Vector Quantizers (VQ) can be exploited for classification. In particular the gradient of the error probability performed by a VQ with respect to the position of its code vectors can be formally derived, hence the optimum VQ can be theoretically found. Unfortunately, this equation is of limited use in practice, since it relies on the knowledge of the class conditional probability distributions. In order to apply the method to real problems where distributions are unknown, a stochastic approximation has been previously proposed to derive a practical learning algorithm. In this paper we relax some of the assumptions underlying the original proposal and study the advantages of the resulting algorithm by both synthetic and real case studies
In classification problems, it is preferred to attack the discrimination problem directly rather tha...
We present an introductory survey to optimal vector quantization and its first application...
Stochastic Approximation (SA) is a classical algorithm that has had since the early days a huge impa...
Vector Quantizers (VQ) can be exploited for classification. In particular the gradient of the error ...
Vector Quantization (VQ) has its origins in signal processing where it is used for compact, accurate...
This paper proposes a variant of the generalized learning vector quantizer (GLVQ) optimizing explici...
Combined compression and classification problems are becoming increasingly important in many applica...
Learning vector quantization (LVQ) schemes constitute intuitive, powerful classification heuris-tics...
In this thesis we study several properties of Learning Vector Quantization. LVQ is a nonparametric d...
In this paper, we present two new stochastic approximation algorithms for the problem of quantile es...
Learning vector quantization (LVQ) schemes constitute intuitive, powerful classification heuristics ...
Generalized Matrix Learning Vector Quantization (GMLVQ) critically relies on the use of an optimizat...
Learning vector quantization (LVQ) constitutes a powerful and intuitive method for adaptive nearest ...
The field of machine learning concerns the design of algorithms to learn and recognize complex patte...
In classification problems, it is preferred to attack the discrimination problem directly rather tha...
We present an introductory survey to optimal vector quantization and its first application...
Stochastic Approximation (SA) is a classical algorithm that has had since the early days a huge impa...
Vector Quantizers (VQ) can be exploited for classification. In particular the gradient of the error ...
Vector Quantization (VQ) has its origins in signal processing where it is used for compact, accurate...
This paper proposes a variant of the generalized learning vector quantizer (GLVQ) optimizing explici...
Combined compression and classification problems are becoming increasingly important in many applica...
Learning vector quantization (LVQ) schemes constitute intuitive, powerful classification heuris-tics...
In this thesis we study several properties of Learning Vector Quantization. LVQ is a nonparametric d...
In this paper, we present two new stochastic approximation algorithms for the problem of quantile es...
Learning vector quantization (LVQ) schemes constitute intuitive, powerful classification heuristics ...
Generalized Matrix Learning Vector Quantization (GMLVQ) critically relies on the use of an optimizat...
Learning vector quantization (LVQ) constitutes a powerful and intuitive method for adaptive nearest ...
The field of machine learning concerns the design of algorithms to learn and recognize complex patte...
In classification problems, it is preferred to attack the discrimination problem directly rather tha...
We present an introductory survey to optimal vector quantization and its first application...
Stochastic Approximation (SA) is a classical algorithm that has had since the early days a huge impa...