A topological insight into the polar involution of convex sets
Abstract
Denote by K0n the family of all closed convex sets A⊂Rn containing the origin 0∈ Rn. For A∈K0n, its polar set is denoted by A. In this paper, we investigate the topological nature of the polar mapping A A on (K0n, dAW), where dAW denotes the Attouch-Wets metric. We prove that (K0n, dAW) is homeomorphic to the Hilbert cube Q=Πi=1∞[-1,1] and the polar mapping is topologically conjugate with the standard based-free involution σ:Q→ Q, defined by σ(x)=-x for all x∈ Q. We also prove that among the inclusion-reversing involutions on Kn0 (also called dualities), those and only those with a unique fixed point are topologically conjugate with the polar mapping, and they can be characterized as all the maps f:K0n K0n of the form f(A)=T(A), with T a positive definite linear isomorphism of Rn.
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