# Jump detection in Besov spaces via a new BBM formula. Applications to   Aviles-Giga type functionals

**Authors:** Arkady Poliakovsky

arXiv: 1703.04208 · 2017-12-06

## TL;DR

This paper investigates jump detection in Besov spaces using a new BBM formula, revealing that certain functionals are sensitive only to jumps in BV functions and identifying the relevant function space as a specific Besov space, with applications to Aviles-Giga problems.

## Contribution

It introduces a novel BBM-type formula replacing the denominator with |x-y|, characterizes the space BV^q as a Besov space, and applies these results to singular perturbation problems.

## Key findings

- Functionals with |x-y| denominator detect jumps in BV functions.
- BV^q space is identified as B^{1/q}_{q,∞}.
- Applications to Aviles-Giga type singular perturbations.

## Abstract

Motivated by the formula, due to Bourgain, Brezis and Mironescu, \begin{equation*}   \lim_{\varepsilon\to 0^+} \int_\Omega\int_\Omega \frac{|u(x)-u(y)|^q}{|x-y|^q}\,\rho_\varepsilon(x-y)\,dx\,dy=K_{q,N}\|\nabla u\|_{L^{q}}^q\,, \end{equation*} that characterizes the functions in $L^q$ that belong to $W^{1,q}$ (for $q>1$) and $BV$ (for $q=1$), respectively, we study what happens when one replaces the denominator in the expression above by $|x-y|$. It turns out that, for $q>1$ the corresponding functionals "see" only the jumps of the $BV$ function. We further identify the function space relevant to the study of these functionals, the space $BV^q$, as the Besov space $B^{1/q}_{q,\infty}$. We show, among other things, that $BV^q(\Omega)$ contains both the spaces $BV(\Omega)\cap L^\infty(\Omega)$ and $W^{1/q,q}(\Omega)$. We also present applications to the study of singular perturbation problems of Aviles-Giga type.

## Full text

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## References

22 references — full list in the complete paper: https://tomesphere.com/paper/1703.04208/full.md

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Source: https://tomesphere.com/paper/1703.04208