On Matsaev's conjecture for contractions on noncommutative Lp-spaces

Abstract

We exhibit large classes of contractions on noncommutative Lp-spaces which satisfy the noncommutative analogue of Matsaev's conjecture, introduced by Peller, in 1985. In particular, we prove that every Schur multiplier on a Schatten space Sp induced by a contractive Schur multiplier on B(2) associated with a real matrix satisfy this conjecture. Moreover, we deal with analogue questions for C0-semigroups. Finally, we disprove a conjecture of Peller concerning norms on the space of complex polynomials arising from Matsaev's conjecture and Peller's problem. Indeed, if S denotes the shift on p and σ the shift on the Schatten space Sp, the norms P(S)p p and P(σ) SpSp(Sp) Sp(Sp) can be different for a complex polynomial P.