Rigidity Conjectures

Abstract

We prove several rigidity results for corona C*-algebras and Cech-Stone remainders under the assumption of Forcing Axioms. In particular, we prove that a strong version of Todorcevi\'c's and Martin's Axiom at level 1 imply: (i) that if X and Y are locally compact second countable topological spaces, then all homeomorphisms between β X X and β Y Y are induced by homeomorphisms between cocompact subspaces of X and Y; (ii) that all automorphisms of the corona algebra of a separable C*-algebra are trivial in a topological sense; (iii) that if A is a unital separable infinite-dimensional C*-algebra, the corona algebra of A K(H) does not embed into the Calkin algebra. All these results do not hold under the Continuum Hypothesis.