Abstract:
A system and appertaining algorithm provide a cutting and shaping of the hearing aid shell using an Ellipsoidal Line Cut that increases the speed of detailing operations and enables a creation of more cosmetically appealing shells. A contour algorithm determines a projected contour on the bottom cut plane that corresponds in shape to a portion of the line cut plane contour, and a merger algorithm defines a line cut surface between the portion of the line cut plane contour and the projected contour. An elimination algorithm eliminates parts of the new hearing aid shell design that extend beyond boundaries defined by the original hearing aid shell design.

Description:
BACKGROUND 
       [0001]    The present invention is directed to a system and method for cutting hearing aid shells using an ellipsoidal line cut methodology. 
         [0002]    Hearing aid shells that house various hearing aid components are designed to fit into the ear of a wearer. However, each user&#39;s ear is shaped differently so that a one-size-fits all approach cannot be used or would result in a poor fit and cause discomfort for the wearer. For this reason, customized shells are created that correspond to the particular shape of the user&#39;s ear. 
         [0003]    In order to create such a customized shell, an impression of the user&#39;s ear is taken using a soft moldable material that conforms to the shape of the user&#39;s ear which subsequently hardens. This impression can then be used to create a hearing aid shell design that precisely matches the user&#39;s ear, resulting in a good fit and comfort for the wearer. 
         [0004]    Traditionally, this process would involve a manual creation, cutting, and trimming of the shell, based on the impression. However, advances in the field have permitted the use of computer software to assist in the creation of shell designs. This software works from a digitized model of the impression and can create a digitized model of the shell from this impression that can be operated on with the use of a computer program and/or can assist in automated procedures for modifying the shelf. 
         [0005]      FIG. 1A  illustrates a typical digitized model of a hearing aid shell  10  to which a bottom cut plane  50  ( FIG. 2 ) has been applied, creating a bottom cut contour  52 . 
         [0006]      FIG. 2  illustrates known application of the Bottom Cut Plane  50  to the hearing aid shell  10 . A hearing aid shell  10  has a Bottom Cut Plane  50 , which defines the border of the bottom opening of the shell  10 . After a scanning/triangulation of the shell  10 , which creates a 3D digital definition of a shell shape, the shell  10  typically has a non-planar contour which defines the Bottom of the Shell. In order to make the contour planar, the Bottom Cut Plane  50  is introduced which defines a new topology of the shell opening contour (Bottom Cut Plane Contour)  52 , which is defined as the intersection between the shell  10  and the Bottom Cut Plane  50 . The remove portion  14 , i.e., the material below the plane  50 , is removed and all holes between the plane  50  and the keep portion  12  of the remaining shell are filled with material. 
         [0007]    One of the basic detailing and modeling procedures is to utilize what is know as a line cut plane that is used to define a cut plane for detailing operations, separating the shell  10  along a planar boundary into a keep portion  12  and a remove portion  14 , producing a Line Cut Plane contour  62 . The face that is created by the cut plane must be filled in order to create a coherent shell. Theoretically, filling could be performed by simply applying the plane as an actual part of the shell. In the real world, this would create sharp edges and unpleasant aesthetics that are not practical. Therefore, various techniques have been applied to adapt the surface  64  created by the line cut plane into a more practical shape 
         [0008]      FIG. 1C  illustrates the application of a rounding process where the cutting area defined by the cut plane has been filled and rounded according to certain defined parameters. A modification of this technique can be to provide the rounding function that includes an offset plane which provides boundaries to the rounding operation (see  FIG. 1E ). 
         [0009]      FIG. 1D  illustrates the application of an alternate tapering process, which serves to remove a tip area of the shell with a smoothing bounding area, such that after the cut plane is applied and filled, a smoothing operation is performed. Prahl Tapering is a refinement of the tapering that utilizes an offset plane to further define a rounding effect. Similarly, Helix Tapering is used to reshape the helix material of the shell with a rounding effect, according to various parameters. A “Prahl Taper” refers to a polynomial shrink of the canal of the shell impression usually initiated from the aperture to the canal tips It is characterized by an erosion parameter, which is the measure of the required shrink and a maximum reduction parameter, which determines the required reduction in canal length. A “Helix Taper” refers to a polynomial shrink of the helix which begins at the highest point on the helix to a user defined position of the helix. 
         [0010]    These shaping procedures generally replicate the manual procedures that have been used to craft the shells in the past to change the shape of a part of the shell where the button/bottom cut plane is involved. In essence, they replicate cutting with a knife and then performing some rounding around the cut. The most classic use examples are for, e.g., decreasing the full impression to fit the size of a half-shell or mini-canal design, or, for example, cutting off the intertragal notch. In these examples, some material is removed from the shell and the nature of removing the material requires that bottom cut contour is changed, or actually shrunken. These current approaches of rounding and tapering create a relatively aesthetically unpleasant resultant shell. 
       SUMMARY 
