Equitable Colorings of Vertex-Weighted Graphs

Abstract

We study a generalization of the classical Hajnal-Szemer\'edi theorem to vertex-weighted graphs. Given a graph with nonnegative vertex weights, a coloring is called α-approximately equitable up to one vertex (α-EQ1) if, for each color class, the total weight remaining after removing its maximum-weight vertex is at most α ≥ 1 times the weight of any other color class. For vertex-weighted graphs with maximum degree , we show that there exist instances for which no k-coloring is α-EQ1 for any k < 32 and α < 2. In light of this impossibility, we relax these parameters and establish the following results for any vertex-weighted graph G with maximum degree : (1) for any ∈ (0,1) and all k ≥ (c21) , there exists a (1 + )-EQ1 k-coloring of G, where c is a fixed constant; and (2) for all k + 1, there exists a 2-EQ1 k-coloring of G. Furthermore, such equitable colorings can be computed in polynomial time. En route to our results on equitability under vertex weights, we establish sufficient conditions for the existence of k-colorings that are equitable with respect to any given partition of the vertex set. Our coloring results correspond to fairness guarantees in a constrained fair division setting and lead to concentration inequalities for partly dependent random variables.