic joint behavior then appears as a straightforward solution to the problem at hand. 
       Impedance Controller 
       [0077]    As previously introduced, the impedance controller differs from more traditional motion control schemes through the fact that it does not attempt to track specific control variables, such as force or position, but implements a scheme that allows regulation of the actuator  144  (see  FIG. 1 ) output mechanical impedance. Furthermore, this specific scheme implicitly manages transitions where the actuator  144  physical configuration is changing from non-interacting configuration  40  with the environment to an interacting configuration  30  (see  FIGS. 3 and 4 ), which is not the case with other types of control schemes. 
         [0078]    Referring to  FIG. 5 , there is shown a basic formulation of a variable gains impedance controller  50  that may be implemented at the reactive layer  130  (see  FIG. 1 ). The motorized prosthetic or orthotic apparatus  140  under control is represented by a Laplace-domain double integrator  52 . First, position Θ and velocity {dot over (Θ)} feedback loops  51 ,  53  are closed to form a tracking controller where position Θ d  and velocity {dot over (Θ)} d  set-points are used as comparison values for the feedback position Θ and velocity {dot over (Θ)} values. Furthermore, variable gains K P  and K D  are applied to both position and velocity error terms (i.e., difference between the set-point values Θ d  and {dot over (Θ)} d , and the measured feedback values Θ and {dot over (Θ)}). {umlaut over (Θ)} d  represents the acceleration set-point. 
         [0079]    Additionally to what would otherwise be considered as a simple proportional-derivative position controller, interaction between the actuator  144  output port position Θ, with the position perturbation created by the environment Θ e , generates a generalized force τ A  quantifying the interaction force between the actuator  144  output and its environment. This measured force value τ A  is then used as a negative feedback loop  55 , creating an actuator  144  set-point value of the same amplitude as the interaction force, assuming unitary force feedback gain K A , but of opposite sign. Assuming that satisfactory force sensing capacities are available, such system would then show an infinite impedance (i.e. any perturbation force applied on the actuator  144  output would be immediately converted to an opposite actuator  144  reaction, leading to no displacement of the actuator  144  under the action of the external force) without any contribution of the position Θ and velocity {dot over (Θ)} terms. Modification of the force feedback term gain K A  allows the scaling down of the actuator  144  mechanical impedance by reducing the amount of force that is sent back as actuator  144  set-point. 
         [0080]    In such a variable gains impedance controller  50 , position Θ and velocity {dot over (Θ)} terms are used to generate the system dynamic response to either effects of external perturbation Θ e  or modifications to the system&#39;s position Θ d  and velocity {dot over (Θ)} d  set-points. Such combination of proportional-derivative position control and the measured interaction force allows the full compensation of any perturbation present at the system mechanical interaction port, while still allowing to enforce a specific dynamic response. 
         [0081]    A final gain, the mass gain M d   −1 , affects the complete actuator  144  force set-point and is generally considered to allow simulation of system apparent inertia through appropriate scaling of the variable gains impedance controller  50  output. While the variable gains impedance controller  50  basic behavior described above already provides an interesting framework for managing interactions and mechanical power exchanges between the user and the motorized prosthetic and/or orthotic device  200 , coupling of the variable gains impedance controller  50  with a gain scheduling mechanism, which will be described further below, is shown to further extend the realm of implicitly supported behaviors. While use of high-level engines to manage gain scheduling allows the adaptation of prosthetic or orthotic apparatus  140  joint behaviors based on the nature of the locomotion tasks currently executed, lower-level gain scheduling engines allow the adaptation of the variable impedance controller parameters such that optimal use of the inherent behaviors of the variable gains impedance controller is made without compromising system performance from an user standpoint. 
         [0082]    The above described variable gains impedance controller  50  may be used to implicitly implement the first two joint behavior classes of Table 1, namely the Passive and Isometric classes, while its general structure may be used to explicitly integrate the third and fourth joint behavior classes, namely the Eccentric and Concentric classes. 
       Force Matching and Force Rejection Implementations 
       [0083]    As discussed above, the first two joint behavior classes, i.e. Passive and Isometric, are addressed through proper usage of the implicit behaviors of the variable gains impedance controller  50 . These first two joint behaviors classes are considered the most basic ones as all locomotion task will first be characterized as being composed of one, or both, of these behaviors. 
