Higher derivatives of operator functions in ideals of von Neumann algebras

Abstract

Let M be a von Neumann algebra and a be a self-adjoint operator affiliated with M. We define the notion of an "integral symmetrically normed ideal" of M and introduce a space OC[k](R) ⊂eq Ck(R) of functions R C such that the following result holds: for any integral symmetrically normed ideal I of M and any f ∈ OC[k](R), the operator function Isa b f(a+b)-f(a) ∈ I is k-times continuously Fr\'echet differentiable, and the formula for its derivatives may be written in terms of multiple operator integrals. Moreover, we prove that if f ∈ B11,∞(R) B1k,∞(R) and f' is bounded, then f ∈ OC[k](R). Finally, we prove that all of the following ideals are integral symmetrically normed: M itself, separable symmetrically normed ideals, Schatten p-ideals, the ideal of compact operators, and -- when M is semifinite -- ideals induced by fully symmetric spaces of measurable operators.