Generalization Performance of Fisher Linear Discriminant Based on Markov Sampling

Author

Bin Zou ; Luoqing Li ; Zongben Xu ; Tao Luo ; Yuan Yan Tang

Author_Institution

Fac. of Math. & Comput. Sci., Hubei Univ., Wuhan, China

Volume

24

Issue

2

fYear

2013

fDate

Feb. 2013

Firstpage

288

Lastpage

300

Abstract

Fisher linear discriminant (FLD) is a well-known method for dimensionality reduction and classification that projects high-dimensional data onto a low-dimensional space where the data achieves maximum class separability. The previous works describing the generalization ability of FLD have usually been based on the assumption of independent and identically distributed (i.i.d.) samples. In this paper, we go far beyond this classical framework by studying the generalization ability of FLD based on Markov sampling. We first establish the bounds on the generalization performance of FLD based on uniformly ergodic Markov chain (u.e.M.c.) samples, and prove that FLD based on u.e.M.c. samples is consistent. By following the enlightening idea from Markov chain Monto Carlo methods, we also introduce a Markov sampling algorithm for FLD to generate u.e.M.c. samples from a given data of finite size. Through simulation studies and numerical studies on benchmark repository using FLD, we find that FLD based on u.e.M.c. samples generated by Markov sampling can provide smaller misclassification rates compared to i.i.d. samples.

Keywords

Markov processes; Monte Carlo methods; generalisation (artificial intelligence); pattern classification; sampling methods; FLD; Fisher linear discriminant; Markov chain Monte Carlo methods; Markov sampling algorithm; benchmark repository; dimensionality classification; dimensionality reduction; generalization ability; generalization performance; high-dimensional data; i.i.d. samples; identically distributed samples; low-dimensional space; maximum class separability; misclassification rates; u.e.M.c. samples; uniformly ergodic Markov chain; Benchmark testing; Covariance matrix; Educational institutions; Learning systems; Markov processes; Numerical models; Training; Fisher linear discriminant (FLD); Markov sampling; generalization performance; uniformly ergodic Markov chain;

fLanguage

English

Journal_Title

Neural Networks and Learning Systems, IEEE Transactions on

Publisher

ieee

ISSN

2162-237X

Type

jour

DOI

10.1109/TNNLS.2012.2230406

Filename

6392972