         [0084]    The behavior of the Isometric joint behavior class corresponds to a joint behavior where force without motion is generated, and will be herein associated to a joint behavior where it is desired to provide stability and support, without generating any motion. This behavior is associated with the stance phase of all cyclical and non-cyclical locomotion tasks, where it is advantageous from a safety and usability standpoint to be able to provide support to the user without enforcing any motion. 
         [0085]    Referring back to  FIG. 5 , from a variable gains impedance controller  50  standpoint, such behavior corresponds to an infinite impedance of the actuator  144  output with respect to the effects of external perturbations Θ e . As previously introduced, such behavior is implicitly generated by the variable gains impedance controller  50  assuming that the force feedback gain K A  is adequately selected. In order for an infinite impedance behavior to take place, magnitude of the measured interaction force must be very similar to the one of the force actually imposed on the actuator  144  output, force losses in the actuator  144  and transmission must be accounted for and latency of the actuator  144  reaction with respect to the external perturbation Θ e  must be small enough not affect the closed-loop stability of the variable gains impedance controller  50 . 
         [0086]    With reference to the motorized knee prosthesis  10  of  FIG. 2 , the variable gains impedance controller  50  force feedback loop  55  value τ A  may be provided by the measurement of the net torque found at the interface between the actuator  12  output and shank structure  13 . As previously introduced, measurement of the deflection of the compliant element  14  provides a direct measure of the net torque. While measuring the net torque through a compliant element  14  greatly reduces the sensing bandwidth with respect to other technologies, such technique is shown to provide satisfactory results in the context where human motions are showing only limited bandwidth and allow some flexibility with respect to system reaction latency. 
         [0087]    From a usability perspective, it is advantageous for the motorized prosthetic and/or orthotic device  200  (see  FIG. 1 ) to provide support to the user without actually impairing his capacity to voluntarily move the system  200  from a given position to another one, while maintaining prosthetic or orthotic apparatus  140  joint stability. Such setting is found through the adequate adjustment of the force feedback gain K A  until satisfactory joint impedance is obtained, i.e. leading to a non-infinite joint impedance, with respect to user ability level and personal preferences. 
         [0088]    In a similar manner, the passive joint behavior may be directly implemented using the inherent characteristics of the variable gains impedance controller  50 . As the Passive joint behavior class is directly associated with the aerial phase of any locomotion task, it is advantageous to make the motorized prosthetic and/or orthotic device  200  as compliant as possible, such that overall user-device synergy may benefit from the direct interactions between user residual limb motions and the inertial properties of the motorized prosthetic or orthotic device  200 . Moreover, making the motorized prosthetic and/or orthotic device  200  as compliant as possible during the aerial phase allows the minimization of the inertia reflected at the stump-socket interface (for example, the socket, which is not shown, connects to the proximal connector  17  of the motorized knee prosthesis  10  of  FIG. 2 ). This way, a significant reduction of the apparent weight of the motorized prosthetic and/or orthotic device  200  is obtained from a user perspective, while the motorized prosthetic and/or orthotic device  200  also becomes easier to manipulate. 
         [0089]    From a variable gains impedance controller  50  standpoint, generating a minimum impedance behavior during the aerial phase requires the actuator  144  command signal to act in such a way that the force measured at the actuator  144  output remains null or negligible. Obviously, this requires the actuator  144  output to move in the same direction as the shank structure  13 , such that the net force between both parties remains null or negligible. Assuming again a null contribution of the proportional and derivative terms of the variable gains impedance controller  50 , i.e., K P ≅0 and K D ≅0, this behavior is achieved by modifying the force feedback gain K A  value such that the measured interaction force now becomes a positive set-point to the actuator  144 , i.e., achieved by inverting the sign of the force feedback gain K A . 
         [0090]    Assuming proper selection of the force feedback gain K A  value and minimal latency of the actuator  144  command with respect to the measured force, minimal joint impedance is obtained. Such scheme also provides the benefit of compensating for the actuator  144  mechanical non-linearities, which are known to greatly affect the passive dynamic properties of motorized prosthetic or orthotic systems. This is the major difference between using null gains in a position control scheme and performing perturbation force matching with the variable gains impedance controller  50 . While the position control system would simply turn off the actuator  144 , the variable gains impedance controller  50  with the perturbation force matching approach allows to compensate for actuator  144  dynamic non-linearities, i.e. transmission back-driving torque, actuator motor cogging, actuator motor and transmission bearings friction, hence really minimizing joint impedance. In fact, in the motorized knee prosthesis  10  of  FIG. 2 , only the friction found in the shank structure  13  bearings is not compensated through the perturbation force matching scheme. 
