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Finite-Time Solution of Time-Varying Tensor Inversion by a Novel Dynamic-Parameter Zeroing Neural-Network

Lin Xiao, Xiaopeng Li, Wenqian Huang, Lei Jia

2021IEEE Transactions on Industrial Informatics21 citationsDOI

Abstract

Time-varying tensor inversion (TVTI) problem is a kind of general time-varying inversion problem in mathematics because scalars, vectors, and matrices can all be represented by tensors. The TVTI problem is based on a novel tensor product [termed the TensorFlow (TF) product], which is extracted from the TF. For solving such a prevalent problem, the matricization of the TF product is defined, and a novel dynamic-parameter zeroing neural-network (DP-ZNN) model is proposed by combining a ZNN design formula and a dynamic-parameter. The global convergence and the upper bound of finite-time convergence of the DP-ZNN model are analyzed theoretically. For highlighting the superior convergence performance and excellent efficiency of the DP-ZNN model in solving the TVTI problem, three comparative experiments are presented in this article. Experimental results show that the DP-ZNN model has remarkable convergent speciality.

Topics & Concepts

Tensor productArtificial neural networkConvergence (economics)Applied mathematicsInversion (geology)Tensor (intrinsic definition)MathematicsMathematical optimizationRecurrent neural networkComputer scienceArtificial intelligencePure mathematicsEconomic growthStructural basinEconomicsPaleontologyBiologyTensor decomposition and applicationsModel Reduction and Neural NetworksAdvanced Numerical Analysis Techniques
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