Patent Abstract:
A user&#39;s preference structure in respect of alternative “objects” with which the user is presented is captured in a multi-attribute utility function. The user ranks these competing objects in order of the user&#39;s relative preference for such objects. A utility function that defines the user&#39;s preference structure is provided as output on the basis of this relative ranking. This technique can be used to assist a buyer in selecting between multi-attribute quotes or bids submitted by prospective suppliers to the buyer.

Full Description:
CROSS-REFERENCE TO RELATED APPLICATIONS  
       [0001]     This Application is a division of U.S. patent application Ser. No. 10/308,401, filed Dec. 3, 2002. 
     
    
     FIELD OF THE INVENTION  
       [0002]     The present invention relates to determining utility functions for use in determining or representing user preferences.  
       BACKGROUND  
       [0003]     Auction software often allows bidders (for example, suppliers) to specify multiple attributes associated with their bids, such as quality, terms and conditions, etc. Consequently, bidders can differentiate themselves by factors other than price.  
         [0004]     Weighting factors enable buyers to rate the relative importance of attributes that may be associated with bids. A buyer can specify weighting factors for each attribute using a sliding scale, in which the user can choose from various options such as “do not care”, “important”, “more important”, “very important”, and “most important”.  
         [0005]     There also exists software for performing “Request for Quotes” (RFQ). Some software permits complex configuration and bill-of-material relationships. Suppliers can specify quotes having ranges of attributes, and price variations for terms and conditions. In some cases, a buyer can post a RFQ, and the software automatically (i) searches supplier&#39;s rules (predefined and stored in a database), (ii) calculates a best offer for each supplier, and (iii) ranks all offers according to criteria that are most important to a buyer.  
         [0006]     In some existing RFQ software, buyers (that is, users) can specify the weighting factors of each attribute explicitly. However, these softwares demand a thorough knowledge/perception about the attributes from a user. On the other hand, rest of the software accept input from a user about the order (partial or full) on the items or bids and extract the weighting factors (utilities) of the attributes from the specified order.  
         [0007]     In software that accepts an ordered list (full or partial) of items/bids from a user, the utility function of the item/bid is expressed as a parametric function of the attributes. There exist a number of investigations concerning techniques for representing the utility function of the bids/items having multiple attributes and subsequent techniques for the parametric model fitting on the ordinal data sets (that is, ordered set of items). In general, such an approach may be classified as belonging to multi-attribute utility theory (MAUT).  
         [0008]     In multi-attribute utility theory (MAUT), parametric utility functions can be classified according to different levels of complexity. Types of parametric utility function include multilinear, multiplicative, and additive models. Solutions to the problem of evaluating attributes are proposed for additive models only, the utilities for individual attributes are considered to be independent. For additive utility functions, evaluation of the utility function, and subsequent ranking of the objects, is performed by assessing the weights of the attributes by formulating the problem as a linear programming task.  
         [0009]     There are two primary limitations associated with the existing tools described above.  
         [0010]     First, users&#39; preference structures are represented by what is essentially a linear additive utility function, namely a weighted sum of utility functions for individual attributes. For example, if attributes associated with a bid are price and quality, then a relevant utility function for the buyer, U(price, quality), is defined as U(price, quality)=w 1 ′U(price)+w 2 ′U(quality). In this expression, U(price) and U(quality) are respectively the buyer&#39;s individual utility functions for price and quality.  
         [0011]     Second, individual attribute utility functions are assumed a priori. In the example above, U(price) and U(quality) are assumed to be known, and the buyer effectively specifies weights w 1  and w 2  by indicating the relative importance of the respective attributes on a sliding scale, such as that described above.  
         [0012]     In view of the above observations, a need clearly exists for representing a user&#39;s preferences when selecting between competing alternatives.  
       SUMMARY  
       [0013]     A technique for determining a utility function having multiple attributes is described herein, assuming that there exists a partly or fully ranked set of objects. Nonlinear interactions between individual attributes are assumed, and there is also assumed to be no a priori knowledge about individual attribute utility functions.  
         [0014]     Objects (partially or fully ordered) having multiple attributes are accepted as input, and a multi-attribute utility function is provided as output. The ordered set of objects can either be directly obtained from a user, or determined from past interactions with the user or observed behavior of the user. This multi-attribute utility function is essentially “learned” from the ordered set of objects. A technique for learning a utility function using a feed-forward neural network is described. The neural network iteratively learns the utility function from pairs of items in the ranked list.  
         [0015]     The techniques described herein are presented in the context of a buyer selecting between alternative bids or quotes submitted by prospective suppliers. The described techniques, however, apply more generally to any user&#39;s preference structure in respect of alternative “objects” with which the user is presented. The user ranks these competing objects in order of the user&#39;s relative preference for such objects. A utility function that defines the user&#39;s preference structure is provided as output on the basis of this relative ranking. 
     
