EXISTENCE OF GLOBAL WEAK SOLUTIONS FOR A p-LAPLACIAN INEQUALITY WITH STRONG DISSIPATION IN NONCYLINDRICAL DOMAINS

Ferreira, JorgePiskin, ErhanShahrouzi, MohammadCordeiro, SebastiaoRaposo, Carlos Alberto2024-04-242024-04-2420221072-6691https://hdl.handle.net/11468/20887In this work, we obtain global solutions for nonlinear inequalities of p -Laplacian type in noncylindrical domains, for the unilateral problem with strong dissipation u '' - delta(pu) - delta u ' -f >= 0 in Q(0), where delta(p) is the nonlinear p -Laplacian operator with 2 <= p < infinity, and Q(0) is the noncylindrical domain. Our proof is based on a penalty argument by J. L. Lions and Faedo-Galerkin approximations.eninfo:eu-repo/semantics/closedAccessGlobal SolutionWeak SolutionsLaplacian InequalityStrong DissipationNoncylindrical DomainEXISTENCE OF GLOBAL WEAK SOLUTIONS FOR A p-LAPLACIAN INEQUALITY WITH STRONG DISSIPATION IN NONCYLINDRICAL DOMAINSEXISTENCE OF GLOBAL WEAK SOLUTIONS FOR A p-LAPLACIAN INEQUALITY WITH STRONG DISSIPATION IN NONCYLINDRICAL DOMAINSArticle20229113WOS:0008584592000012-s2.0-85128716837Q3Q3