Korevaar-Schoen $p$-energies and their $Γ$-limits on Cheeger spaces

Patricia Alonso Ruiz; Fabrice Baudoin

Korevaar-Schoen $p$-energies and their $Γ$-limits on Cheeger spaces

Patricia Alonso Ruiz, Fabrice Baudoin

Department of Mathematics

Research output: Working paper/Preprint › Preprint

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Abstract

This paper studies properties of $\Gamma$-limits of Korevaar-Schoen $p$-energies on a Cheeger space. When $p>1$, this kind of limit provides a natural $p$-energy form that can be used to define a $p$-Laplacian, and whose domain is the Newtonian Sobolev space $N^{1,p}$. When $p=1$, the limit can be interpreted as a total variation functional whose domain is the space of BV functions. When the underlying space is compact, the $\Gamma$-convergence of the $p$-energies is improved to Mosco convergence for every $p \ge 1$.

Original language	Undefined/Unknown
Publication status	Published - 28 Jan 2024

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2401.15699v1

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Cite this

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abstract = "This paper studies properties of $\Gamma$-limits of Korevaar-Schoen $p$-energies on a Cheeger space. When $p>1$, this kind of limit provides a natural $p$-energy form that can be used to define a $p$-Laplacian, and whose domain is the Newtonian Sobolev space $N^{1,p}$. When $p=1$, the limit can be interpreted as a total variation functional whose domain is the space of BV functions. When the underlying space is compact, the $\Gamma$-convergence of the $p$-energies is improved to Mosco convergence for every $p \ge 1$.",

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N2 - This paper studies properties of $\Gamma$-limits of Korevaar-Schoen $p$-energies on a Cheeger space. When $p>1$, this kind of limit provides a natural $p$-energy form that can be used to define a $p$-Laplacian, and whose domain is the Newtonian Sobolev space $N^{1,p}$. When $p=1$, the limit can be interpreted as a total variation functional whose domain is the space of BV functions. When the underlying space is compact, the $\Gamma$-convergence of the $p$-energies is improved to Mosco convergence for every $p \ge 1$.

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