    
     DESCRIPTION OF DRAWINGS  
       [0016]      FIG. 1  is a schematic representation of a feed-forward neural network used in a described technique for determining a multi-attribute utility function.  
         [0017]      FIG. 2  is a flowchart that represents steps in the described technique for determining a multi-attribute utility function.  
         [0018]      FIG. 3  is a schematic representation of a computer system suitable for performing the techniques described with reference to  FIGS. 1 and 2 .  
         [0019]      FIG. 4  is a flowchart illustrating a preferred method of the invention. 
     
    
     DETAILED DESCRIPTION  
       [0020]     In “real-life” problems, a user may be considered to have an inherent preference structure involving objects having multiple attributes. An example of such a real-life problem is evaluating responses received, from suppliers, by a buyer for the buyer&#39;s RFQ. The buyer&#39;s preference structure is represented, mathematically, by a utility function that specifies these relevant attributes.  
         [0021]     The responses specify multiple attributes (of interest to the buyer), and the buyer chooses from amongst favorable responses received from suppliers. Examples of attributes that may comprise a response to a RFQ are “price”, “quality”, “quantity”. A buyer&#39;s preference structure over the entire attribute space is likely to involve dependencies between different attributes.  
         [0022]     For buyers, attributes “price” and “quality” are likely to be related in a buyer&#39;s preference structure. A buyer, for example, may prefer a quote having a higher price and higher quality equally as much as a response having a lower price and medium quality. Interdependencies of this sort between different attributes are quite likely to be nonlinear.  
         [0023]     The described techniques can be used to learn a buyer&#39;s preference structure (represented as a utility function) over a space of multi-attributed responses. The buyer provides a set of ranked responses, as a training example, so that the utility function can be determined.  
         [0024]      FIG. 1  schematically represents a feed-forward neural network that is used to “learn” such a utility function. The output of the neural network of  FIG. 1  (that is, f(x 1 , x 2 , x 3 , . . . x m )) corresponds to a learned utility function. The input vector X  110  comprises values {x 1 , x 2 , x 3 , . . . x m } that corresponds to different attributes of the multi-attributed object that is provided as input. Input vector X  110  is input to a first layer  120  of the neural network of  FIG. 1 . This first layer  120  connects to a second layer  130 , which in turn connects to a summation node  140 . The summation node  140  outputs the utility function ƒ(x 1 , x 2 , x 3 , . . . x m )  150 .  
         [0025]     Table 1 below presents a prescriptive indication of an approximate number of nodes to be used in the hidden layer of the feed-forward neural network of  FIG. 1  for different number of attributes (that is, dimensionality of the input vector X  110 ), and different types of utility functions.  
                       TABLE 1                       Type of Utility Function   Number of Hidden   Number of Hidden       (m- Dimensional input   Nodes in   Nodes in       vector)   First Layer   Second Layer                   Linear   O(m)   O(1)       Quadratic   O(m)   O(2)       Polynomial of O(r)   O(m)   O(r)       Log-polynomial of O(r)   O(m)   O(r)       Exponential of Polynomial   O(m)   O(r)       of O(r)                  
 
         [0026]     Techniques described herein are presented in the form of an algorithm, and each step of the algorithm is described in detail. Each object i is represented as an m-dimensional vector  
                 x   i     =     (       x   i1     ,                 x   i2     ,           …   ⁢           ,             x   im     )           .       
 
