The ideal structure of algebraic partial crossed products

Abstract

Given a partial action of a discrete group G on a Hausdorff, locally compact, totally disconnected topological space X, we consider the correponding partial action of G on the algebra Lc(X) consisting of all locally constant, compactly supported functions on X, taking values in a given field K. We then study the ideal structure of the algebraic partial crossed product Lc(X) G. After developping a theory of induced ideals, we show that every ideal in Lc(X) G may be obtained as the intersection of ideals induced from isotropy groups, thus proving an algebraic version of the Effros-Hahn conjecture.