         [0091]    Full compensation of the actuator  144  dynamic non-linearities would require measurement of the external perturbation Θ e  force at another level of the structure, for example at the foot-ground interface. Nevertheless, measurement of the external perturbation Θ e  force at the actuator  144  output is found more flexible with respect to lower-limb mechanical configuration and ensure high co-linearity between force measurement and actuator  144  output. 
         [0092]    As introduced earlier, modification of the gains of the variable gains impedance controller  50  is required in order to change the joint behavior of the motorized prosthetic or orthotic apparatus  140  from a finite impedance level to a null impedance level. This change is limited in scope and is directly correlated with the lower-limb mechanical configurations  30 ,  40 , represented conceptually in  FIGS. 3 and 4 , i.e., ground contact and aerial phase respectively. In order for the reactive layer  130  behavior to take place without affecting overall motorized prosthetic and/or orthotic device  200  performance, it is advantageous to minimize decisional overhead and device behavior transition latency from a user perspective. 
       Gain Scheduling Mechanism 
       [0093]    Referring to  FIG. 6 , there is shown a simplified block diagram of a low-level gain scheduling mechanism and associated inference engine  60  that may be used in order to modify the behavior of the motorized prosthetic and/or orthotic device  200  when a transition from the lower-limb interacting mechanical configuration  30  to the non-interacting configuration  40 , or the opposite, is detected. First, raw sensor signals  61  from the sensors  142  (see  FIG. 1 ) are provided to a detection mechanism in the form of an inference engine  62  in order to identify if the lower-limb mechanical configuration is interacting  30  or non-interacting  40  (see  FIGS. 3 and 4 ) by, for example, detecting ground contact. Various types of sensors  142  may be used in order to sustain the decisional process of the inference engine  62 , for example instrumented plantar orthosis, accelerometers, digital switches, load cells, etc. Advantageously, with reference to  FIG. 2 , a load cell assembly  19  containing one or two load cells  16  located at the distal shank portion  15  maybe used to provide the raw sensor signals  61 . 
         [0094]    The decisional process of the inference engine  62  may implement low-pass filtering of the raw sensor signals  61  combined with single value hysteretic thresholding of the low-pass filtered raw sensor signals  61  in order to identify the lower-limb mechanical configuration  30 ,  40 . Based on the result of the thresholding process, a perturbation force matching  64  or perturbation force rejection  66  gain scheme is provided to the dynamic gain update process  68 . 
         [0095]    The dynamic gain update process  68  then proceeds to the dynamic update of the gains of the variable gains impedance controller  50  using, for example, linear transition patterns or other patterns, where the transition duration is configurable in order to adapt to user personal preferences and gait specificities. In the illustrative embodiment, only the proportional K P , derivative K D , and force feedback K A  gains are modified. The mass gain M d   −1  is maintained unitary and constant. Moreover, while the force feedback gain K A  transition from a negative value to a positive value upon occurrence of a ground contact event, the proportional K P  and derivative K D  gains are maintained to the same values, which are voluntarily selected close to zero. Based on results from experimental trials, a substantially unitary positive force feedback gain K A  during the ground phase coupled to a substantially unitary negative feedback gain K A  during the aerial phase leads to an optimal gain configuration. 
         [0096]    Reactive implementation of the Passive and Isometric joint behavior classes by the variable gains impedance controller  50  provides the underlying foundations to the implementation of any locomotion task and will also define the default behavior of the motorized prosthetic and/or orthotic device  200 . Based on the fact that the combination of these behaviors will sustain all limited ambulation tasks, while leaving the user in full control of the management of mechanical power exchanges, benefits arising from such a scheme are multiple, namely:
       no requirement for a orthotic or prosthetic device—user synchronization mechanism as transitions are initiated by the user and the reaction time of the motorized prosthetic and/or orthotic device  200  is quite short;   no requirement for high-level detection of transitions between isometric and passive joint behavior classes, reducing latencies caused by complex detection mechanisms and delay required to ensure stable transition of the behavior of the motorized prosthetic and/or orthotic device  200 ;   motorized prosthetic and/or orthotic device  200  joints limited impedance in aerial phase increases ease of manipulation in confined spaces and when maneuvering around obstacles;   cyclical locomotion tasks initiation is facilitated as the user provides himself the proper pace and stride length; and   as the gait cycle patterns are not issued from a model, or trajectory generation engine, or time-based mechanism, any activity or gait phase may be interrupted at any instant without compromising user support and safety.
 