         [0027]     The described algorithm, which can be conveniently referred to as “bid evaluation”, receives as input r, which is a ranked list of objects. The bid evaluation algorithm provides as output ƒ(.), which is a utility function.  
         [0028]     The input list r, an either partly or fully ranked subset of items/bids, can be represented as a set of ordered pairs in the following manner: 
 
 r ={( x   i   ,x   j ):  x   i  is preferred over  x   j  by the user and provided as input to the system}  a. 
 
         [0029]     The Input Ranked List r consists of object pairs provided by the user, out of n(n−1)/2 possible pairs for n objects (|r|=[n(n−1)/2) specified by the system to the user. Each object pair indicates a transitive relationship of preference such that (a,b) indicates that a is preferred over b, and given (a,b) and (b,c), a is preferred over c, by implication.  
         [0030]      FIG. 2  flowcharts steps involved in the described algorithm for bid evaluation. Each of the flowcharted steps is described below with reference to correspondingly numbered steps, both briefly in Tables 2 and 3 below, and also in further detail under respectively entitled subsections.  
                       TABLE 2                                       Step 210 Get the inputted ranked list r.           Step 220 Initialize a multi-layered feed-forward neural network           (represented in  FIG. 1 ) for training. This procedure is repeat           for every pair of objects (x i , x j ) in the ranked list r.           Step 230 Compute the required change in parameter weights of the           neural network in every iteration and for each individual pair of           bids/items in r.           Step 240 Compute an average change in parameter weights of the           neural network of  FIG. 1  for all possible pairs in the ranked           sublist r provided by the user.           Step 250 Repeat steps 230 and 240 until there is no significant           change in the parameter weights calculated in step 240.           Step 260 For any given input object, the output of the trained           neural network corresponds to the utility function f(.).                        
         [0031]     Table 3 below presents pseudocode corresponding to the steps of Table 2 and  FIG. 2 .  
                                                                                                                                         TABLE 3                           algorithm bid_evaluation (Input r: ranked list of items;                Output f(.): utility function)            r = ranked list   ! step 210       initialize neural network   ! step 220                repeat           for (every pair (x p , x q ) in r)                calculate change in weights in neural network;   !step 230           end for                compute average   change in weights in neural           network for                all pairs (x p , x q ) in r;   !step           240                until (only minimal change n parameter weights)                !step                250                return neural network   !step           260            end bid_evaluation                  
 
 Each of the above-described steps is described in further detail below. 
 
 Obtaining a Ranked List—Step  210  
 
         [0032]     A user can explicitly provide a list of ranked objects (list r), or the list can be implicitly obtained from observed behavior of the user, or from other transactions with the user. The objects are ranked in descending order of the user&#39;s preference for the respective objects, from more preferred to less preferred. The ranking is relative not absolute; that is, only the ranked objects are considered, rather than the total set of objects.  
         [0000]     Initializing Network for Training—Step  220   
         [0033]     A suitable architecture is first selected for a feed-forward network.  FIG. 1  presents a representative architecture, and Table 1 above presents a suggested order of magnitude for the number of nodes in hidden layers of the selected multi-layered network. These suggestions depend on the number of attributes of an object, which is the same as the number of inputs to the network (that is, m), and the order of complexity of the utility function to be obtained. For example, if an object has 12 attributes, the number of hidden nodes in the first hidden layer may be selected as 12±2.  
         [0034]     All weights of the links and thresholds of the nodes are initialized to small random values (for example, in the range specified by [−0.1, 0.1]). These seed values provide a basis for training the neural network.  
         [0000]     Calculating Revised Parameter Weights—Step  230   
         [0035]     Step  230  is performed for every pair of objects (x p , x q ) in the ranked list r. Here (x p , x q ) implies that (x p &gt;x q ) in the ranked list r. That is, x p  is preferred over x q . The repeated calculation in step  230  corresponds to the iterative training steps of the neural network of  FIG. 1 . In each iteration, all ordered pairs in the list of ranked objects r is desirably used. Step  240  is performed (as described below) to compute the average change in the parameters of the neural network required to perform the training in each iteration.  
         [0036]     A pair of objects (x p , x q ) is taken as an initial input. The neural network output is calculated for both objects in the pair individually, for computing the required change in network parameters as described below. To compute the neural network output for a particular object (for example, x p ) the input to the neural network is the attribute vector x p , which represents the corresponding object. The corresponding output of the neural network is the resulting utility function ƒ(x p ) generated by the neural network.  
         [0037]     If ƒ(x p ) is less than or equal to ƒ(x q ), then the network is considered to have made an error. An error is made because the utility function ƒ(.) implied by the neural network effectively ranks x q  above x p .  
         [0038]     The error measure is expressed in Equation (1) below  
               E   ⁡     (     p   ,   q     )       =     {             f   ⁡     (     x   q     )       -     K   ·     f   ⁡     (     x   p     )                   when   ⁢           ⁢     f   (     x   p     )       ≤       f   ⁡     (     x   q     )       ⁢             ⁢             ⁢   but   ⁢           ⁢     x   p       ≻     x   q               0       otherwise                   (   1   )             
 
