Existence and Uniqueness for a Class of SPDEs Driven by L'{e}vy Noise in Hilbert Spaces
Journal: Sahand Communications in Mathematical Analysis (Vol.18, No. 3)Publication Date: 2021-08-01
Authors : Majid Zamani; S. Mansour Vaezpour; Erfan Salavati;
Page : 51-68
Keywords : Poisson random measure; Mild solution; Measure of noncompactness; Condensing operator;
Abstract
The present paper seeks to prove the existence and uniqueness of solutions to stochastic evolution equations in Hilbert spaces driven by both Poisson random measure and Wiener process with non-Lipschitz drift term. The proof is provided by the theory of measure of noncompactness and condensing operators. Moreover, we give some examples to illustrate the application of our main theorem.
Other Latest Articles
- On Some Linear Operators Preserving Disjoint Support Property
- A Generalized Class of Univalent Harmonic Functions Associated with a Multiplier Transformation
- Fixed Points of $p$-Hybrid $L$-Fuzzy Contractions
- On Uncountable Frames and Riesz Bases in Nonseparable Banach Spaces
- The Generalized Inequalities via Means and Positive Linear Mappings
Last modified: 2022-07-31 17:27:47