A Remark on Hypercontractive Semigroups and Operator Ideals

Abstract

In this note, we answer a question raised by Johnson and Schechtman JS, about the hypercontractive semigroup on \-1,1\. More generally, we prove the folllowing theorem. Let 1<p<2. Let (T(t))t>0 be a holomorphic semigroup on Lp (relative to a probability space). Assume the following mild form of hypercontractivity: for some large enough number s>0, T(s) is bounded from Lp to L2. Then for any t>0, T(t) is in the norm closure in B(Lp) (denoted by 2) of the subset (denoted by 2) formed by the operators mapping Lp to L2 (a fortiori these operators factor through a Hilbert space).