Braking implementation
       
 
         [0102]    The third class of lower-limb joint behavior, the Eccentric class, may be advantageously addressed through a software-based braking mechanism implementation. The Eccentric class of joint behavior is concerned with the dissipation of energy by the joint of the motorized prosthetic or orthotic apparatus  140  (see  FIG. 1 ). Generally speaking, the energy is injected from an external source and requires dissipation in order to properly manage joint behavior and resulting motion. For example, on the human healthy limb, Eccentric joint behavior is observed at each extremity of the level walking swing phase, where it is required to stop the knee joint motion due to shank inertia. Moreover, the use of the perturbation force matching behavior previously introduced in the aerial phase tends to accentuate this issue by giving a very low impedance to the knee joint. 
         [0103]    While multiple approaches exist to solve this type of problem, it is advantageous to implement the Eccentric joint behavior class in a reactive fashion to ensure constant behavior and performance from the user standpoint. Moreover, it is advantageous to avoid the use of a trajectory-based mechanisms that only provide limited flexibility and require much tuning to account for inter-user variability. 
         [0104]    Using the general framework provided by the variable gains impedance controller  50  shown in  FIG. 5 , explicit reactive behavior is added to the basic formulation, leading to the block diagram of  FIG. 7 . From a motorized prosthetic and/or orthotic device  200  perspective, implementation of the Eccentric joint behavior class for the aerial mechanical lower-limb configuration  40  (see  FIG. 4 ) is equivalent to managing braking using the actuator  144 . Actuator  144  braking in the aerial configuration  40  may be achieved using many approaches: reduction of the perturbation force matching  64  (see  FIG. 6 ) effort in order to allow natural dissipation to take place, increase of the actuator  144  impedance, and reversal of the actuator  144  motion such that the motor torque is found in the opposite direction as its velocity. 
         [0105]      FIG. 7  shows a variable gains impedance controller  70  based on the variable gains impedance controller  50  of  FIG. 5  to which a braking process has been integrated, the braking process including all of the approaches described above. The braking joint behavior, associated with eccentric muscle activation on the sound limb, is active at all time but its action is controlled through a set of logical conditions on various system variables. Thus, the braking process may be integrated in the variable impedance controller  70  as a braking feedback transfer function  72  subject to conditional execution. Execution conditions are based on three main variables: actuator  144  output position Θ, actuator  144  output velocity {dot over (Θ)} and lower-limb mechanical configuration  30 ,  40 . While in the aerial configuration  40 , the braking process is activated when a velocity threshold is reached in the vicinity of, for example, an end-of-motion bumper or a software-defined maximum target flexion angle. 
         [0106]      FIG. 8  illustrates the velocity-position subspace  80  in which the braking process operates. The hatched regions  82 ,  84  represent the regions where the braking process is activated, otherwise, the braking process remains passive, i.e. f(θ,{dot over (Θ)})=0. In the simplest embodiment of the braking process, the regions  82 ,  84  in which the braking process activates may be defined as both ends of the knee joint motion range of the motorized prosthetic or orthotic apparatus  140  (see  FIG. 1 ). Whenever the joint enters one end of the motion range, delimited by the actuator  144  output angular position extension Θ ext  and output angular position flexion Θ f  activation thresholds, while showing velocity towards the nearest physical motion stop (i.e. bumper) superior to the output angular velocity activation threshold {dot over (Θ)} th , the braking process is activated in order to stop the joint and segment motion of the motorized prosthetic or orthotic apparatus  140  before reaching the physical motion stop. Upon activation of the braking process, the braking feedback transfer function  72  generates an output signal  73  that is removed from the net force command balance  74  that is used as the actuator  144  command signal. 
         [0107]    More specifically, the braking feedback transfer function  72  may be defined as:
       if ({dot over (Θ)}&lt;−{dot over (Θ)} th )&amp; &amp;(Θ&lt;Θ ext ):       
 
