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Main Authors: Du, Lili, Tang, Xu, Wang, Cong
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2409.08478
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author Du, Lili
Tang, Xu
Wang, Cong
author_facet Du, Lili
Tang, Xu
Wang, Cong
contents In this paper, we explore cooperative and competitive coupled obstacle systems, which, up to now, are new type obstacle systems and formed by coupling two equations belonging to classical obstacle problem. On one hand, applying the constrained minimizer in variational methods we establish the existence of solutions for the systems. Moreover, the optimal regularity of solutions is obtained, which is the cornerstone for further research on so-called free boundary. Furthermore, as coefficient $λ\to0$, there exists a sequence of solutions converging to solutions of the single classical obstacle equation. On the other hand, motivated by the heartstirring ideas of single classical obstacle problem, based on the corresponding blowup methods, Weiss type monotonicity formula and Monneau type monotonicity formula of systems to be studied, we investigate the regularity of free boundary, and on the regular and singular points in particular, as it should be, which is more challenging but exceedingly meaningful in solving free boundary problems.
format Preprint
id arxiv_https___arxiv_org_abs_2409_08478
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On a class of coupled obstacle systems
Du, Lili
Tang, Xu
Wang, Cong
Analysis of PDEs
In this paper, we explore cooperative and competitive coupled obstacle systems, which, up to now, are new type obstacle systems and formed by coupling two equations belonging to classical obstacle problem. On one hand, applying the constrained minimizer in variational methods we establish the existence of solutions for the systems. Moreover, the optimal regularity of solutions is obtained, which is the cornerstone for further research on so-called free boundary. Furthermore, as coefficient $λ\to0$, there exists a sequence of solutions converging to solutions of the single classical obstacle equation. On the other hand, motivated by the heartstirring ideas of single classical obstacle problem, based on the corresponding blowup methods, Weiss type monotonicity formula and Monneau type monotonicity formula of systems to be studied, we investigate the regularity of free boundary, and on the regular and singular points in particular, as it should be, which is more challenging but exceedingly meaningful in solving free boundary problems.
title On a class of coupled obstacle systems
topic Analysis of PDEs
url https://arxiv.org/abs/2409.08478