Your search keyword '"Wang, Yejuan"' showing total 5 results

1. Mean-square stability analysis of stochastic delay evolution equations driven by fractional Brownian motion with Hurst index $ H\in(0,1) $.

Author

Wang, Yejuan, Cao, Gang, and Kloeden, Peter E.

Subjects

EVOLUTION equations, STOCHASTIC analysis, BROWNIAN motion, EXPONENTIAL stability, STOCHASTIC integrals, INTEGRAL inequalities, LINEAR matrix inequalities, DELAY differential equations

Abstract

In this paper, we consider stochastic evolution equations with finite delay driven by fractional Brownian motion (fBm) with Hurst index $ H\in(0,1) $. First, the global existence and uniqueness of mild solutions are established by using a temporally weighted norm, the semigroup theory, the Banach fixed point theorem, and a new estimate of the stochastic integral with respect to fBm. Then after extending the integral inequality to the general case, we obtain the mean-square exponential stability of mild solutions. In particular, the convolution method and the Young convolution inequality are utilized to deal with the difficulty of the noise term caused by fBm with Hurst index $ H\in(0,1) $. Finally, the stochastic evolution equation with multiple time-varying delays and the reaction diffusion neural networks system with time-varying delay are considered, and the global existence, uniqueness and exponential stability of mild solutions are proved by using the abstract results. [ABSTRACT FROM AUTHOR]

Published

2024

2. Existence and regularity results for semilinear stochastic time-tempered fractional wave equations with multiplicative Gaussian noise and additive fractional Gaussian noise.

Author

Li, Yajing, Wang, Yejuan, Deng, Weihua, and Nie, Daxin

Subjects

RANDOM noise theory, SEMILINEAR elliptic equations, FRACTIONAL powers, CAPUTO fractional derivatives, POWER law (Mathematics), ELLIPTIC operators, WAVE equation, INHOMOGENEOUS materials

Abstract

To model wave propagation in inhomogeneous media with frequency-dependent power-law attenuation, it is needed to use the fractional powers of symmetric coercive elliptic operators in space and the Caputo tempered fractional derivative in time. The model studied in this paper is semilinear stochastic space-time fractional wave equations driven by infinite dimensional multiplicative Gaussian noise and fractional Gaussian noise, because of the potential fluctuations of the external sources. We first give a representation of the mild solution and some stability estimates for the homogeneous problem, and then prove the existence and uniqueness of the mild solution by using fixed point theorem. Finally, the decay and regularity theory of the solution are provided. [ABSTRACT FROM AUTHOR]

Published

2023

3. Asymptotic behaviour of time fractional stochastic delay evolution equations with tempered fractional noise.

Author

Liu, Yarong and Wang, Yejuan

Subjects

EVOLUTION equations, DELAY differential equations, STOCHASTIC integrals, BROWNIAN motion, NOISE

Abstract

This paper is concerned with stochastic delay evolution equations driven by tempered fractional Brownian motion (tfBm) $ B_Q^{\sigma, \lambda}(t) $ with time fractional operator of order $ \alpha\in (1/2+\sigma, 1) $, where $ \sigma\in (-1/2, 0) $ and $ \lambda>0 $. First, we establish the global existence and uniqueness of mild solutions by using the new established estimation of stochastic integrals with respect to tfBm. Moreover, based on the relations between the stochastic integrals with respect to tfBm and fBm, we show the continuity of mild solutions for stochastic delay evolution equations when tempered fractional noise is reduced to fractional noise. Finally, we analyze the stability with general decay rate (including exponential, polynomial and logarithmic stability) of mild solutions for stochastic delay evolution equations with tfBm and time tempered fractional operator. [ABSTRACT FROM AUTHOR]

Published

2023

4. Random attractors for stochastic delay wave equations on $ \mathbb{R}^n $ with linear memory and nonlinear damping.

Author

Wang, Jingyu, Wang, Yejuan, Yang, Lin, and Caraballo, Tomás

Subjects

WAVE equation, NONLINEAR wave equations, LINEAR equations, WHITE noise, ATTRACTORS (Mathematics)

Abstract

A non-autonomous stochastic delay wave equation with linear memory and nonlinear damping driven by additive white noise is considered on the unbounded domain R n. We establish the existence and uniqueness of a random attractor A that is compact in C ([ − h , 0 ] ; H 1 (R n)) × C ([ − h , 0 ] ; L 2 (R n)) × L μ 2 (R + ; H 1 (R n)) with 1 ⩽ n ⩽ 3. [ABSTRACT FROM AUTHOR]

Published

2022

5. Morse decomposition for gradient-like multi-valued autonomous and nonautonomous dynamical systems.

Author

Wang, Yejuan and Caraballo, Tomás

Subjects

MORSE theory, METRIC spaces, PHASE space

Abstract

In this paper, we first prove that the property of being a gradient-like general dynamical system and the existence of a Morse decomposition are equivalent. Next, the stability of gradient-like general dynamical systems is analyzed. In particular, we show that a gradient-like general dynamical system is stable under perturbations, and that Morse sets are upper semi-continuous with respect to perturbations. Moreover, we prove that any solution of perturbed general dynamical systems should be close to some Morse set of the unperturbed gradient-like general dynamical system. We do not assume local compactness for the metric phase space , unlike previous results in the literature. Finally, we extend the Morse decomposition theory of single-valued nonautonomous dynamical systems to the multi-valued case, without imposing any compactness of the parameter spaces. [ABSTRACT FROM AUTHOR]

Published

2020