Boundary value problems on non-Lipschitz uniform domains: Stability, compactness and the existence of optimal shapes

TL;DR

This paper investigates boundary value problems on complex non-Lipschitz domains, establishing stability, convergence, and compactness results, and demonstrating the existence of optimal shapes within these classes.

Contribution

It introduces generalized boundary problems on fractal-like domains and proves convergence and stability results, extending previous work to non-Lipschitz settings.

Findings

Proved Poincaré inequalities with trace terms for uniform domains.

Established Mosco convergence of energy functionals.

Demonstrated existence of optimal shapes in complex domain classes.

Abstract

We study boundary value problems for bounded uniform domains in $\mathbb{R}^n$, $n\geq 2$, with non-Lipschitz (and possibly fractal) boundaries. We prove Poincar\'e inequalities with trace terms and uniform constants for uniform $(\varepsilon,\infty)$-domains within bounded common confinements. We then introduce generalized Dirichlet, Robin and Neumann problems for Poisson type equations and prove the Mosco convergence of the associated energy functionals along sequences of suitably converging domains. This implies a stability result for weak solutions, and this also implies the norm convergence of the associated resolvents and the convergence of the corresponding eigenvalues and eigenfunctions. Based on our earlier work, we prove compactness results for parametrized classes of admissible domains, energy functionals and weak solutions. Using these results, we can verify the existence of optimal shapes in these classes.