Higher order Sp-differentiability: The unitary case

Abstract

Consider the set of unitary operators on a complex separable Hilbert space , denoted as U(). Consider 1<p<∞. We establish that a function f defined on the unit circle is n times continuously Fr\'echet p-differentiable at every point in U() if and only if f∈ Cn(). Take a function U :→U() such that the function t∈ U(t)-U(0) takes values in p and is n times continuously p-differentiable on . Consequently, for f∈ Cn(), we prove that f is n times continuously G\ateaux Sp-differentiable at U(t). We provide explicit expressions for both types of derivatives of f in terms of multiple operator integrals. In the domain of unitary operators, these results closely follow the nth order successes for self-adjoint operators achieved by the second author, Le Merdy, Skripka, and Sukochev. Furthermore, as for application, we derive a formula and p-estimates for operator Taylor remainders for a broader class of functions. Our results extend those of Peller, Potapov, Skripka, Sukochev and Tomskova.

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