Showing total 10 results

1. Elastic shear modulus and density profiles inversion: Lipschitz stability results.

Author

Meftahi, H. and Potschka, A.

Subjects

MODULUS of rigidity, ELASTIC modulus, TISSUE mechanics, NONDESTRUCTIVE testing, INVERSE problems, SURFACE waves (Seismic waves)

Abstract

In this paper, we consider the inverse coefficients problem of recovering a shear modulus μ and density ρ of a medium from the Neumann-to-Dirichlet map. This inverse problem is motivated by the reconstruction of mechanical properties of tissues in non-destructive testing. We prove Lipschitz stability results for any dimension $ d \geq 2 $ d ≥ 2 , provided that the parameters μ and ρ have upper and lower bounds and belong to a known finite dimensional subspace. The proofs rely on monotonicity relations between the parameters and the Neumann-to-Dirichlet operator, combined with the techniques of localized potentials. [ABSTRACT FROM AUTHOR]

Published

2024

2. Forward dynamics of 3D double time-delayed MHD-Voight equations.

Author

Zhang, Qiangheng and Zhang, Qunli

Subjects

EQUATIONS, MAGNETOHYDRODYNAMICS, ATTRACTORS (Mathematics)

Abstract

This paper is concerned with the long-term behaviour of 3D double time-delayed magnetohydrodynamics (MHD)-Voight equations with non-autonomous forcing term. First, we establish the existence, forward compactness and forward stability of pullback attractors by the forward equi-continuity and forward pullback asymptotic compactness of solutions. We then study the upper semi-convergence of pullback attractors as the time parameter tends to positive infinity. Since the solution of this equation has no high regularity, we use the spectrum decomposition technique to prove the forward pointwise pullback asymptotic compactness of solutions. [ABSTRACT FROM AUTHOR]

Published

2024

3. Impulsive synchronisation of linear complex dynamical networks with time delay on time scales.

Author

Sun, Jie, Guo, Yingxin, and Niu, Qingrun

Subjects

TIME management, COMPUTER simulation

Abstract

In this paper, we investigate the impulsive synchronisation of linear complex dynamical networks (CDNs) with time delay on time scales by a method of pinning impulsive control. We use the time scales theory and the Lyapunov method to derive a synchronisation criterion. We find that we can achieve the synchronisation of CDNs through only controlling a small number of nodes and the modelling framework here can enrich the models of continuous/discrete-time CDNs. In the end, we give some numerical simulations to demonstrate the feasibility of the theoretical analysis. [ABSTRACT FROM AUTHOR]

Published

2023

4. Exponential input-to-state stability for neutral stochastic delay differential equations with Lévy noise and Markovian switching.

Author

Li, Shuixia and Chen, Huabin

Subjects

STOCHASTIC differential equations, EXPONENTIAL stability, DELAY differential equations, GENERALIZED integrals, INTEGRAL inequalities, NOISE

Abstract

This paper mainly focuses on the pth ( p ≥ 2)-moment input-to-state stability (ISS) of neutral stochastic delay differential equations (NSDDEs) with Lévy noise and Markovian switching. By using the generalized integral inequality and the Lyapunov function methodology, the ISS, integral input-to-state stability (iISS), and stochastic input-to-state stability (SISS) of such equations are obtained. When the input signal is a constant signal and a zero signal, the pth ( p ≥ 2)-moment ISS reduces to the pth ( p ≥ 2)-moment practical exponential stability and the pth ( p ≥ 2)-moment exponential stability, respectively. Finally, an example of the mass–spring–damping (MSD) model under the stochastic perturbation is given to verify the validity of the results. [ABSTRACT FROM AUTHOR]

Published

2023

5. Recurrent epidemic waves in a delayed epidemic model with quarantine.

Author

Kuniya, Toshikazu

Subjects

BASIC reproduction number, EPIDEMICS, HOPF bifurcations, QUARANTINE

Abstract

In this paper, we are concerned with an epidemic model with quarantine and distributed time delay. We define the basic reproduction number R 0 and show that if R 0 ≤ 1 , then the disease-free equilibrium is globally asymptotically stable, whereas if R 0 > 1 , then it is unstable and there exists a unique endemic equilibrium. We obtain sufficient conditions for a Hopf bifurcation that induces a nontrivial periodic solution which represents recurrent epidemic waves. By numerical simulations, we illustrate stability and instability parameter regions. Our results suggest that the quarantine and time delay play important roles in the occurrence of recurrent epidemic waves. [ABSTRACT FROM AUTHOR]

Published

2022

6. Stability and Hopf bifurcation of HIV-1 model with Holling II infection rate and immune delay.

Author

Liao, Maoxin, Liu, Yanjin, Liu, Shinan, and Meyad, Ali M.

