Schur multipliers on B(Lp,Lq)

Abstract

Let (1, F1, μ1) and (2, F2, μ2) be two measure spaces and let 1 ≤ p,q ≤ +∞. We give a definition of Schur multipliers on B(Lp(1), Lq(2)) which extends the definition of classical Schur multipliers on B(p,q). Our main result is a characterization of Schur multipliers in the case 1≤ q ≤ p ≤ +∞. When 1 < q ≤ p < +∞, φ ∈ L∞(1 × 2) is a Schur multiplier on B(Lp(1), Lq(2)) if and only if there are a measure space (a probability space when p≠ q) (,μ), a∈ L∞(μ1, Lp(μ)) and b∈ L∞(μ2, Lq'(μ)) such that, for almost every (s,t) ∈ 1 × 2, φ(s,t)= a(s), b(t) . Here, L∞(μ1, Lr(μ)) denotes the Bochner space on 1 valued in Lr(μ). This result is new, even in the classical case. As a consequence, we give new inclusion relationships between the spaces of Schur multipliers on B(p,q).