         [0039]     In Equation (1), K is a constant between zero and one; that is, 0&lt;K&lt;1. A typical value of K may be, for example, 0.95. The overall error measure is expressed in Equation (2) below  
             E   =       ∑     p   ,   q       ⁢           ⁢     E   ⁡     (     p   ,   q     )                 (   2   )             
 
         [0040]     The described algorithm then computes the required change in weights of the links connecting neurons between successive layers of the neural network, to reduce the error made by the neural network with the current weights (as given by the error measure Equation (2)). The parameters (that is, weights of the links connecting neurons between successive layers) are changed in the opposite direction of the error gradient (gradient descent) so that a movement by a small factor in the parameter space opposite to the gradient direction results in a decrease in the total error (on the pairs of training bids/items).  
         [0041]     For the pair of objects (x p , x q ), for every i, j, and l, the expression  
       Δ   ⁢           ⁢       w   ij   1     ⁡     (     p   ,   q     )           
 
 is computed. This expression represents the required change in weight  
       w   ij   1       
 
 of the link connecting the neuron i of layer (l−1) to neuron j of layer l of the neural network of  FIG. 1 . This expression  
       Δ   ⁢           ⁢       w   ij   1     ⁡     (     p   ,   q     )           
 
 is computed in accordance with Equation (3) below, which applies if  
         f   ⁡     (     x   p     )       ≤     f   ⁡     (     x   q     )           
 
 for the objects  
           x   p     &gt;     x   q       .       
 
 Otherwise, the expression  
       Δ   ⁢           ⁢       w   ij   1     ⁡     (     p   ,   q     )           
 
 is equal to zero.  
               Δ   ⁢           ⁢       w   ij   1     ⁡     (     p   ,   q     )         =     η   ⁡     (       K   ⁢           ⁢       δ   il     ⁡     (   p   )       ⁢       v   jl     ⁡     (   p   )         -         δ   il     ⁡     (   q   )       ⁢       v   jl     ⁡     (   q   )           )               (   3   )             
 
         [0042]     In Equation (3) above, K is a constant between zero and one; that is, 0&lt;K&lt;1. A typical value of K may be, for example, 0.95. K is constant which forces the network output such that  
           f   ⁡     (     x   q     )       /     f   ⁡     (     x   p     )         =   K       
 
 in the converged state where  
         x   p     ≻     x   q         
 
 when the network makes a mistake. The parameter h is a constant that is referred to as “learning rate”. This value, h, is computed in accordance with Equation (4) below.  
             η   =         f   ⁡     (     x   q     )       -     K   ·     f   ⁡     (     x   p     )               ∑   l     ⁢           ⁢       ∑     i   ,   j       ⁢           ⁢       (     Δ   ⁢           ⁢       w   ij   l     ⁡     (     p   ,   q     )         )     2                   (   4   )             
 
         [0043]     In Equation (4) above, the value for  
         Δ   ⁢           ⁢       w   ij   l     ⁡     (     p   ,   q     )         _       
 
 is provided by the expression of Equation (3) below.  
                 Δ   ⁢           ⁢       w   ij   l     ⁡     (     p   ,   q     )         _     =     (         K   ·       δ   il     ⁡     (   p   )         ⁢       v   jl     ⁡     (   p   )         -         δ   il     ⁡     (   q   )       ⁢       v   jl     ⁡     (   q   )           )             (   5   )             
 
