A characterization of all graphs cospectral to the double star P2(1,n)

Abstract

We examine the adjacency spectrum of trees with diameter three, also referred to as double stars. Using P2(a,b) to denote a double star with a and b leaves at its respective endpoints, we discuss graphs which are cospectral to double stars for various parameters a and b. In particular, we give constructions for graphs cospectral to P2(1,2k) for integers k. Lastly, we show that the double star P2(1,n) is determined by its spectrum when n is odd. That is, if a graph G cospectral to P2(1,n) for odd n, then G is isomorphic to P2(1,n).