Exel-Pardo algebras with a twist

Abstract

Katsura associated a C*-algebra C*A,B to integral matrices A 0 and B of the same size, gave sufficient conditions on (A,B) making it simple purely infinite (SPI), and proved that any separable C*-algebra KK-isomorphic to a cone of an element ∈ KK(C(S1)n,C(S1)n) in Kasparov's KK is KK-isomorphic to an SPI C*A,B. Here we introduce, for the data of a commutative ring , matrices A,B as above and C of the same size with coefficients in the group U() of invertible elements, an -algebra OA,BC, the twisted Katsura algebra of the triple (A,B,C), show it is SPI whenever ⊃Q is a field and (A,B) satisfy Katsura conditions, and that any -algebra which is a cone of a map ∈ kk([t,t-1]n,[t,t-1]n) in the bivariant algebraic K-theory category kk is kk-isomorphic to an SPI OA,BC. Twisted Katsura -algebras are twisted Exel-Pardo algebras L(G,E,φc) associated to a group G acting on a graph E, and 1-cocycles φ:G× E1 G and c:G× E1 U(). We describe L(G,E,φc) by generators and relations, as a quotient of a twisted semigroup algebra, as a twisted Steinberg algebra, as a corner skew Laurent polynomial algebra, and as a universal localization of a tensor algebra. We use each of these guises of L(G,E,φc) to study its K-theoretic, regularity and simplicity properties. For example we show that if ⊃ Q is a field, G and E are countable and E is regular, then L(G,E,φc) is simple whenever the Exel-Pardo C*-algebra C*(G,E,φ) is, and is SPI if in addition the Leavitt path algebra L(E) is SPI.