       [0011]    A system and appertaining algorithm for providing an improved cutting and shaping of the hearing aid shell using an Ellipsoidal Line Cut is provided that increases the speed of detailing operations and enables a creation of more cosmetically appealing shells. After applying the Ellipsoidal Line Cut, the shell looks more cosmetically appealing than conventional cuts since the visibility of such a cut is minimized or eliminated; the application of the Ellipsoidal Line Cut reduces the shell size. The use of the ellipsoidal cut is substantially advanced over the previous shaping techniques that had been used. 
         [0012]    Thus a method is provided for trimming a hearing aid shell, comprising: producing a 3D data definition of an original hearing aid shell design; establishing a line cut plane that is not parallel to a bottom cut plane, thereby defining a line cut plane contour by an intersection of the line cut plane and the hearing aid shell; creating a projected contour on the bottom cut plane that corresponds in shape to a portion of the line cut plane contour; defining a line cut surface between the portion of the line cut plane contour and the projected contour; identifying a first portion of the hearing aid shell on one side of the line cut surface as a keep portion of the hearing aid shell, and second portion of the hearing aid shell on the other side of the line cut surface as a removal portion of the hearing aid shell, a new hearing aid shell design being defined by the keep portion of the hearing aid shell; eliminating parts of the new hearing aid shell design that extend beyond boundaries defined by the original hearing aid shell design; and producing a hearing aid shell corresponding to the new hearing aid shell design. 
         [0013]    A system is also provided for trimming a hearing aid shell, comprising: a computer system having a processor, user input device, user display device, data storage device, and communications device; a line cut algorithm for establishing a line cut plane in a 3D model of an original hearing aid shell design that is not parallel to a bottom cut plane of the hearing aid shell; a contour algorithm for determining a projected contour on the bottom cut plane that corresponds in shape to a portion of the line cut plane contour; a merger algorithm for defining a line cut surface between the portion of the line cut plane contour and the projected contour, identifying a first portion of the hearing aid shell on one side of the line cut surface as a keep portion of the hearing aid shell, and second portion of the hearing aid shell on the other side of the line cut surface as a removal portion of the hearing aid shell, a new hearing aid shell design being defined by the keep portion of the hearing aid shelf; and an elimination algorithm for eliminating parts of the new hearing aid shell design that extend beyond boundaries defined by the original hearing aid shell design. 
         [0014]    A hearing aid shell is provided comprising: a line cut surface comprising a border contour divided into a first contour portion and a second contour portion, the first and second contour portions completely defining the border contour, wherein: the first contour portion has a first shape; and the second contour portion has a second shape lying in a bottom cut surface that is not parallel to the line cut surface, the second shape being identical to the first shape except that is flattened by a shrinking ratio. Finally, the algorithms for execution on a processor can be stored on a computer readable media. 
         [0015]    With this process, the size of the shell in the areas where bottom cut contour is present is decreased by a sophisticated shrinking of the shell approach as opposed to the more primative knife cut and round approach. In this way, the unneeded parts of the shell are cut without making where the cut was done obvious to viewers of the shell. With the use of rounding, tapering and rounding with offset techniques, it is quite apparent that the impression was cut. In the case of ellipsoidal line cut, instead of the clearly visible cut, an approximation of the shape of the surface is done considering the shape of the remaining part of the shell in such a way that it looks more like the shell has shrunken, as opposed to being cut and rounded. 
         [0016]    The advantage of having shell looking like as if it has shrunken, instead of cut, is that in after performing the ellipsoidal line cut, the operator of the detailing software does not have to worry about how the shell looks like after his cut and whether it is “edgy” (i.e., contains unattractive rounded edges) or not. With the ellipsoidal line cut approach, the operator can concentrate on making a shell of the correct size with the appropirate cuts and does not have to worry about whether the shell looks edgy or not (since a hearing aid that looks like a box with rounded edges is less aesthetically pleasing, and hence, less marketable, than one that has been created using the ellipsoidal line cut. 
         [0017]    The algorithm accepts the following inputs: a mathematical 3D definition of a hearing aid shell; a mathematical definition of a Bottom Cut Plane and a Line Cut Plane; and, a Shrinking Ratio. The result of applying the algorithm to the shell is a shell with a modified shape at the place where Ellipsoidal LineCut was applied. The rest of the shell remains untouched. The algorithm can function both on hollowed and unhollowed shells; it is used to cut the parts of the shell where the Ellipsoidal Line Cut Pivot Axis intersects with the shell. 
         [0018]    The present system and method are designed to provide a mechanism for simplifying the design of a hearing aid shell, potentially serving to replace the use of Helix Tapering, Prahl Tapering, Rounding, Tapering, and Rounding with Offset in this context. 
         [0019]    The algorithm can be operated on a standard computer system having a central processing unit, user input and output devices, data storage, and mechanisms for remote communications. With current technology, the algorithm can operate in under five seconds and can be designed to run independent of any particular platform. 
     
