A Projection Characterization and Symmetry Bootstrap for Elements of a von Neumann Algebra that are Nearby Commuting Elements

Abstract

We define a symmetry map on a unital C-algebra A to be an R-linear map on A that generalizes transformations on matrices like: transpose, adjoint, complex-conjugation, conjugation by a unitary matrix, and their compositions. We include an overview of such symmetry maps on unital C-algebras. We say that A∈ A is -symmetric if (A)=A, A is -antisymmetric if (A)=-A, and A has a ζ=eiθ -phase symmetry if (A)=ζ A. Our main result is a new projection characterization of two operators U (unitary), B that have nearby commuting operators U' (unitary), B'. This can be used to ``bootstrap'' symmetry from operators U, B that are nearby some commuting operators U', B' to prove the existence of nearby commuting operators U'', B'' which satisfy the same symmetries/antisymmetries/phase symmetries as U, B, provided that the symmetry maps and symmetries/antisymmetries/phase symmetries satisfy some mild conditions. We also prove a version of this for X=U self-adjoint instead of unitary. As a consequence of the prior literature and the results of this paper, we prove Lin's theorem with symmetries: If a -symmetric matrix A is almost normal (\|[A, A]\| is small), then it is nearby a -symmetric normal matrix A'. We also extend this further to include rotational and dihedral symmetries. We also obtain bootstrap symmetry results for two and three almost commuting self-adjoint operators. As a corollary, we resolve a conjecture of arXiv:1502.03498 for two almost commuting self-adjoint matrices in the Atland-Zirnbauer symmetry classes related to topological insulators.

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