         [0000]    
       
         
           
             
               
                 
                   
                     f 
                     = 
                     
                       
                         Θ 
                         . 
                       
                       
                         
                           ( 
                           
                             Θ 
                             + 
                             Δ 
                           
                           ) 
                         
                         2 
                       
                     
                   
                   ; 
                 
               
               
                 
                   Equation 
                    
                   
                       
                   
                    
                   3 
                 
               
             
           
         
       
       
         
           
             if ({dot over (Θ)}&gt;{dot over (Θ)} th )&amp; &amp;(Θ&gt;Θ f ): 
           
         
       
     
         [0000]    
       
         
           
             
               f 
               = 
               
                 
                   Θ 
                   . 
                 
                 
                   
                     ( 
                     
                       
                         Θ 
                         max 
                       
                       + 
                       Δ 
                       - 
                       Θ 
                     
                     ) 
                   
                   2 
                 
               
             
             ; 
           
         
       
       
         
           
             otherwise: 
           
         
       
     
         [0000]      f=0;       where
           f is the braking feedback transfer function;   Δ is the position offset;   Θ is the actuator output position measurement;   Θ ext  is the actuator output position extension activation threshold;   Θ f  is the actuator output position flexion activation threshold;   Θ max  is the actuator output maximum achievable position;   {dot over (Θ)} is the actuator output velocity measurement; and   ±{dot over (Θ)} th  is the actuator output angular velocity activation threshold.   
                 
