Logarithmic dimension bounds for the maximal function along a polynomial curve

Abstract

Let M denote the maximal function along the polynomial curve p(t)=(t,t2,...,td) in Rd: M(f)=supr>0 (1/2r) ∫|t|<r |f(x-p(t))| dt. We show that the L2-norm of this operator grows at most logarithmically with the parameter d: ||M||2 < c log d ||f||2, where c>0 is an absolute constant. The proof depends on the explicit construction of a "parabolic" semi-group of operators which is a mixture of stable semi-groups.