C*-algebras associated with algebraic correspondences on the Riemann sphere

Abstract

Let p(z,w) be a polynomial in two variables. We call the solution of the algebraic equation p(z,w) = 0 the algebraic correspondence. We regard it as the graph of the multivalued function z w defined implicitly by p(z,w) = 0. Algebraic correspondences on the Riemann sphere C give a generalization of dynamical systems of Klein groups and rational functions. We introduce C*-algebras associated with algebraic correspondences on the Riemann sphere. We show that if an algebraic correspondence is free and expansive on a closed p-invariant subset J of C, then the associated C*-algebra Op(J) is simple and purely infinite.