Any law of group metric invariant is an inf-convolution

Abstract

In this article, we bring a new light on the concept of the inf-convolution operation and provides additional informations to the work started in Ba1 and Ba2. It is shown that any internal law of group metric invariant (even quasigroup) can be considered as an inf-convolution. Consequently, the operation of the inf-convolution of functions on a group metric invariant is in reality an extension of the internal law of X to spaces of functions on X. We give an example of monoid (S(X),) for the inf-convolution structure, (which is dense in the set of all 1-Lipschitz bounded from bellow functions) for which, the map : (S(X),) → (X,.) is a (single valued) monoid morphism. It is also proved that, given a group complete metric invariant (X,d), the complete metric space (K(X),d∞) of all Katetov maps from X to equiped with the inf-convolution has a natural monoid structure which provides the following fact: the group of all isometric automorphisms AutIso(K(X)) of the monoid K(X), is isomorphic to the group of all isometric automorphisms AutIso(X) of the group X. On the other hand, we prove that the subset KC(X) of K(X) of convex functions on a Banach space X, can be endowed with a convex cone structure in which X embeds isometrically as Banach space.