EXPONENTIAL APPROXIMATION OF SOLUTIONS OF BIDIRECTIONAL NEURAL NETWORKS MODEL WITH POSITIVE DELAY
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Aníbal Coronel | Swati Tyagi | Syed Abbas | Manuel Pinto | M. Pinto | A. Coronel | Swati Tyagi | Syed Abbas
[1] M. Pinto,et al. Existence, computability and stability for solutions of the diffusion equation with general piecewise constant argument , 2015 .
[2] Alberto Cabada,et al. Green's function and comparison principles for first order periodic differential equations with piecewise constant arguments☆ , 2004 .
[3] S. Shah,et al. ADVANCED DIFFERENTIAL EQUATIONS WITH PIECEWISE CONSTANT ARGUMENT DEVIATIONS , 1983 .
[4] L. Dai,et al. On Oscillatory Motion of Spring-Mass Systems Subjected to Piecewise Constant Forces , 1991 .
[5] Pauline van den Driessche,et al. Global Attractivity in Delayed Hopfield Neural Network Models , 1998, SIAM J. Appl. Math..
[6] M. Pinto,et al. Uniform Euler approximation of solutions of fractional-order delayed cellular neural network on bounded intervals , 2017 .
[7] Tsuyoshi Murata,et al. {m , 1934, ACML.
[8] Gerhard-Wilhelm Weber,et al. An Anticipatory Extension of Malthusian Model , 2006 .
[9] K. Gopalsamy. Stability and Oscillations in Delay Differential Equations of Population Dynamics , 1992 .
[10] Xinghua Wang,et al. The existence and exponential attractivity of κ-almost periodic sequence solution of discrete time neural networks , 2007 .
[11] Yonghui Xia,et al. Almost Automorphic Solutions of Impulsive Cellular Neural Networks with Piecewise Constant Argument , 2014, Neural Processing Letters.
[12] Xinghua Wang,et al. Exponential attractor of kappa-almost periodic sequence solution of discrete-time bidirectional neural networks , 2010, Simul. Model. Pract. Theory.
[13] Rong Yuan,et al. On Quasi-Periodic Solutions of Differential Equations with Piecewise Constant Argument , 2002 .
[14] Manuel Pinto,et al. Existence and stability of almost periodic solutions in impulsive neural network models , 2010, Appl. Math. Comput..
[15] Istevan Györi. On approximation of the solutions of delay differential equations by using piecewise constant arguments , 1991 .
[16] J. P. Lasalle. The stability and control of discrete processes , 1986 .
[17] EXISTENCE AND STABILITY OF ALMOST PERIODIC SOLUTIONS TO DIFFERENTIAL EQUATIONS WITH PIECEWISE CONSTANT ARGUMENTS , 2015 .
[18] Joseph Wiener,et al. Generalized Solutions of Functional Differential Equations , 1993 .
[19] V. Sree Hari Rao,et al. Dynamics of Bidirectional Associative Memory Networks with Processing Delays , 2004 .
[20] BART KOSKO,et al. Bidirectional associative memories , 1988, IEEE Trans. Syst. Man Cybern..
[21] Ian Stewart,et al. Warning — handle with care! , 1992, Nature.
[22] K. Gopalsamy,et al. Exponential stability of continuous-time and discrete-time cellular neural networks with delays , 2003, Appl. Math. Comput..
[23] W. Enright,et al. Convergence Analysis of the Solution of Retarded and Neutral Delay Differential Equations by Continuous Numerical Methods , 1998 .
[24] Kenneth L. Cooke,et al. Retarded differential equations with piecewise constant delays , 1984 .
[25] Xinghua Wang,et al. The existence and global attractivity of almost periodic sequence solution of discrete-time neural networks , 2006 .
[26] S. Abbas,et al. Existence and Attractivity of k-Pseudo Almost Automorphic Sequence Solution of a Model of Bidirectional Neural Networks , 2012 .
[27] Stavros Busenberg,et al. MODELS OF VERTICALLY TRANSMITTED DISEASES WITH SEQUENTIAL-CONTINUOUS DYNAMICS , 1982 .
[28] J. Hale. Theory of Functional Differential Equations , 1977 .
[29] Marat Akhmet,et al. Neural Networks with Discontinuous/Impact Activations , 2013 .
[30] M. Pinto,et al. Existence and Global Convergence of Periodic Solutions in Recurrent Neural Network Models with a General Piecewise Alternately Advanced and Retarded Argument , 2014 .
[31] S. Abbas,et al. Pseudo Almost Periodic Sequence Solutions of Discrete Time Cellular Neural Networks , 2009 .
[32] M. Pinto,et al. Approximation of Solutions of Fractional-Order Delayed Cellular Neural Network on [0,∞)\documentclass[12pt]{minimal} \usepackage{amsmath} \usepackage{wasysym} \usepackage{amsfonts} \usepackage{amssymb} \usepackage{amsbsy} \usepackage{mathrsfs} \usepackage{upgreek} \setlength{\oddsidemargin}{-69pt} \ , 2016, Mediterranean Journal of Mathematics.
[33] G. Ladas,et al. Oscillation Theory of Delay Differential Equations: With Applications , 1992 .