Subjects

HOPF bifurcations, HIV, IMMUNE response, COMPUTER simulation, INFECTION

Abstract

This paper aims to analyse stability and Hopf bifurcation of the HIV-1 model with immune delay under the functional response of the Holling II type. The global stability analysis has been considered by Lyapunov–LaSalle theorem. And stability and the sufficient condition for the existence of Hopf Bifurcation of the infected equilibrium of the HIV-1 model with immune response are also studied. Some numerical simulations verify the above results. Finally, we propose a novel three dimension system to the future study. [ABSTRACT FROM AUTHOR]

Published

2022

7. Exploration on dynamics in a discrete predator–prey competitive model involving feedback controls.

Author

Xu, Changjin, Cui, Xiaohan, Li, Peiluan, Yan, Jinling, and Yao, Lingyun

Subjects

PREDATION, COMPUTER simulation, FRUIT, PSYCHOLOGICAL feedback

Abstract

In this work, we set up a new discrete predator–prey competitive model with time-varying delays and feedback controls. By virtue of the difference inequality knowledge, a sufficient condition which guarantees the permanence of the established discrete predator–prey competitive model with time-varying delays and feedback controls is derived. Under some appropriate parameter conditions, we have proved that the periodic solution of the system without delay exists and globally attractive. To verify the correctness of the derived theoretical fruits, we give two examples and execute computer simulations. Our obtained results are novel and complement previous known results. [ABSTRACT FROM AUTHOR]

Published

2023

8. Input-to-state stability for large-scale stochastic impulsive systems with state delay.

Author

Alwan, Mohamad S., Liu, Xinzhi, Sugati, Taghreed G., and Kiyak, Humeyra

Subjects

STOCHASTIC systems, SYSTEM failures, TIME delay systems, DELAY differential equations, HOPFIELD networks, STOCHASTIC differential equations

Abstract

This article addresses a class of large-scale stochastic impulsive systems with time delay and time-varying input disturbance having bounded magnitude. The main interest is to develop sufficient conditions for the input-to-state stability (ISS) and stabilization in the presence of impulsive effects. The method of Razumikhin–Lyapunov function is used to develop the ISS and stabilization properties. Later, these results are applied to a class of control systems where the controller actuators are susceptible to failures. It should be noted that our results are delay independent, and the designed reliable controller is robust with respect to the actuator failures and to the system uncertainties. It is also observed that if the isolated continuous system is ISS and subjected to bounded impulsive effects, then the resulting impulsive system preserves the ISS property. Moreover, if the isolated continuous subsystems are all ISS and the interconnection amongst them is bounded from above, then the impulsive interconnected system is ISS provided that the degree of stability of each subsystem is larger than the magnitude of interconnection. If the underlying continuous system is unstable, then the input-to-state stabilization of the impulsive system is guaranteed if the stabilizing impulses are applied to the system frequently. As an implication to these results, if the input disturbance is zero, then the input-to-state stability (or stabilization) reduces to the stability (or stabilization) of the equilibrium state of the underlying disturbance-free system. A numerical example and simulations are provided to illustrate the proposed results. [ABSTRACT FROM AUTHOR]

Published

2023

9. Sufficient conditions on finite-time input-to-state stability of nonlinear impulsive systems: a relaxed Lyapunov function method.

Author

Wang, Zengyun, Cao, Jinde, and Cai, Zuowei

Subjects

STABILITY of nonlinear systems, LYAPUNOV functions, NONLINEAR systems

Abstract

This article presents sufficient conditions on Finite-Time Input-to-State Stability (FTISS) of nonlinear impulsive systems, which gathers the analysis of Input-to-State stability (ISS) and finite-time convergence rate. By utilising the Finite-Time Stable Function Pair (FTSFP) and Generalised K L ( G K L ) function, we established an unified FTISS criterion for nonlinear impulsive systems, in which the impulses maybe beneficial to stabilisation or detrimental to stabilisation. Moreover, a relaxed Lyapunov Function (LF) method is used to investigate FTISS. Compared with the traditional LF method, the main advantage is that the constructed LF is permitted to own indefinite-derivative. As a special case of FTISS, a corollary on Finite-Time Stability (FTS) is established, which is applicable to investigate the realisation of FTS for nonlinear system via impulsive control strategy. Finally, the proposed results are supported by two practical numerical examples. [ABSTRACT FROM AUTHOR]

Published

2022

10. Effects of social-distancing on infectious disease dynamics: an evolutionary game theory and economic perspective.

Author

Martcheva, Maia, Tuncer, Necibe, and Ngonghala, Calistus N.

Subjects

GAME theory, COMMUNICABLE diseases, PANDEMICS, DISEASE eradication, COVID-19 pandemic, SOCIAL norms

Abstract

We propose two models inspired by the COVID-19 pandemic: a coupled disease-human behaviour (or disease-game theoretic), and a coupled disease-human behaviour-economic model, both of which account for the impact of social-distancing on disease control and economic growth. The models exhibit rich dynamical behaviour including multistable equilibria, a backward bifurcation, and sustained bounded periodic oscillations. Analyses of the first model suggests that the disease can be eliminated if everybody practices full social-distancing, but the most likely outcome is some level of disease coupled with some level of social-distancing. The same outcome is observed with the second model when the economy is weaker than the social norms to follow health directives. However, if the economy is stronger, it can support some level of social-distancing that can lead to disease elimination. [ABSTRACT FROM AUTHOR]

Published

2021