Abstract
Based on the probability theory and polynomial interpolation and approximation theory, a two-input Gegenbauer orthogonal neural network (TIGONN) is investigated and constructed in this paper. In order to avoid inherent problems of back-propagation (BP) training algorithm, a weights-direct-determination (WDD) is applied to calculate the optimal connecting weights of TIGONN proposed. Then, based on WDD, a growing and pruning weights and structure determination (GPWSD) is developed to determine the optimal connecting weights and optimal number of neurons in hidden layer, by combining growing weights and structure determination (GWSD) and post-pruning scheme. Furthermore, numerical verifications are also conducted to substantiate the superiority and efficacy of TIGONN with GPWSD in terms of approximation and denoising.
Supported by the National Key R&D Program of China under Grant 2017YFB1002505, National Natural Science Foundation of China under Grants 61603142 and 61633010, Guangdong Foundation for Distinguished Young Scholars under Grant 2017A030306009, The Guangdong Youth Talent Support Program of Scientific and Technological Innovation under Grant 2017TQ04X475, the Fundamental Research Funds for Central Universities under Grant 2017MS049, National Key Basic Research Program of China (973 Program) under Grant 2015CB351703.
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Zhang, Z., He, J., Tang, L. (2019). Two-Input Gegenbauer Orthogonal Neural Network with Growing-and-Pruning Weights and Structure Determination. In: Sun, F., Liu, H., Hu, D. (eds) Cognitive Systems and Signal Processing. ICCSIP 2018. Communications in Computer and Information Science, vol 1006. Springer, Singapore. https://doi.org/10.1007/978-981-13-7986-4_26
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