Abstract

In this paper, the existence and exponential stability of mild solutions of semilinear differential equations with random impulses are studied under non-uniqueness in a real separable Hilbert space. The results are obtained by using the Leray–Schauder alternative fixed point theorem.

Full Text
Paper version not known

Talk to us

Join us for a 30 min session where you can share your feedback and ask us any queries you have

Schedule a call

Similar Papers

Paper Title
Journal
Date
Author
Existence of mild solutions for semilinear differential equations with nonlocal and impulsive conditions
Leszek Olszowy
Central European Journal of Mathematics | VOL. 12
Leszek OlszowyLeszek Olszowy
17 Jan 2014
Asymptotic behavior of orbits of C 0-semigroups and solutions of linear and semilinear abstract differential equations
B Basit ... A J Pryde
Russian Journal of Mathematical Physics | VOL. 13
B Basit, et. al.B Basit ... A J Pryde
01 Mar 2006
Fixed points and exponential stability of mild solutions of stochastic partial differential equations with delays
Jiaowan Luo
Journal of Mathematical Analysis and Applications | VOL. 342
Jiaowan LuoJiaowan Luo
17 Nov 2007
Stability of stochastic neutral partial functional differential equations under Hölder type conditions
T E Govindan
Differential and Integral Equations | VOL. 22
T E GovindanT E Govindan
01 May 2009
View more papers

More From: Nonlinear Analysis

Paper Title
Journal
Date
Author
Editorial Board
-
Nonlinear Analysis | VOL. 245
--
01 Aug 2024
Manifold-constrained free discontinuity problems and Sobolev approximation
Federico Luigi Dipasquale ... Bianca Stroffolini
Nonlinear Analysis | VOL. 247
Federico Luigi Dipasquale, et. al.Federico Luigi Dipasquale ... Bianca Stroffolini
05 Jul 2024
Editorial Board
-
Nonlinear Analysis | VOL. 244
--
01 Jul 2024
Long-time dynamics for the energy critical heat equation in [formula omitted]
Zaizheng Li ... Yifu Zhou
Nonlinear Analysis | VOL. 247
Zaizheng Li, et. al.Zaizheng Li ... Yifu Zhou
25 Jun 2024
View more papers