An analytic approach to estimating the solutions of B\'ezout's polynomial identity

Abstract

This paper contains sharp bounds on the coefficients of the polynomials R and S which solve the classical one variable B\'ezout identity A R + B S = 1, where A and B are polynomials with no common zeros. The bounds are expressed in terms of the separation of the zeros of A and B. Our proof involves contour integral representations of these coefficients. We also obtain an estimate on the norm of the inverse of the Sylvester matrix.

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