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Autore principale: Chou, Hsin-Chuang
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2510.05639
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author Chou, Hsin-Chuang
author_facet Chou, Hsin-Chuang
contents The series of papers is devoted to the study of convergence for pairs of surfaces and smooth functions thereon. We model such pairs with varifolds and multiple-valued functions to capture their limits. In the present paper, we study Young functions, a measure-theoretic approach to multiple-valued functions, and the graph measures associated with pairs of measures (in particular, varifolds) and Young functions. This setting allows us to model the convergence of pairs of surfaces and functions thereon via the weak convergence of their associated graph measures, and a compactness theorem follows immediately. As a prerequisite for the concepts of differentiability for Young functions in the upcoming papers, we introduce and investigate several test function spaces.
format Preprint
id arxiv_https___arxiv_org_abs_2510_05639
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Young functions on varifolds. Part I. Functional analytic foundations
Chou, Hsin-Chuang
Functional Analysis
Analysis of PDEs
28A35 (Primary) 60B10, 46A13 (Secondary)
The series of papers is devoted to the study of convergence for pairs of surfaces and smooth functions thereon. We model such pairs with varifolds and multiple-valued functions to capture their limits. In the present paper, we study Young functions, a measure-theoretic approach to multiple-valued functions, and the graph measures associated with pairs of measures (in particular, varifolds) and Young functions. This setting allows us to model the convergence of pairs of surfaces and functions thereon via the weak convergence of their associated graph measures, and a compactness theorem follows immediately. As a prerequisite for the concepts of differentiability for Young functions in the upcoming papers, we introduce and investigate several test function spaces.
title Young functions on varifolds. Part I. Functional analytic foundations
topic Functional Analysis
Analysis of PDEs
28A35 (Primary) 60B10, 46A13 (Secondary)
url https://arxiv.org/abs/2510.05639