论文信息 - A minimax approach to development of robust discrimination algorithms for multivariate mixture distributions

A minimax approach to development of robust discrimination algorithms for multivariate mixture distributions

Addresses the two class discrimination problem in the case that each class can be viewed as being composed of a finite number of types. The prior probabilities for the types comprising both classes are unknown, the class costs are known and the conditional densities for the types are real analytic functions. An algorithm is presented that can be used to estimate an optimal discriminant function that is robust in the minimax sense. The algorithm involves a search over a set of prior weights. The convergence properties of the algorithm are examined in a series of tests involving Gaussian mixture densities.<<ETX>>

T. E. Flick | Lee K. Jones | R. G. Priest

[1] J Wolfowitz,et al. Elimination of Randomization in Certain Problems of Statistics and of the Theory of Games. , 1950, Proceedings of the National Academy of Sciences of the United States of America.

[2] P. J. Huber. Robust Estimation of a Location Parameter , 1964 .

[3] L. Jones. On finding non-randomized minimax tests for statistical decision problems with applications to signal detection , 1984 .

[4] Stuart C. Schwartz,et al. Robust detection of a known signal in nearly Gaussian noise , 1971, IEEE Trans. Inf. Theory.

[5] S.A. Kassam,et al. Robust techniques for signal processing: A survey , 1985, Proceedings of the IEEE.

[6] P. J. Huber. A Robust Version of the Probability Ratio Test , 1965 .