Distinctive power and comparability of Harary polynomial

Abstract

Let P be a graph property. A P-coloring with at most k colors is a coloring of the vertices of a simple graph G such that each color class induces a graph in P. Harary polynomials are generalizations of the chromatic polynomial for simple graphs based on conditional colorings. We denote by P(G; k) the number of P-colorings of G with at most k colors. P(G; k) is a polynomial in [k]. A first paper studying Harary polynomials systematically was published in 2021 by O.Herscovici, J.A. Makowsky and V. Rakita. It studies under which conditions on P is P(G; k) definable in Monadic Second Order Logic and under which conditions is P(G; k) a chromatic invariant. Let P, Q be two graph properties. Two graphs G, H are P-mates if P(G; k) = P(H; k). Q is at least as distinctive as P, P ≤ Q, if for all graphs G, H we have that Q(G; k) = Q(H; k) implies P(G; k) = P(H; k). In this paper we study under which conditions on P are there any (many) P-mates and under which conditions on P, Q is Q is at least as distinctive as P.

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