         [0120]    Based on Equation 3, the braking feedback transfer function  72 , or braking force, may then be defined as the ratio of the joint velocity {dot over (Θ)} to the squared position measurement Θ, where an offset Δ is added to ensure that the braking force remains a finite quantity while reaching the motion range end. Using such a relationship to compute the braking force to be accounted in the net actuator  144  command calculation allows the creation of a braking force that increases as the joint move towards the motion end while maintaining a significant velocity, while not restricting motion in the direction opposite to the motion end. Such behavior differs from simply increasing the joint impedance of a motion tracking control scheme, as the behavior herein defined is characterized by its single sided action. 
         [0121]    While Equation 3 is defined to ensure that braking occurs prior to reaching the hardware motion stops, it is also possible to dynamically configure the braking process parameters in order to modify the location in the motion range where braking occurs. Hence, this braking process may also be advantageously used in order to manage swing phase heel rise during cyclical portions, or for other specialized functions such as motion range limitations during rehabilitation or training processes. While the first suggested use could be fully automated through definition of the proper detection and adjustment mechanism in the inference layer  120  (see  FIG. 1 ), the second suggested use would optimally be linked to a user/clinician interface device, allowing this interface device to configure the motorized prosthetic and/or orthotic device  200  according to the requirements of the rehabilitation/training process. 
         [0122]    Referring back to  FIG. 7 , from a variable gains impedance controller  70  standpoint, the additional behavior is integrated as a supplementary feedback term  73  that is added to the basic formulation. Referring back to the motorized knee prosthesis  10  of  FIG. 2 , the braking feedback transfer function  72  uses as input the measured relative position between actuator  12  output and thigh segment (not shown), and the estimated joint velocity. Joint velocity may be estimated using an ARMA, i.e. Auto Regressive Moving Average process, which is shown to provide an estimate of sufficient quality while minimizing the requirement for hardware sensors. Upon fulfillment of the conditions illustrated in  FIG. 8 , the position measurement and velocity estimates are then used in order to compute the amplitude of the braking force. 
         [0123]    As previously discussed, the braking force then acts on the variable gains impedance controller  70  behavior by reducing the force feedback sustaining the perturbation force matching process  64 . Hence, the braking force first compensates for the force feedback term  55 , leaving the actuator  144  in a passive mode. Leaving the actuator  144  in a passive mode when the joint is actually driven by inertial forces allows the use of the motorized prosthetic or orthotic apparatus  140  poor passive dynamics in order to fulfill the objective of the current joint reactive behavior, i.e. dissipation of energy in order to break joint motion. If the use of passive braking is not sufficient to stop the motion, the form of the braking transfer function  72  defined by Equation 3 generates a braking force that gains in amplitude as the joint continues to move towards the motion stop. As the braking force becomes greater than the perturbation matching force term, i.e. force feedback term  55 , the actuator  144  starts generating a force in the direction opposed to the motion, which results in a quick stop of the motion. In the swing phase, i.e. the aerial phase  40 , the actuator  144  behavior depends on the balance between the contribution of the force feedback term  55 , and the proportional-derivative terms, i.e. Θ and {dot over (Θ)}. Since K P  and K D  are set to 0 for the swing phase, actuator  144  behavior is then defined by the sum of the force feedback term  55  and the supplementary feedback term  73 . Based on the definition of the breaking transfer function  72 , the force feedback term  55  is first cancelled out by the supplementary feedback term  73  as the latter increases. As the supplementary feedback term  73  becomes larger than the force feedback term  55 , the force following is effectively cancelled out and the supplementary feedback term  73  becomes the main contributor to the amplitude and direction of the command signal sent to the actuator  144 . By their nature and definition, the force feedback term  55  and the supplementary feedback term  73  will always be of opposite sign as the first one tries to follow the shank segment velocity while the second ones tries to control the shank segment velocity. 
         [0124]    The above described braking process has been found to be very efficient and robust to inter-subjects variability as well as properly fulfilling desired cyclical or non-cyclical locomotion tasks. Moreover, the reactive and self-adjusting nature of the braking process allows to greatly reduce dependency on locomotion portion, gait speed or user physiological parameters, with respect to other types of systems relying on position control. Such implementation of the Eccentric joint behavior class implicitly manages end-of-motion collisions in a way that is very adaptable to various locomotion tasks and shows very high synergy with the user due to its physiologically-compliant nature. 
