Tensor products of Steinberg algebras

Abstract

We prove that AR(G) R AR(H) AR(G × H), if G and H are Hausdorff ample groupoids. As part of the proof, we give a new universal property of Steinberg algebras. We then consider the isomorphism problem for tensor products of Leavitt algebras, and show that no diagonal-preserving isomorphism exists between L2,R L3,R and L2,R L2,R. Indeed, there are no unexpected diagonal-preserving isomorphisms between tensor products of finitely many Leavitt algebras. We give an easy proof that every *-isomorphism of Steinberg algebras over the integers preserves the diagonal, and it follows that L2,Z L3,Z L2,Z L2,Z (as *-rings).