Point evaluation for polynomials on the circle
Abstract
We study the constant Cd,p defined as the smallest constant C such that \|P\|∞p ≤ C\|P\|pp holds for every polynomial P of degree d, where we consider the Lp norm on the unit circle. We conjecture that Cd,p ≤ dp/2+1 for all p ≥ 2 and all degrees d. We show that the conjecture holds for all p ≥ 2 when d ≤ 4 and for all d when p ≥ 6.8.
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