         [0125]    One indirect benefit associated with the use of such a braking process with respect to other approaches based on hardware mechanisms arise from the fact that the actuator  144  is used in a regenerating mode. Regeneration occurs in an electrical motor when torque and velocity are in opposite directions. In such a case, assuming that proper drive electronics are used, the motor starts acting as a generator and may be self-sufficient as far as power consumption is concerned. Implementation of the braking process herein defined then leads to a positive power balance, as mechanical work is generated without drawing any power from the power source of the motorized prosthetic and/or orthotic device  200 . Furthermore, depending on the quantity of energy required to be dissipated using the braking process, i.e. depending on locomotion tasks, gait speed, user gait style and user physiological parameters, it may also be possible to generate more energy than what is required by the actuator&#39;s  144  motor to ensure satisfactory braking. Assuming that a suitable power supply architecture is used, for example the power supply described in U.S. Pat. No. 7,230,352 entitled “COMPACT POWER SUPPLY” by Bedard et al., it may then be possible to store the extra energy, which is not required by the actuator  144  motor in order to sustain braking, for later use. From a motorized prosthetic and/or orthotic device  200  perspective, this allows an increase in autonomy without any additional components. 
       Energy Injection Implementation 
       [0126]    The fourth class of lower-limb joint behavior, the Concentric class, may be advantageously addressed through an energy injection implementation. The Concentric class of joint behavior occurs whenever the lower-limb joints of the motorized prosthetic and/or orthotic device  200  are used in order to generate mechanical power or inject energy to sustain overall gait. While some behaviors described above could be easily implemented on passive lower-limb prosthetic or orthotic joints, integration of a highly performing concentric behavior requires the availability of mechanical power generation capabilities at the joint. While it might be argued that the use of simple passive mechanical components, for example springs, accumulators, etc., may allow energy storing and return, the limitations in power generation capabilities with respect to specific gait requirements make it difficult to achieve something close to a reactive behavior using these passive mechanical components. 
         [0127]    While obvious occurrence of Concentric joint behavior are found in locomotion tasks such as stairs ascent, incline plane ascent or sit-to-stand transfer, the implementation of the Concentric reactive behavior aims at fulfilling gait requirements different from the ones found in these locomotion tasks. The concentric joint behavior implemented as reactive behavior is related to the implementation of joint motion in order to enforce sufficient toe clearance in both cyclical and non-cyclical locomotion tasks. 
         [0128]    Toe clearance management is an important feature of any motorized prosthetic and/or orthotic device  200 , as this feature may dramatically influence the overall device usability. While multiple approaches exist regarding management of toe clearance on both passive and active lower-limb devices currently on the market, they all lack the ability to properly manage toe clearance for both cyclical and non-cyclical locomotion tasks, without affecting the device&#39;s usability or requiring the user to adopt specific behaviors, often leading to a pathological gait. 
         [0129]    From that respect, the definition of a generalized joint behavior addressing the toe clearance management problem in a physiologically coherent and robust manner appears to be the most straightforward solution. 
         [0130]    Concentric behavior targeting basic toe clearance management is then defined as a low-level reactive behavior allowing to connect sensory input from the sensors  142  to a pre-defined joint behavior. Upon detection of the motorized prosthetic and/or orthotic device  200  transition from the interacting  30  to the non-interacting  40  mechanical configuration (see  FIGS. 3 and 4 , respectively), energy injection at the joint level is triggered and takes place as a supplementary feed forward term in the formulation of the variable gains impedance controller&#39;s  70  of  FIG. 7 . 
         [0131]    Since the requirements for any Concentric joint action targeting toe clearance are both user-specific and locomotion task specific, energy Injection is advantageously implemented in conjunction with a user-interface device allowing the customization of the basic energy injection implementation&#39;s behavior. Through the combination of the energy injection implementation and associated user-interface device, it may be possible to define a general baseline behavior. In order to account for more complex concentric joint behavior requirements, it may be possible to couple this general baseline behavior with higher level inference engines that will allow the dynamic modification of the energy injection amplitude, timing and duration. Such modifications depend on the nature of the task currently performed by the user. 
