New types of convergence for unbounded star-shaped sets

Abstract

We introduce radial variants of the Wijsman and Attouch-Wets topologies for the family Srcd of star sets A ⊂eq Rd 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 radial distance functionals, which measure ``radial distances'' between points x ∈ Rd and sets A ∈ Srcd. These are natural radial analogues of the classical distance functionals. We prove that our radial Wijsman type topology τWr is not metrizable on Srcd, while our radial Attouch-Wets type topology τAWr is completely metrizable. A corresponding radial Attouch-Wets distance dAWr is introduced, and we prove that dAW(A,K) ≤ dAWr(A,K) for all closed A,K ∈ Srcd, where dAW denotes the Attouch-Wets distance. Among others, these results are applied to prove the continuity of the star duality on Srcd with respect to both τWr and τAWr, and to establish topological properties of the family of flowers associated with closed convex sets containing the origin.