Compact orbit spaces in Hilbert spaces and limits of edge-colouring models

Abstract

Let G be a group of orthogonal transformations of a real Hilbert space H. Let R and W be bounded G-stable subsets of H. Let \|.\|R be the seminorm on H defined by \|x\|R:=r∈ R| r,x| for x∈ H. We show that if W is weakly compact and the orbit space Rk/G is compact for each k∈, then the orbit space W/G is compact when W is equiped with the norm topology induced by \|.\|R. As a consequence we derive the existence of limits of edge-colouring models which answers a question posed by Lov\'asz. It forms the edge-colouring counterpart of the graph limits of Lov\'asz and Szegedy, which can be seen as limits of vertex-colouring models. In the terminology of de la Harpe and Jones, vertex- and edge-colouring models are called `spin models' and `vertex models' respectively.