An inequality for the norm of a polynomial factor
Abstract
Let p(z) be a monic polynomial of degree n, with complex coefficients, and let q(z) be its monic factor. We prove an asymptotically sharp inequality of the form \|q\|E Cn \|p\|E, where \|·\|E denotes the sup norm on a compact set E in the plane. The best constant CE in this inequality is found by potential theoretic methods. We also consider applications of the general result to the cases of a disk and a segment.
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