         [0044]     Further,  
         v   jl     ⁡     (   p   )         
 
 and  
         v   jl     ⁡     (   q   )         
 
 are respective outputs of the jth neuron in layer l of the network for x p  and x q  as inputs to the neural network. The output of node j of layer l for an input x p  is calculated in accordance with Equation (6) below.  
                 v   jl     ⁡     (   p   )       =     1     1   +     exp   ⁡     (     -       u   jl     ⁡     (   p   )         )                   (   6   )             
 
         [0045]     In Equation (6) above,  
         u   jl     ⁡     (   p   )         
 
 is the total input to the jth node of layer l from the previous layer, given as  
             u   jl     ⁡     (   p   )       =     ∑           ⁢       w   ij   l     ⁢       v     i   ,     l   -   1         ⁡     (   p   )             ,       
 
 for an input node v j0 (p)=x pj  in which x p =(x p1 , x p2 , . . . x pm ). Similarly, v jl (q) can be computed for an input x q , for different layers and nodes. 
 
         [0046]     In the above Equations (3) to (6), d jl (p) and d jl (q) represent error that propagates backwards from the output layer to node j of layer l. In Equation (7) below, the error at a node i of layer l depends on the error of every node k of layer l+1 connected to node i. Thus, to compute the error at a particular node, the topmost layer, (that is the output layer) in first considered and then the errors are computed successively downwards. In other words, the error in the output layer propagates backward down to the input layer. Error value d can be recursively computed in accordance with Equation (7) below.  
                 δ   il     ⁡     (   p   )       =       ∑   k     ⁢           ⁢       w   ki     ⁢       δ     k   ,     l   +   1         ⁡     (   p   )       ⁢       v   il     ⁡     (   p   )       ⁢     (     1   -       v   il     ⁡     (   p   )         )                 (   7   )             
 
         [0047]     For the output layer, d 1,L (p)=1. In this case, L is the number of layers. Similarly, d jl (q) can be computed for an input x q .  
         [0048]     The above-described training procedure of step  230  is repeated for all (x p , x q ) pairs in the ranked list r.  
         [0000]     Verifying Revised Parameter Weights—Step  240   
         [0049]     The average change in weights in the neural network is calculated in accordance with Equation (8) below.  
               Δ   ⁢           ⁢     w             ⁢   ij               ⁢   l         =       1             ⁢   N   ⁢               ⁢           ⁢       ∑     p   ⁢           ≠           ⁢   q       ⁢           ⁢     Δ   ⁢           ⁢     w             ⁢   ij               ⁢   l       ⁢     (     p   ,           ⁢   q     )                   (   8   )             
 
         [0050]     In Equation (8) above, N is the total number of instances in which the neural network makes an error in this iteration.  
         [0051]     Weights  
       w   ij   l       
 
 are updated in accordance with Equation (9) below.  
                       ⁢     w             ⁢   ij               ⁢   l         =               ⁢     w             ⁢   ij               ⁢   l         +     Δ   ⁢           ⁢     w             ⁢   ij               ⁢   l                   (   9   )             
 
         [0052]     Steps  230  and  240  are both repeated until there is no significant change in  
         Δ   ⁢           ⁢     w             ⁢   ij               ⁢   l         ,       
 
 as determined in step  240 . That is, until Equation (10) below is satisfied.  
                 ∑     i   ,   j   ,   l       ⁢           ⁢          Δ   ⁢           ⁢     w   ij   l              &lt;   ɛ           (   10   )             
 
