Weighted Lp Markov factors with doubling weights on the ball

Abstract

Let Lp,w,\ 1 p<∞, denote the weighted Lp space of functions on the unit ball Bd with a doubling weight w on Bd. The Markov factor for Lp,w on a polynomial P is defined by \|\, |∇ P|\,\|p,w\|P\|p,w, where ∇ P is the gradient of P. We investigate the worst case Markov factors for Lp,w\ (1 p<∞) and obtain that the degree of these factors are at most 2. In particular, for the Jacobi weight wμ(x)=(1-|x|2)μ-1/2, \ μ0, the exponent 2 is sharp. We also study the average case Markov factor for L2,w on random polynomials with independent N(0, σ2) coefficients and obtain that the upper bound of the average (expected) Markov factor is order degree to the 3/2, as compared to the degree squared worst case upper bound.