On converse invariant trees of diameter four

Abstract

Let D be an oriented graph, and let fT(D) denote the number of copies of D in a tournament T. We say that D is converse invariant if fT(D)=fT( D) for every tournament T, where D is obtained from D by reversing all arcs. Ai, Gutin, Lei, Yeo, and Zhou introduced a digraph polynomial for studying this property and conjectured that an orientation of a tree of maximum degree at least 3 is converse invariant if and only if it is self-converse or can be obtained recursively by bridge-mirroring from an orientation of a path. We disprove this conjecture. More precisely, we characterize converse-invariant orientations of trees of diameter four and exhibit non-self-converse examples that do not arise from the recursive bridge-mirroring construction. To prove the classification, we introduce a multilinear polynomial PD encoding the difference fT(D)-fT( D) over all tournaments T, and we give a coefficient formula for PD as a signed sum over copies of subgraphs of the underlying graph of D. This polynomial method yields parity obstructions, gives new proofs that oriented paths and cycles are converse invariant, and provides the main tool for the diameter-four classification.