         [0053]     In Equation (10), e is a small constant. Alternatively, the repeat-until loop can be repeated a predetermined number of times; that is, for a fixed number of iterations.  
       EXAMPLES  
       [0054]     Examples are now described of implementing the error measure given by Equation (1) and (2) using other techniques apart from neural networks (or without any reference to neural networks). Optimization techniques, such as genetic algorithms (GA) or simulated annealing (SA) can be used to minimize the error expressed in Equations (1) and (2). A specific case of using genetic algorithm for minimizing the error measure is described, as provided in Equations (1) and (2).  
         [0055]     The utility function can be described as a known parametric form of second order as expressed in Equation (11) below.  
               f   ⁢           ⁢     (   x   )       =       a             ⁢   0       +       ∑   i     ⁢       a             ⁢   i       ⁢           ⁢     x             ⁢   i           +       ∑       i   ,   j     ⁢               ⁢           ⁢       a             ⁢   ij       ⁢           ⁢     x             ⁢   i       ⁢           ⁢     x             ⁢   j                     (   11   )             
 
         [0056]     In Equation (11) above, i and j denote the indices of the attributes of the items/bids. One can extend this second order form to higher order forms also. However, that does not affect the usage of GA and the error measure in this algorithm.  
         [0057]     The GA-based technique operates as described below under points (i) to (vi). 
        (ii) Define chromosomes that encode the parameters a&#39;s. For example, if there are only two attributes, then there exist parameters a0, a1, a2, a12 (in total 4 parameters). Let all the parameters be bounded in −1&lt;a &lt;+1 and each can be encoded in 8 bits such that a maximum precision that can be achieved is 1/256 in the representation of the value of each parameter. Thus, in this example, a chromosome length will be 4 byte (32 bits).     (iii) Initialize a pool of chromosomes (a pool can consist of a large number of chromosomes depending on the constraints imposed the systems running time and resources). In the above example, one can start with 16 chromosomes in a pool. Initialize each chromosome randomly.     (iv) Perform the crossover operation on the chromosomes.     (v) Perform a mutation operation.     (vi) Evaluate each chromosome to determine the error each chromosome is representing over all the bids/items. Perform selection, such as Roullette-wheel selection so that the chromosomes representing lower error measure (according to Equations (1) and (2)) have a higher probability of selection.     (vii) Go to the step (ii) and repeat the procedure until the minimum error represented by the pool of chromosome does not decrease any further.        
 
         [0064]     The above algorithm does not involve the use of neural networks. This algorithm can determine the utility function of complex nonlinear form using stochastic optimization. This algorithm can also be used for higher order complex form of utility functions. In a similar manner, simulated annealing algorithm can be used to determine an optimal utility function of known complex form.  
         [0000]     Application of Described Techniques  
         [0065]     Consider the following application. A buyer wants to buy a digital camera. If the buyer goes to an online department store, he finds there are more than 100 digital cameras. Each digital camera has more than 12 attributes. The aim of the buyer is not to evaluate each of them separately but to evaluate a few of them and on the basis of these rank all the remaining cameras.  
         [0066]     The camera attributes considered are price, CCD resolution, memory card included or not, optical zoom, digital zoom, width, height, depth, and weight. Two possible utility functions that a user can have on these cameras are considered, based on the above attributes. These utility functions are: 
 
 f (camera)=0.4 u (price)+0.3 u (CCD-res)· U (mem-card-incl)· U (opt-zoom)· U (digital-zoom)+0.3 u (width)· u (height)· u (depth)· u (weight)  (ii) Sum of Products 
 
 f (camera)= u (price)· u (CCD-res)· u (mem-card-incl)· u (opt-zoom)· u (digital-zoom)· u (width)· u (height)· u (depth)· u (weight)  (iii) Product 
 
