English

Multiple operator integrals in perturbation theory

Functional Analysis 2015-09-10 v1

Abstract

We start with the Birman--Solomyak approach to define double operator integrals and consider applications in estimating operator differences f(A)f(B)f(A)-f(B) for self-adjoint operators AA and BB. We present the Birman--Solomyak approach to the Lifshits--Krein trace formula that is based on double operator integrals. We study the class of operator Lipschitz functions, operator differentiable functions, operator H\"older functions, obtain Schatten--von Neumann estimates for operator differences. Finally, we consider in Chapter 1 estimates of functions of normal operators and functions of dd-tuples of commuting self-adjoint operators. In Chapter 2 we define multiple operator integrals with integrands in the integral projective tensor product of LL^\infty spaces. We consider applications of such multiple operator integrals to the problem of the existence of higher operator derivatives and to the problem of estimating higher operator differences. We also consider connections with trace formulae for functions of operators under perturbations of class Sm\boldsymbol{S}_m, m2m\ge2. In the last chapter we define Haagerup-like tensor products of the first kind and of the second kind and we use them to study functions of noncommuting self-adjoint operators under perturbation. We show that for functions ff in the Besov class B,11(R2)B_{\infty,1}^1({\Bbb R}^2) and for p[1,2]p\in[1,2] we have a Lipschitz type estimate in the Schatten--von Neumann norm Sp\boldsymbol{S}_p for functions of pairs of noncommuting self-adjoint operators, but there is no such a Lipschitz type estimate in the norm of Sp\boldsymbol{S}_p with p>2p>2 as well as in the operator norm. We also use triple operator integrals to estimate the trace norms of commutators of functions of almost commuting self-adjoint operators and extend the Helton--Howe trace formula for arbitrary functions in the Besov space B,11(R2)B_{\infty,1}^1({\Bbb R}^2).

Keywords

Cite

@article{arxiv.1509.02803,
  title  = {Multiple operator integrals in perturbation theory},
  author = {Vladimir Peller},
  journal= {arXiv preprint arXiv:1509.02803},
  year   = {2015}
}

Comments

67 pages. arXiv admin note: substantial text overlap with arXiv:1505.07173

R2 v1 2026-06-22T10:52:53.522Z