{"docId":10439,"paperId":10439,"url":"https:\/\/cm.episciences.org\/10439","doi":"10.46298\/cm.10439","journalName":"Communications in Mathematics","issn":"1804-1388","eissn":"2336-1298","volume":[{"vid":673,"name":"Volume 31 (2023), Issue 1"}],"section":[],"repositoryName":"arXiv","repositoryIdentifier":"2212.03585","repositoryVersion":2,"repositoryLink":"https:\/\/arxiv.org\/abs\/2212.03585v2","dateSubmitted":"2022-12-08 03:22:42","dateAccepted":"2022-12-08 10:40:07","datePublished":"2022-12-13 11:03:11","titles":["Exponential stability for a nonlinear porous-elastic system with delay"],"authors":["Santos, M. J. Dos","Raposo, C. A.","Miranda, L. G. R.","Feng, B."],"abstracts":["In this work, we consider the existence of global solution and the exponential decay of a nonlinear porous elastic system with time delay. The nonlinear term as well as the delay acting in the equation of the volume fraction. In order to obtain the existence and uniqueness of a global solution, we will use the semigroup theory of linear operators and under a certain relation involving the coefficients of the system together with a Lyapunov functional, we will establish the exponential decay of the energy associated to the system.","Comment: Manuscript, 21 pages"],"keywords":["Mathematics - Analysis of PDEs","35A02 (Primary) 35B35, 35B40 (Secondary)","A.0"]}