Extending linear growth functionals to functions of bounded fractional variation

Schönberger, Hidde

doi:10.1017/prm.2023.14

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Cited by 3 publications

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“…1.1]. In fact, the locality property (1.15) was inspired by an observation recently made in [13,Rem. 3.4].…”

mentioning

confidence: 98%

On sets with finite distributional fractional perimeter

Comi¹,

Stefani²

2023

Preprint

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We continue the study of the fine properties of sets having locally finite distributional fractional perimeter. We refine the characterization of their blow-ups and prove a Leibniz rule for the intersection of sets with locally finite distributional fractional perimeter with sets with finite fractional perimeter. As a byproduct, we provide a description of non-local boundaries associated with the distributional fractional perimeter.

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“…1.1]. In fact, the locality property (1.15) was inspired by an observation recently made in [13,Rem. 3.4].…”

mentioning

confidence: 98%

On sets with finite distributional fractional perimeter

Comi¹,

Stefani²

2023

Preprint

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show abstract

On Sets with Finite Distributional Fractional Perimeter

Comi,

Stefani

2024

Springer INdAM Series

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A variational theory for integral functionals involving finite-horizon fractional gradients

Cueto,

Kreisbeck,

Schönberger

2023

Fract Calc Appl Anal

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The center of interest in this work are variational problems with integral functionals depending on nonlocal gradients with finite horizon that correspond to truncated versions of the Riesz fractional gradient. We contribute several new aspects to both the existence theory of these problems and the study of their asymptotic behavior. Our overall proof strategy builds on finding suitable translation operators that allow to switch between the three types of gradients: classical, fractional, and nonlocal. These provide useful technical tools for transferring results from one setting to the other. Based on this approach, we show that quasiconvexity, which is the natural convexity notion in the classical calculus of variations, gives a necessary and sufficient condition for the weak lower semicontinuity of the nonlocal functionals as well. As a consequence of a general $$\varGamma $$ Γ -convergence statement, we obtain relaxation and homogenization results. The analysis of the limiting behavior for varying fractional parameters yields, in particular, a rigorous localization with a classical local limit model.

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Extending linear growth functionals to functions of bounded fractional variation

Cited by 3 publications

References 47 publications

On sets with finite distributional fractional perimeter

On sets with finite distributional fractional perimeter

On Sets with Finite Distributional Fractional Perimeter

A variational theory for integral functionals involving finite-horizon fractional gradients

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