Upper Bound for the Coefficients of Chromatic polynomials

Abstract

This paper describes an improvement in the upper bound for the magnitude of a coefficient of a term in the chromatic polynomial of a general graph. If ar is the coefficient of the qr term in the chromatic polynomial P(G,q), where q is the number of colors, then we find ar e v-r - e-g+2 v-r-g+2 + e-kg-g+2 v-r-g+2 - Σ n=1kg-gΣm=1g-1 e-g+1-n-m v-r-g - δg,3Σn=1kg+g+1*-g e-g-g+1-n v-r-g, where kg is the number of circuits of length g and g and g+1* are certain numbers defined in the text.

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