论文信息 - Complex-Valued Multilayer Perceptron Search Utilizing Eigen Vector Descent and Reducibility Mapping

Complex-Valued Multilayer Perceptron Search Utilizing Eigen Vector Descent and Reducibility Mapping

A complex-valued multilayer perceptron (MLP) can approximate a periodic or unbounded function, which cannot be easily realized by a real-valued MLP. Its search space is full of crevasse-like forms having huge condition numbers; thus, it is very hard for existing methods to perform efficient search in such a space. The space also includes the structure of reducibility mapping. The paper proposes a new search method for a complex-valued MLP, which employs both eigen vector descent and reducibility mapping, aiming to stably find excellent solutions in such a space. Our experiments showed the proposed method worked well.

Shinya Suzumura | Ryohei Nakano | S. Suzumura | R. Nakano

[1] Yasuaki Kuroe,et al. On Activation Functions for Complex-Valued Neural Networks - Existence of Energy Functions , 2003, ICANN.

[2] Henry Leung,et al. The complex backpropagation algorithm , 1991, IEEE Trans. Signal Process..

[3] Erkki Oja,et al. Artificial Neural Networks and Neural Information Processing — ICANN/ICONIP 2003 , 2003, Lecture Notes in Computer Science.

[4] Ken Kreutz-Delgado,et al. The Complex Gradient Operator and the CR-Calculus ECE275A - Lecture Supplement - Fall 2005 , 2009, 0906.4835.

[5] Kazuyuki Murase,et al. Wirtinger Calculus Based Gradient Descent and Levenberg-Marquardt Learning Algorithms in Complex-Valued Neural Networks , 2011, ICONIP.

[6] Tülay Adali,et al. Approximation by Fully Complex Multilayer Perceptrons , 2003, Neural Computation.

[7] Tohru Nitta,et al. Reducibility of the Complex-valued Neural Network , 2004 .

[8] Héctor J. Sussmann,et al. Uniqueness of the weights for minimal feedforward nets with a given input-output map , 1992, Neural Networks.

[9] David G. Luenberger,et al. Linear and nonlinear programming , 1984 .

[10] Ryohei Nakano,et al. Learning Method Utilizing Singular Region of Multilayer Perceptron , 2011, IJCCI.

[11] Kenji Fukumizu,et al. Local minima and plateaus in hierarchical structures of multilayer perceptrons , 2000, Neural Networks.