Separating Fourier and Schur multipliers

Abstract

Let G be a locally compact unimodular group, let 1≤ p<∞,let φ∈ L∞(G) and assume that the Fourier multiplier Mφassociated with φ is bounded on the noncommutative Lp-space Lp(VN(G)).Then Mφ Lp(VN(G)) Lp(VN(G)) is separating (that is,\a*b=ab*=0\⇒\Mφ(a)* Mφ(b)=Mφ(a)Mφ(b)*=0\for any a,b∈ Lp(VN(G))) if and only if thereexists c∈ C and a continuouscharacter G C such that φ=c locally almost everywhere. This provides a characterization of isometricFourier multipliers on Lp(VN(G)), when p=2. Next, let be a σ-finite measure space, let φ∈ L∞(2)and assume that the Schur multiplier associated with φ is bounded on the Schatten space Sp(L2()). We prove that this multiplier is separating if and only if there exist a constant c∈ C and two unitaries α,β∈ L∞() such that φ(s,t) =c\, α(s)β(t) a.e. on 2. This provides acharacterization of isometric Schur multiplierson Sp(L2()), when p=2.