The average distance problem with an Euler elastica penalization (2201.10097v1)

Abstract: We consider the minimization of an average distance functional defined on a two-dimensional domain $\Omega$ with an Euler elastica penalization associated with $\pd \Omega$, the boundary of $\Omega$. The average distance is given by \begin{equation*} \int_{\Omega} \dist^p(x,\pd \Omega )\d x \end{equation*} where $p\geq 1$ is a given parameter, and $\dist(x,\pd \Omega)$ is the Hausdorff distance between ${x}$ and $\pd \Omega$. The penalty term is a multiple of the Euler elastica (i.e., the Helfrich bending energy or the WiLLMore energy) of the boundary curve ${\pd \Omega}$, which is proportional to the integrated squared curvature defined on $\pd \Omega$, as given by \begin{equation*} \la \int_{\pd \Omega} \kappa_{\pd \Omega}^2\d\H_{\llcorner \pd \Omega}^1, \end{equation*} where $\kappa_{\pd \Omega}$ denotes the (signed) curvature of $\pd \Omega$ and $\la>0$ denotes a penalty constant. The domain $\Omega$ is allowed to vary among compact, convex sets of $\mathbb{R}^2$ with Hausdorff dimension equal to $2$\tcr{.} Under no a priori assumptions on the regularity of the boundary $\pd \Omega$, we prove the existence of minimizers of $E_{p,\la}$. Moreover, we establish the $C^{1,1}$-regularity of its minimizers. An original construction of a suitable family of competitors plays a decisive role in proving the regularity.