Title :
Stochastic orthogonal and nonorthogonal subspace basis pursuit
Author :
Isaacs, Jason C.
Author_Institution :
Naval Surface Warfare Center, Panama City, FL, USA
Abstract :
Component analysis, or basis methods, provide a lower-dimensional representation of a given data set for compression, compaction, or discrimination. Stochastic basis pursuit addresses the problem of finding an optimal basis, either orthogonal or nonorthogonal, for improved pattern discrimination for pattern recognition applications. In this paper, the results of experiments performed with two stochastic optimization techniques as applied to the optimal basis problem are reported. The cost function is a quadratic discriminant function. Testing is done using three publicly available databases and ten-fold cross-validation. Empirical results demonstrate a twelve to fifteen percent average performance improvement over previous results.
Keywords :
pattern recognition; principal component analysis; quadratic programming; stochastic programming; component analysis; data compaction; data compression; data discrimination; optimal basis; pattern discrimination; pattern recognition; quadratic discriminant function; stochastic nonorthogonal subspace basis pursuit; stochastic optimization; stochastic orthogonal subspace basis pursuit; Assembly; Cost function; Dictionaries; Eigenvalues and eigenfunctions; Independent component analysis; Kernel; Matching pursuit algorithms; Principal component analysis; Stochastic processes; Testing;
Conference_Titel :
Neural Networks, 2009. IJCNN 2009. International Joint Conference on
Conference_Location :
Atlanta, GA
Print_ISBN :
978-1-4244-3548-7
Electronic_ISBN :
1098-7576
DOI :
10.1109/IJCNN.2009.5178937
