Generalizations of Goncalves' inequality

Abstract

If F is a polynomial with complex coefficients, leading term aN, and roots α1, ..., αN, then Goncalves' inequality states that \|F\|22 is bounded below by aN2 (Πn=1N \1, αn2\ + Πn=1N \1, αn2\). We establish generalizations of this inequality for other Lp norms, and derive additional lower bounds on the Lp norms of a polynomial in terms of its coefficients.

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