Simple purely infinite C*-algebras and n-filling actions
Abstract
Let n be a positive integer. We introduce a concept, which we call the n-filling property, for an action of a group on a separable unital C*-algebra A. If A=C() is a commutative unital C*-algebra and the action is induced by a group of homeomorphisms of then the n-filling property reduces to a weak version of hyperbolicity. The n-filling property is used to prove that certain crossed product C*-algebras are purely infinite and simple. A variety of group actions on boundaries of symmetric spaces and buildings have the n-filling property. An explicit example is the action of =SLn( Z) on the projective n-space.
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