Noncommutative Ck functions and Fr\'echet derivatives of operator functions

Abstract

Fix a unital C*-algebra A, and write Asa for the set of self-adjoint elements of A. Also, if f:R is a continuous function, then write fA:AsaA for the operator function a f(a) defined via functional calculus. In this paper, we introduce and study a space NCk(R) of Ck functions f:R such that, no matter the choice of A, the operator function fA:AsaA is k-times continuously Fr\'echet differentiable. In other words, if f∈ NCk(R), then f "lifts" to a Ck map fA:AsaA, for any (possibly noncommutative) unital C*-algebra A. For this reason, we call NCk(R) the space of noncommutative Ck functions. Our proof that fA∈ Ck(Asa;A), which requires only knowledge of the Fr\'echet derivatives of polynomials and operator norm estimates for "multiple operator integrals" (MOIs), is more elementary than the standard approach; nevertheless, NCk(R) contains all functions for which comparable results are known. Specifically, we prove that NCk(R) contains the homogeneous Besov space B1k,∞(R) and the H\"older space Clock,(R). We highlight, however, that the results in this paper are the first of their type to be proven for arbitrary unital C*-algebras, and that the extension to such a general setting makes use of the author's recent resolution of certain "separability issues" with the definition of MOIs. Finally, we prove by exhibiting specific examples that Wk(R)loc⊂neq NCk(R)⊂neq Ck(R), where Wk(R)loc is the "localized" kth Wiener space.