Circular flows in mono-directed signed graphs

Abstract

In this paper the concept of circular r-flows in a mono-directed signed graph (G, σ) is introduced. That is a pair (D, f), where D is an orientation on G and f: E(G) (-r,r) satisfies that |f(e)|∈ [1, r-1] for each positive edge e and |f(e)|∈ [0, r2-1] [r2+1, r) for each negative edge e, and the total in-flow equals the total out-flow at each vertex. The circular flow index of a signed graph (G, σ) with no positive bridge, denoted c(G,σ), is the minimum r such that (G, σ) admits a circular r-flow. This is the dual notion of circular colorings and circular chromatic numbers of signed graphs recently introduced in [Circular chromatic number of signed graphs. R. Naserasr, Z. Wang, and X. Zhu. Electronic Journal of Combinatorics, 28(2)(2021), \#P2.44], and is distinct from the concept of circular flows in bi-directed graphs associated to signed graphs studied in the literature. We give several equivalent definitions, study basic properties of circular flows in mono-directed signed graphs, explore relations with flows in graphs, and focus on upper bounds on c(G,σ) in terms of the edge-connectivity of G. Meanwhile, we note that for the particular values of r_k=2kk-1, and when restricted to two natural subclasses of signed graphs, the existence of a circular r_k -flow is strongly connected with the existence of a modulo k-orientation, and in case of planar graphs, based on duality, with the homomorphisms to C-k.

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