The Leavitt path algebras of generalized Cayley graphs

Abstract

Let n be a positive integer. For each 0≤ j ≤ n-1 we let Cnj denote Cayley graph for the cyclic group Zn with respect to the subset \1, j\. For any such pair (n,j) we compute the size of the Grothendieck group of the Leavitt path algebra LK(Cnj); the analysis is related to a collection of integer sequences described by Haselgrove in the 1940's. When j=0,1, or 2, we are able to extract enough additional information about the structure of these Grothendieck groups so that we may apply a Kirchberg-Phillips-type result to explicitly realize the algebras LK(Cnj) as the Leavitt path algebras of graphs having at most three vertices. The analysis in the j=2 case leads us to some perhaps surprising and apparently nontrivial connections to the classical Fibonacci sequence.