     
       DESCRIPTION OF THE DRAWINGS 
         [0020]    The invention is described according to various embodiments illustrated in the Figures and referenced by the following description. 
           [0021]      FIG. 1A  is a pictorial representation of a shell model; 
           [0022]      FIG. 1B  is a pictorial representation of a shell model having a Line Cut Plane defined; 
           [0023]      FIG. 1C  is a pictorial representation of a shell model to which a known rounding technique has been utilized after the Line Cut Plane cutting and filling; 
           [0024]      FIG. 1D  is a pictorial representation of a shell model to which a known tapering technique has been utilized after the Line Cut Plane cutting and filling; 
           [0025]      FIG. 1E  is a pictorial representation of a shell model to which a known rounding with offset technique has been utilized after the Line Cut Plane cutting and filling; 
           [0026]      FIG. 2  is a pictorial representation of a shell model illustrating the known use of the Bottom Cut Plane; 
           [0027]      FIG. 3A  is a pictorial represenatation illustrating a Measurement based Ellispoid Line Cut; 
           [0028]      FIG. 3B  is a pictorial top view of the Ellipsoidal Line Cut; 
           [0029]      FIG. 4A  is a pictorial isometric illustration showing the Bottom Cut Plane, the Line Cut Plane, and resultant shell contours defined by the intersection of the shell with these planes; 
           [0030]      FIG. 4B  is a geometric illustration of the Line Cut Contour, its projection on the Bottom Cut Plane, and the shrunken projection; 
           [0031]      FIG. 4C  is a pictorial illustration of the original Bottom Cut Plane Contour; 
           [0032]      FIG. 4D  is a pictorial illustration of the modified Bottom Cut Plane Contour; 
           [0033]      FIG. 4E  is a pictorial illustration of the modified shell design using the modified Bottom Cut Plane Contour; 
           [0034]      FIG. 4F  is a pictorial illustration of the creation of new surface lines along a flattened elliptical angel of rotation; and 
           [0035]      FIG. 5  is a flowchart illustrating the steps of the inventive method. 
       
    
    
     DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS 
       [0036]      FIG. 3A  illustrates the measurement-based nature of the Ellipsoidal Line Cut. The shell design in general is based on required measurements for a particular shell for a user. For instance, detailing operators know that in order to create a half shell design, they need to ensure, e.g., that the distance from intertragal notch in the direction of helix is limited to 14 mm or some other defined value. Such a limit could be required, for instance, by the fact that the standard electronics module used for such a shell type requires a particular amount of space to fit in. Or, for instance, industry standards will not allow considering a shell bigger then 14 mm in one of the directions as a half shell, but instead would consider this as a full-shell (which is cheaper in the marketplace). In  FIGS. 3A and 3B , the Line Cut Plane  60  of the shell is illustrated with the respective keep portion  12  and remove portion  14  of the hearing aid shell  10 .  FIG. 3B  is a top view of what is shown in  FIG. 3A . 
         [0037]      FIGS. 4A and 4B  illustrate the respective geometries regarding the various planes and contours.  FIG. 5  provides the basic method steps for the operation. A hypothetical shell shape, which would never be found in practice, is used for ease of illustration. According to the process  100 , a digital 3D definition of the shell  10  is produced. The hypothetical shell shape comprises a semi-elliptical cross sectional contour shape  52  in its intersection with the Bottom Cut Plane  50 , and comprises a generally triangular cross sectional contour shape  62  in its intersection with a Line Cut Plane  60 . After the digital definition of the shell is established and the appertaining Bottom Cut Plane  50  has been applied, a line cut plane is established by the operator  104 . The Line Cut Plane  60  intersects the shell  10 , and indicates, via a vector normal to this plane, which part of the shell  10  is preserved and which part is removed. Only the respective Bottom Cut Plane Contour  52  and Line Cut Plane Contour  62  of the shell are shown for the sake of clarity. 
         [0038]    According to a contour transformation algorithm, the Line Cut Plane Contour  62  is divided into a moving part and a fixed part. All points of the Shell Line Cut Plane Contour  62  lying on the Bottom Cut Plane  50 , i.e. along an ellipsoidal Line Cut Pivot Axis  70  (defined as the intersection of the Bottom Cut Plane  50  and the line cut plane  60 ), belong to the fixed part which implies that no transformation needs to be applied to them. All other points of the Shell Line Cut Plane Contour  62  belong to the moving part and the following operations are applied to them. 
         [0039]    First, as illustrated in  FIG. 4A , all points (exemplified by P 1 , P 2 ) of the Shell Line Cut Plane Contour  62  are projected onto the Bottom Cut Plane  50  to form a Projected Shell Line Cut Plane Contour  62 ′ (see P 1 ′, P 2 ′)  106 . This projection is done by rotating every point P 1 , P 2  of the moving part of the Shell Line Cut Plane Contour  62  around the Ellipsoidal Line Cut Pivot Axis  70  on an angle θ which is equal to the angle between the Bottom Cut Plane  50  and the Line Cut Plane  60 . This preserves the topology of the moving part of the Shell Line Cut Plane Contour  62  when it is projected to the Bottom Cut Plane  50 . 
         [0040]    Referring to  FIG. 4B , after the projection  106  is performed, a shrinking operation  108  is applied on the moving part of the Projected Shell Line Cut Plane Contour  62 ′, which serves to compress or flatten this contour  62 ′. In order to perform the shrinking operation  108 , two input values are required: a Shrinking Ratio and a Shrinking Direction. 
         [0041]    The Shrinking Ratio, which could theoretically be any value between 0 and 1, can be provided manually and directly as an input by the operator, or it can be calculated based on other supplied criteria. In normal operation, this ratio could be based on a desired size of the shell in one of its dimensions as entered by the operator, or it could be determined based on a heuristically-based algorithm that utilizes feature recognition technology. 
         [0042]    The Shrinking direction is always directed towards the Ellipsoidal Line Cut Pivot Axis  70 . During the shrinking operation, every point P 1 ′, P 2 ′ of the moving part of the Projected Shell Line Cut Plane Contour  62 ′ is moved in the Shrinking Direction and located to a point P 1 ″, P 2 ″ which is determined by multiplying the Shrinking Ratio by the distance between the current point P 1 ′, P 2 ′ position and the Ellipsoidal Line Cut Pivot Axis  70 , thereby resulting in a Shrunken Projected Shell Line Cut Plane Contour  62 ″, 
         [0043]    Referring to  FIGS. 4C and 4D ,  FIG. 4C  illustrates the original Bottom Cut Plan Contour  52 , and  FIG. 4D  illustrates the New Bottom Cut Plane Contour  52 ′, which includes the new contour boundary established by the Shrunken Projected Shell Line Cut Plane Contour  62 ″. 
         [0044]    A merge algorithm  110  is subsequently applied, which defines a new Line Cut Surface  64  ( FIG. 4E ) that generally corresponds with the shell surface intersected by the Line Cut Plane  60 , but that is adapted to include the New Bottom Cut Plane Contour  52 ′. In other words, the Line Cut Plane  60  intersection with the shell is changed into the newly defined surface boundary  64 . This surface  64  thus serves as a new cutting boundary. 
         [0045]    The merge algorithm  110  can utilize a procedure that accepts two 2D contours  62 ,  62 ″ as an input and generates a continuous 3D surface  64  connecting the two 2D contours based on the notion that each point (P 1 , P 2 ) in the first 2D contour  62  has a corresponding point (P 1 ″, P 2   1 ″) on the second 2D contour  62 ″. This may be accomplished by defining, e.g., a Bezier curve between each corresponding point ((P 1 , P 1 ″), (P 2 , P 2 ″)) of the contours  FIG. 4F  illustrates one possible procedure in which the surface  64  is generated according to the lines of rotation through the angle θ, but is flattened into ellipses according to the Shrinking Ratio applied. 
