Epsilon-regularity for the solutions of a free boundary system

Francesco Paolo Maiale; Giorgio Tortone; Bozhidar Velichkov

doi:10.4171/rmi/1430

JournalsrmiVol. 39, No. 5pp. 1947–1972

Epsilon-regularity for the solutions of a free boundary system

Francesco Paolo Maiale
Scuola Normale Superiore, Pisa, Italy
Giorgio Tortone
Università di Pisa, Italy
Bozhidar Velichkov
Università di Pisa, Italy

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Abstract

This paper is dedicated to a free boundary system arising in the study of a class of shape optimization problems. The problem involves three variables: two functions $u$ and $v$ , and a domain $Ω$ ; with $u$ and $v$ being both positive in $Ω$ , vanishing simultaneously on $\partial Ω$ , and satisfying an overdetermined boundary value problem involving the product of their normal derivatives on $\partial Ω$ . Precisely, we consider solutions $u, v \in C (B_{1})$ of

- Δ u = f and - Δ v = g in Ω = {u > 0} = {v > 0},

\frac{\partial u}{\partial n} \frac{\partial v}{\partial n} = Q on \partial Ω \cap B_{1} .

Our main result is an epsilon-regularity theorem for viscosity solutions of this free boundary system. We prove a partial Harnack inequality near flat points for the couple of auxiliary functions $uv$ and $\frac{1}{2} (u + v)$ . Then, we use the gained space near the free boundary to transfer the improved flatness to the original solutions. Finally, using the partial Harnack inequality, we obtain an improvement-of-flatness result, which allows to conclude that flatness implies $C^{1, α}$ regularity.

Cite this article

Francesco Paolo Maiale, Giorgio Tortone, Bozhidar Velichkov, Epsilon-regularity for the solutions of a free boundary system. Rev. Mat. Iberoam. 39 (2023), no. 5, pp. 1947–1972

DOI 10.4171/RMI/1430