Strong parity edge-colorings of graphs

Abstract

An edge-coloring of a graph G assigns a color to each edge of G. An edge-coloring is a parity edge-coloring if for each path P in G, it uses some color on an odd number of edges in P. It is a strong parity edge-coloring if for every open walk W in G, it uses some color an odd number of times along W. The minimum numbers of colors in parity and strong parity edge-colorings of G are denoted p(G) and p(G), respectively. We characterize strong parity edge-colorings and use this characterization to prove lower bounds on p(G) and answer several questions of Bunde, Milans, West, and Wu. The applications are as follows. (1) We prove the conjecture that p(Ks,t)=s t, where s t is the Hopf-Stiefel function. (2) We show that p(G) for a connected n-vertex graph G equals the known lower bound 2 n if and only if G is a subgraph of the hypercube Q 2 n . (3) We asymptotically compute p(G) when G is the distance-power of a path, proving p(Pn) 2 n . (4) We disprove the conjecture that p(G)=p(G) when G is bipartite by constructing bipartite graphs G such that p(G)/p(G) is arbitrarily large; in particular, with p(G)1-o(1)3 k k and p(G)2k+k1/3.

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