Lp-norms and Mahler's measure of polynomials on the n-dimensional torus

Abstract

We prove Nikol'skii type inequalities which for polynomials on the n-dimensional torus Tn relate the Lp-with the Lq-norm (with respect to the normalized Lebesgue measure and 0 <p <q < ∞). Among other things we show that C=q/p is the best constant such that \|P\|Lq≤ Cdeg(P) \|P\|Lp for all homogeneous polynomials P on Tn. We also prove an exact inequality between the Lp-norm of a polynomial P on Tn and its Mahler measure M(P), which is the geometric mean of |P| with respect to the normalized Lebesgue measure on Tn. Using extrapolation we transfer this estimate into a Khintchine-Kahane type inequality, which, for polynomials on Tn, relates a certain exponential Orlicz norm and Mahler's measure. Applications are given, including some interpolation estimates.