Asympotic bounds for Bombieri's inequality on products of homogeneous polynomials
Abstract
Let P be a fixed homogeneous polynomial. We present a sharp condition on P guaranteeing the existence of asymptotically larger bounds in Bombieri's inequality, so for every homogeneous polynomial qm of degree m we have equation* P qm a≥ CP ml( P) /2 qm a, equation* where \| · \| a denotes the apolar norm. Explicit estimates for CP > 0 and l(P) > 0 are given.
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