λ-Chromatic Polynomials and Polytope Geometry

Abstract

In this paper, we investigate the notion of the λ-chromatic polynomial of a graph, which enumerates the number of distinct L(2,1)-colorings using colors from a prescribed finite set. We prove that the λ-chromatic polynomial of a graph with n vertices is a monic polynomial of degree n and provide a combinatorial interpretation via lattice point enumeration within the framework of inside-out polytopes. Moreover, we compute the λ-chromatic polynomial of complete graphs Kn using lattice path enumeration, and we develop a block-gap technique to derive the λ-chromatic polynomials for complete bipartite and multipartite graphs. Our approach unifies geometric, combinatorial, and algebraic methods to provide a systematic treatment of λ-colorings across various families of graphs.