New types of convergence for unbounded star-shaped sets

Abstract: We introduce radial variants of the Wijsman and Attouch-Wets topologies for the family $\mathcal{S}{rc}^d$ of star sets $A \subseteq \mathbb{R}^d$ that are radially closed.These topologies give rise to new types of convergence for star-shaped sets with respect to the origin, even when such sets are not closed or bounded. Our approach relies on a new family of functionals, called \textit{radial distance functionals}, which measure ``radial distances'' between points $x \in \mathbb{R}^d$ and sets $A \in \mathcal{S}{rc}^d$. These are natural radial analogues of the classical distance functionals. We prove that our radial Wijsman type topology $\tau_{W^r}$ is not metrizable on $\mathcal{S}{rc}^d$, while our radial Attouch-Wets type topology $\tau{AW^r}$ is completely metrizable. A corresponding radial Attouch-Wets distance $d_{AW^r}$ is introduced, and we prove that $d_{AW}(A,K) \leq d_{AW^r}(A,K)$ for all closed $A,K \in \mathcal{S}{rc}^d$, where $d{AW}$ denotes the Attouch-Wets distance. Among others, these results are applied to prove the continuity of the star duality on $\mathcal{S}{rc}^d$ with respect to both $\tau{W^r}$ and $\tau_{AW^r}$, and to establish topological properties of the family of flowers associated with closed convex sets containing the origin.