The author introduces a variant of (supervised) learning vector quantization (LVQ) and discusses practical problems associated with the application of the algorithms. The LVQ algorithms work explicitly in the input domain of the primary observation vectors, and their purpose is to approximate the theoretical Bayes decision borders using piecewise linear decision surfaces. This is done by purported optimal placement of the class codebook vectors in signal space. As the classification decision is based on the nearest-neighbor selection among the codebook vectors, its computation is very fast. It has turned out that the differences between the presented algorithms in regard to the remaining discretization error are not significant, and thus the choice of the algorithm may be based on secondary arguments, such as stability in learning, in which respect the variant introduced (LVQ2.1) seems to be superior to the others. A comparative study of several methods applied to speech recognition is included