A variation on the Pólya-Segő principle in one dimension

Abstract

We prove a Pólya-Szegő principle for the Riesz (p,α)-variation, a scale of fractional smoothness interpolating between bounded p-variation and the Sobolev space W1,p. In contrast to the classical Pólya-Szegő inequality, our result also holds for certain nowhere differentiable functions possessing fractional smoothness, including Takagi-van der Waerden-type functions, and Riemann's ''nondifferentiable'' function.

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