The maximum forcing numbers of quadriculated tori
Abstract
Klein and Randic (1985) proposed the concept of forcing number, which has an application in chemical resonance theory. Let G be a graph with a perfect matching M. The forcing number of M is the smallest cardinality of a subset of M that is contained only in one perfect matching M. The maximum forcing number of G is the maximum value of forcing numbers over all perfect matchings of G. Kleinerman (2006) obtained that the maximum forcing number of 2n× 2m quadriculated torus is nm. By improving Kleinerman's approach, we obtain the maximum forcing numbers of all 4-regular quadriculated graphs on torus except one class.
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