Fuglede theorem for symmetric spaces of τ-measurable operators

Abstract

We extend the classical Fuglede commutativity theorem to the full scale of symmetrically normed operator ideals. Our main result provides a complete characterization: a symmetric ideal or symmetric operator space of τ-measurable operators satisfies the Fuglede theorem if and only if its commutative core has non-trivial Boyd indices, or equivalently, if it is an interpolation space in the scale of Lp-spaces for 1<p<∞. This criterion subsumes all previously known cases, including Lorentz and Schatten classes.

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