Now showing items 1-10 of 17
Impulsive Reaction-Diffusion Delayed Models in Biology: Integral Manifolds Approach
In this paper we study an impulsive delayed reaction-diffusion model applied in biology. The introduced model generalizes existing reaction-diffusion delayed epidemic models to the impulsive case. The integral manifolds ...
Computational Mathematics and Neural Systems
This special issue was conceived to explore the latest advancements in the field of computational techniques for solving forward and inverse problems [...]
Lyapunov Approach for Almost Periodicity in Impulsive Gene Regulatory Networks of Fractional Order with Time-Varying Delays
This paper investigates a class of fractional-order delayed impulsive gene regulatory networks (GRNs). The proposed model is an extension of some existing integer-order GRNs using fractional derivatives of Caputo type. The ...
Impulsive Delayed Lasota–Wazewska Fractional Models: Global Stability of Integral Manifolds
In this paper we deal with the problems of existence, boundedness and global stability of integral manifolds for impulsive Lasota–Wazewska equations of fractional order with time-varying delays and variable impulsive ...
Fractional Lotka-Volterra-Type Cooperation Models: Impulsive Control on Their Stability Behavior
We present a biological fractional <i>n</i>-species delayed cooperation model of Lotka-Volterra type. The considered fractional derivatives are in the Caputo sense. Impulsive control strategies are applied for several ...
On the Stability with Respect to H-Manifolds for Cohen–Grossberg-Type Bidirectional Associative Memory Neural Networks with Variable Impulsive Perturbations and Time-Varying Delays
The present paper is devoted to Bidirectional Associative Memory (BAM) Cohen–Grossberg-type impulsive neural networks with time-varying delays. Instead of impulsive discontinuities at fixed moments of time, we consider ...
Stability of Sets Criteria for Impulsive Cohen-Grossberg Delayed Neural Networks with Reaction-Diffusion Terms
The paper proposes an extension of stability analysis methods for a class of impulsive reaction-diffusion Cohen-Grossberg delayed neural networks by addressing a challenge namely stability of sets. Such extended concept ...
Impulsive Fractional Cohen-Grossberg Neural Networks: Almost Periodicity Analysis
In this paper, a fractional-order Cohen–Grossberg-type neural network with Caputo fractional derivatives is investigated. The notion of almost periodicity is adapted to the impulsive generalization of the model. General ...
Impulsive Fractional-Like Differential Equations: Practical Stability and Boundedness with Respect to h-Manifolds
In this paper, an impulsive fractional-like system of differential equations is introduced. The notions of practical stability and boundedness with respect to <i>h</i>-manifolds for fractional-like differential equations ...
Practical Stability with Respect to h-Manifolds for Impulsive Control Functional Differential Equations with Variable Impulsive Perturbations
The present paper is devoted to the problems of practical stability with respect to <i>h</i>-manifolds for impulsive control differential equations with variable impulsive perturbations. We will consider these problems in ...