Images of nowhere differentiable Lipschitz maps of [0,1] into L1[0,1]
Abstract
The main result: for every sequence \ωm\m=1∞ of positive numbers (ωm>0) there exists an isometric embedding F:[0,1] L1[0,1] which is nowhere differentiable, but for each t∈ [0,1] the image Ft is infinitely differentiable on [0,1] with bounds x∈[0,1]|Ft(m)(x)|ωm and has an analytic extension to the complex plane which is an entire function.
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