Nowhere-Zero Flow Polynomials
classification
🧮 math.CO
cs.DMmath.AC
keywords
flowsnowhere-zeroflowplanarrelationalgebraicappealingarticle
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In this article we introduce the flow polynomial of a digraph and use it to study nowhere-zero flows from a commutative algebraic perspective. Using Hilbert's Nullstellensatz, we establish a relation between nowhere-zero flows and dual flows. For planar graphs this gives a relation between nowhere-zero flows and flows of their planar duals. It also yields an appealing proof that every bridgeless triangulated graph has a nowhere-zero four-flow.
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