Functions of perturbed noncommuting self-adjoint operators
Abstract
We consider functions f(A,B) of noncommuting self-adjoint operators A and B that can be defined in terms of double operator integrals. We prove that if f belongs to the Besov class B,11(2), then we have the following Lipschitz type estimate in the trace norm: \|f(A1,B1)-f(A2,B2)\|_1(\|A1-A2\|_1+\|B1-B2\|_1). However, the condition f∈ B,11(2) does not imply the Lipschitz type estimate in the operator norm.
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