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Chip-firing games on Eulerian digraphs and NP-hardness of computing the rank of a divisor on a graph (1407.6958v3)

Published 25 Jul 2014 in cs.CC and math.CO

Abstract: Baker and Norine introduced a graph-theoretic analogue of the Riemann-Roch theory. A central notion in this theory is the rank of a divisor. In this paper we prove that computing the rank of a divisor on a graph is NP-hard. The determination of the rank of a divisor can be translated to a question about a chip-firing game on the same underlying graph. We prove the NP-hardness of this question by relating chip-firing on directed and undirected graphs.

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