Abstract
We initiate the study of the internal structure of C*-algebras associated to a left cancellative semigroup in which any two principal right ideals are either disjoint or intersect in another principal right ideal; these are variously called right LCM semigroups or semigroups that satisfy Clifford’s condition. Our main findings are results about uniqueness of the full semigroup C∗-algebra. We build our analysis upon a rich interaction between the group of units of the semigroup and the family of constructible right ideals. As an application we identify algebraic conditions on S under which C∗(S) is purely infinite and simple.
First published in Transactions of the American Mathematical Society. © the American Mathematical Society.