Positive isometric Fourier multipliers on non-commutative Lp-spaces
Abstract
For a locally compact group \(G\), let \(LG\) denote its left group von Neumann algebra and let \(Lp(LG)\), \(1 p ∞\), be the corresponding non-commutative \(Lp\)-space. Given \(φ ∈ L∞(G)\), we study the Fourier multiplier \(Mφ,p\) acting on \(Lp(LG)\). We prove that for any \(p ≠ 2\), the operator \(Mφ,p\) is a positive surjective isometry if and only if \(φ\) coincides locally almost everywhere with a continuous character of \(G\). This characterization extends results obtained recently (jointly with C.~Arhancet) in the unimodular setting.
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