         [0132]    From an inference layer  120  perspective (see  FIG. 1 ), three specializations are considered to affect the general baseline behavior of the energy injection Implementation and are associated with sustaining adequate toe clearance and heel rise in level walking, stairs or incline ascent, and stairs or incline descent. Appropriate adjustment of the energy injection implementation reactive layer  130  parameters by the inference layer  120  engines may ensure fulfillment of these three specializations in a seamless manner. 
         [0133]    Referring to  FIG. 9 , from a variable gains impedance controller  90  standpoint, the energy injection implementation may be advantageously implemented as a feed forward transfer function  92  acting as a discrete pulse generator which directly injects a force pulse  93  at the output  94  of the positional terms of the variable impedance controller  90  upon triggering of the transfer function discrete input Γ. As discussed above, the triggering mechanism may consist in a low-level detection of the transition from the interacting configuration  30 , i.e. foot in contact with the ground, to the non-interacting configuration  40 , i.e. aerial lower-limb configuration. The feed forward transfer function  92 , g(s), may take a wide variety of form, for example a pulse type waveform. Other types of discrete-time waveforms may also be defined for that specific purpose (e.g., saw tooth, exponential, etc.). 
         [0134]    Hence, upon transition to the non-interacting configuration  40 , both the energy injection and perturbation force matching  64  (see  FIG. 6 ) are active, ensuring that minimal motorized prosthetic or orthotic apparatus  140  joint flexion take places before the joint is left in its minimal impedance state. While this last sequence of event takes place without consideration of the cyclical nature of the task being executed, more specific actions are expected to take place and sustain the complete swing phase of cyclical locomotion tasks, such that proper foot clearance and subsequent foot placement takes place. 
         [0135]    While the benefits associated with the behavior described above for the cyclical locomotion tasks are quite straightforward, it is the capability to properly manage requirements associated with non-cyclical tasks that make the implementation of the concentric joint behavior interesting for a motorized prosthetic and/or orthotic device  200 . Combination of the Concentric behavior allowing the enforcement of basic toe clearance in limited ambulation tasks to the Isometric behavior allowing support in the absence of motion during the contact phase without consideration of the knee flexion angle at which the ground contact occurs greatly eases the burden associated with the manipulation of a lower-limb motorized prosthetic and/or orthotic device  200  with respect to more conventional designs. 
         [0136]    Moreover, it was shown in experimental testing that the combination of the energy injection implementation with the force matching and force rejection implementations greatly enhance the usability of the motorized prosthetic and/or orthotic device  200  when facing constrained environments, obstacles, or other types of situations that cannot be characterized through typical locomotion tasks. Enforcement of a certain knee flexion angle through the effects of the energy injection implementation also facilitates the implementation of less pathological gait habits in limited ambulation, as stance phase knee flexion is easily obtained and provide adequate support, without being overly stiff. Hence, improved physiological interaction between the user and its motorized prosthetic and/or orthotic device  200  may be obtained. 
         [0137]    It is to be understood that the force matching and force rejection implementations, the braking implementation and the force injection implementation may be integrated individually or in any combination thereof into a conventional variable gains impedance controller to form a reactive layer control system for orthotic or prosthetic devices. 
         [0138]    Although the present invention has been described by way of particular non-limiting illustrative embodiments and examples thereof, it should be noted that it will be apparent to persons skilled in the art that modifications may be applied to the present particular embodiment without departing from the scope of the present invention. 
       REFERENCES 
       [0000]    
       
         [1] Hogan, N.,  Impedance Control: An Approach to Manipulation: Part I—Theory,  ASME Journal of Dynamic Systems, Measurement and Controls, vol. 107, pp. 1-7, 1985. 
         [2] Hogan, N.,  Impedance Control; An Approach to Manipulation: Part II—Implementation  ASME Journal of Dynamic Systems, Measurement and Controls, vol. 107, pp. 8-16, 1985. 
         [3] Hogan, N.,  Impedance Control: An Approach to Manipulation: Part III—Applications,  ASME Journal of Dynamic Systems, Measurement and Controls, vol. 107, pp. 17-24, 1985.