Fractional balanced chromatic number of signed subcubic graphs
Abstract
A signed graph is a pair (G,σ), where G is a graph and σ: E(G)→ \-, +\, called signature, is an assignment of signs to the edges. Given a signed graph (G,σ) with no negative loops, a balanced (p,q)-coloring of (G,σ) is an assignment f of q colors to each vertex from a pool of p colors such that each color class induces a balanced subgraph, i.e., no negative cycles. Let (K4,-) be the signed graph on K4 with all edges being negative. In this work, we show that every signed (simple) subcubic graph admits a balanced (5,3)-coloring except for (K4,-) and signed graphs switching equivalent to it. For this particular signed graph the best balanced colorings are (2p,p)-colorings.
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