| Popis: |
In this paper we consider the functional \begin{equation*} E_{p,\la}(\Omega):=\int_\Omega \dist^p(x,\pd \Omega )\d x+\la \frac{\H^1(\pd \Omega)}{\H^2(\Omega)}. \end{equation*} Here $p\geq 1$, $\la>0$ are given parameters, the unknown $\Omega$ varies among compact, convex, Hausdorff two-dimensional sets of $\R^2$, $\pd \Omega$ denotes the boundary of $\Omega$, and $\dist(x,\pd \Omega):=\inf_{y\in\pd \Omega}|x-y|$. The integral term $\int_\Omega \dist^p(x,\pd \Omega )\d x$ quantifies the "easiness" for points in $\Omega$ to reach the boundary, while $\frac{\H^1(\pd \Omega)}{\H^2(\Omega)}$ is the perimeter-to-area ratio. The main aim is to prove existence and $C^{1,1}$-regularity of minimizers of $\E$. |
