Quantum automorphism groups of connected locally finite graphs and quantizations of discrete groups

Abstract

We construct for every connected locally finite graph the quantum automorphism group QAut\ as a locally compact quantum group. When is vertex transitive, we associate to a new unitary tensor category C() and this is our main tool to construct the Haar functionals on QAut\ . When is the Cayley graph of a finitely generated group, this unitary tensor category is the representation category of a compact quantum group whose discrete dual can be viewed as a canonical quantization of the underlying discrete group. We introduce several equivalent definitions of quantum isomorphism of connected locally finite graphs , ' and prove that this implies monoidal equivalence of QAut\ and QAut\ '.