         [0046]    Various other known mapping techniques may also be utilized for creating the 3D surface from the 2D contours, such as those disclosed in the following references which are provided as background information, all herein incorporated by reference: 1) R. Klein, A. Schilling, W. Straer,  Reconstruction and simplification of surfaces from contours ; Graph. Models 62 (6) (2000) 429-443; 2) Siu-Wing Cheng, Tamal K. Dey,  Improved Constructions of Delaunay Based Contour Surfaces  (1999), Proc. ACM Sympos. Solid Modeling and Applications 99 1999, 322-323; and 3) E. Keppel,  Approximating complex surfaces by triangulation of contour lines , IBM J. Res. Dev. 19 (1975) 2-11 
         [0047]    Boolean subtraction is subsequently used  112  to change the original shell shape into a shape that is bounded by the Bottom Cut Plane  50 , the new surface boundary  64 , and at the same time does not exceed the limits of original impression  52 . This is performed by subtracting the previously undetailed shell shape from the newly defined shell shape in order to ensure that no part of the newly generated (by the merge algorithm) surface protrudes outside of the original undetailed impression. This operation ensures that the newly modified shell design will fit into the original ear impression and not cause a fitting problem when the hearing aid is delivered to the end user. 
         [0048]    A test may be provided prior to execution of the algorithm to determine if the input parameters are reasonable. If input parameters are not reasonable for execution of the algorithm, a specific error code containing detailed information about the problem can be returned. Furthermore, various error codes can be determined and provided to a user on the user interface device. These error codes can include, but are not limited to: 1) the Bottom Cut Plane does not intersect the shell; 2) the Line Cut Plane does not intersect the shell; 3) the shell is hollowed; 4) the shell is corrupted; 5) the Shrinking Ratio is outside of a predefined valid range; 6) the Ellipsoidal Line Cut Pivot Axis does not intersect the shell; 7) the boolean subtraction failed; 8) the merge failed; and 9) the Ellipsoidal Line Cut Contour Transfrmation and Shrinking failed. 
         [0049]    Once a final shell configuration has been established, an actual hearing aid shell may be produced in accordance with this established configuration. 
         [0050]    For the purposes of promoting an understanding of the principles of the invention, reference has been made to the preferred embodiments illustrated in the drawings, and specific language has been used to describe these embodiments. However, no limitation of the scope of the invention is intended by this specific language, and the invention should be construed to encompass all embodiments that would normally occur to one of ordinary skill in the art. 
         [0051]    The present invention may be described in terms of functional block components and various processing steps. Such functional blocks may be realized by any number of hardware and/or software components configured to perform the specified functions. For example, the present invention may employ various integrated circuit components, e.g., memory elements, processing elements, logic elements, look-up tables, and the like, which may carry out a variety of functions under the control of one or more microprocessors or other control devices. Similarly, where the elements of the present invention are implemented using software programming or software elements the invention may be implemented with any programming or scripting language such as C, C++, Java, assembler, or the like, with the various algorithms being implemented with any combination of data structures, objects, processes, routines or other programming elements. Furthermore, the present invention could employ any number of conventional techniques for electronics configuration, signal processing and/or control, data processing and the like. 
         [0052]    The particular implementations shown and described herein are illustrative examples of the invention and are not intended to otherwise limit the scope of the invention in any way. For the sake of brevity, conventional electronics, control systems, software development and other functional aspects of the systems (and components of the individual operating components of the systems) may not be described in detail. Furthermore, the connecting lines, or connectors shown in the various figures presented are intended to represent exemplary functional relationships and/or physical or logical couplings between the various elements. It should be noted that many alternative or additional functional relationships, physical connections or logical connections may be present in a practical device. Moreover, no item or component is essential to the practice of the invention unless the element is specifically described as “essential” or “critical”. Numerous modifications and adaptations will be readily apparent to those skilled in this art without departing from the spirit and scope of the present invention. 
         [0000]    
       
         
               
             
               
               
             
           
               
                   
               
               
                 TABLE OF REFERENCE CHARACTERS 
               
               
                   
               
             
             
               
                   
               
             
          
           
               
                 10 
                 hearing aid shell 
               
               
                 12 
                 keep portion of hearing aid shell 
               
               
                 14 
                 remove portion of hearing aid shell 
               
               
                 50 
                 bottom cut plane 
               
               
                 52 
                 bottom cut plane contour (shell opening contour) 
               
               
                     52′ 
                 new bottom cut plane contour 
               
               
                 60 
                 line cut plane 
               
               
                 62 
                 line cut plane contour 
               
               
                     62′ 
                 projected shell line cut plane contour 
               
               
                  62″ 
                 shrunken projected shell line cut plane contour 
               
               
                 64 
                 line cut surface 
               
               
                 70 
                 ellipsoidal line cut pivot axis 
               
               
                 100  
                 process 
               
               
                 102–112 
                 process steps