Higher regularity of solutions to elliptic equations on low-dimensional structures

Abstract

This paper aims to establish counterparts of fundamental regularity statements for solutions to elliptic equations in the setting of low-dimensional structures such as, for instance, glued manifolds or CW-complexes. The main result proves additional Sobolev-type regularity of weak solutions to elliptic problems defined on the low-dimensional structure. Due to the non-standard geometry of a domain, we propose a new approach based on combining suitable extensions of functions supported on the thin structure with uniform bounds for difference quotients. We also derive several important conclusions from that result, namely global continuity of weak solutions and we address the correspondence between the low-dimensional weak problems and the second-order operators widely applied in the framework developed for applications in variational problems.

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