         [0067]     The effectiveness of the described techniques are tested for both of the above utility functions with random sampling and query based sampling algorithms. Different sizes of training sets, containing either a fully ranked set of cameras or the cameras are partially ranked, can be used. The performance measure that can be used to evaluate the effectiveness of the described techniques are the number of actual top k cameras predicted in the top k positions by the described techniques.  
         [0000]     Computer Hardware and Software  
         [0068]      FIG. 3  is a schematic representation of a computer system  300  that can be used to perform steps in a process that implement the techniques described herein. The computer system  300  is provided for executing computer software that is programmed to assist in performing the described techniques. This computer software executes under a suitable operating system installed on the computer system  300 .  
         [0069]     The computer software involves a set of programmed logic instructions that are able to be interpreted by the computer system  300  for instructing the computer system  300  to perform predetermined functions specified by those instructions. The computer software can be an expression recorded in any language, code or notation, comprising a set of instructions intended to cause a compatible information processing system to perform particular functions, either directly or after conversion to another language, code or notation.  
         [0070]     The computer software is programmed by a computer program comprising statements in an appropriate computer language. The computer program is processed using a compiler into computer software that has a binary format suitable for execution by the operating system. The computer software is programmed in a manner that involves various software components, or code means, that perform particular steps in the process of the described techniques.  
         [0071]     The components of the computer system  300  include: a computer  320 , input devices  310 ,  315  and video display  390 . The computer  320  includes: processor  340 , memory module  350 , input/output (I/O) interfaces  360 ,  365 , video interface  345 , and storage device  355 .  
         [0072]     The processor  340  is a central processing unit (CPU) that executes the operating system and the computer software executing under the operating system. The memory module  1050  includes random access memory (RAM) and read-only memory (ROM), and is used under direction of the processor  1040 .  
         [0073]     The video interface  345  is connected to video display  390  and provides video signals for display on the video display  390 . User input to operate the computer  320  is provided from input devices  310 ,  315  consisting of keyboard  310  and mouse  315 . The storage device  355  can include a disk drive or any other suitable non-volatile storage medium.  
         [0074]     Each of the components of the computer  320  is connected to a bus  330  that includes data, address, and control buses, to allow these components to communicate with each other via the bus  330 .  
         [0075]     The computer system  300  can be connected to one or more other similar computers via a input/output (I/O) interface  365  using a communication channel  385  to a network  380 , represented as the Internet.  
         [0076]     The computer software program may be provided as a computer program product, and recorded on a portable storage medium. In this case, the computer software program is accessed by the computer system  300  from the storage device  355 . Alternatively, the computer software can be accessed directly from the network  380  by the computer  320 . In either case, a user can interact with the computer system  300  using the keyboard  310  and mouse  315  to operate the programmed computer software executing on the computer  320 .  
         [0077]     The computer system  300  is described for illustrative purposes: other configurations or types of computer systems can be equally well used to implement the described techniques. The foregoing is only an example of a particular type of computer system suitable for implementing the described techniques.  
         [0000]     Overview  
         [0078]     Though techniques are described herein in the context of neural networks, other implementations are possible, such as those involving genetic algorithms, as noted above.  
         [0079]      FIG. 4  flowcharts a generic implementation that does not necessarily use neural network capabilities. In step  410 , an at least partly ranked list of multi-attribute objects is received. In step  420 , an error measure associated with an implied utility function is calculated. In step  430 , the implied utility function is revised, based upon the calculated error measure.  
         [0080]     In step  440 , a determination is made concerning whether the revised implied utility function is satisfactory. If the implied utility function is satisfactory, the implied utility function is accepted in step  450 . Otherwise, steps  420  to  440  are repeated until the revised utility function is found to be satisfactory.  
       CONCLUSION  
       [0081]     In the case of a RFQ problem, a buyer receives a set of responses from his suppliers, the buyer can choose a subset of the received responses and rank these responses. The ranked subset can be presented to the above-described algorithm to train a neural network to represent this utility function. This utility function so computed by the described algorithm can then be used to order the entire set of responses. The buyer is likely to choose a winning responses from amongst the top ranking responses.  
         [0082]     Various analogous contexts exist in which the described techniques can also be applied in a similar manner.  
         [0083]     The described techniques for learning a utility function over a subset of ranked objects have the following advantages.  
         [0084]     No restriction is imposed on interactions between the individual attribute utilities.  
         [0085]     No prior knowledge of individual attribute utility functions is required. Neural networks can be used to learn user utility functions from the ranked list.  
         [0086]     The objective function can be optimized with computing tools such as decision trees, support vector machines, evolutionary algorithms, Bayesian and belief networks, probabilistic reasoning.  
         [0087]     The techniques described herein require only a set of ranked objects to generate a utility function.  
         [0088]     Various alterations and modifications can be made to the techniques and arrangements described herein, as would be apparent to one skilled in the relevant art.

Technology Classification (CPC): 6