A combinatorial view on star moments of regular directed graphs and trees

Abstract

We investigate the method of moments for d-regular digraphs and the limiting d-regular directed tree Td as the number of vertices tends to infinity, in the same spirit as McKay (Linear Algebra Appl., 1981) for the undirected setting. In particular, we provide a combinatorial derivation of the formula for the star moments (from a root vertex o∈ Td) Md(w):=Σv0,v1…,vk-1,vk∈ Td\0=vk=o Aw1(v0,v1)Aw2(v1,v2) ·s Awk(vk-1,vk) with A the adjacency matrix of Td, where w:=w1·s wk is any word on the alphabet \1,*\ and A* is the adjoint matrix of A. Our analysis highlights a connection between the non-zero summands of Md(w) and the non-crossing partitions of \1,…,k\ which are in some sense compatible with w.