Non- (quantum) differentiable $C^1$-functions in the spaces with trivial Boyd indices

Denis Potapov; Fyodor Sukochev

Non- (quantum) differentiable $C^1$-functions in the spaces with trivial Boyd indices

Functional Analysis 2008-08-22 v1

Authors: Denis Potapov , Fyodor Sukochev

Abstract

If E is a separable symmetric sequence space with trivial Boyd indices and $\cC^E$ is the corresponding ideal of compact operators, then there exists a $C^1$ -function $f_E$ , a self-adjoint element $W\in \cC^E$ and a densely defined closed symmetric derivation $\delta$ on $\cC^E$ such that $W \in Dom \delta$ , but $f_E(W) \notin Dom \delta$ .

Non- (quantum) differentiable $C^1$-functions in the spaces with trivial Boyd indices

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