Weighted and multivariate Johnson--Schechtman inequalities with application to interpolation theory

Abstract

We prove a weighted version of a classical inequality of Johnson and Schechtman from which we derive a decomposition theorem for p-th moments (0<p≤ 1) of nonnegative generalized U-statistics with constant not dependent on p. In particular, for 1≤ p≤ 2, the norm in the subspace Up≤ m(∞) of Lp(∞) spanned by functions dependent on at most m variables is equivalent to the norm in a suitable interpolation sum of Lp(L2) spaces. As a consequence, we obtain some interpolation properties of U1m(∞,p) that are known to imply cotype 2 of L1/U≤ m1(∞).