TY - JOUR
T1 - Weakly differentiable functions on varifolds
AU - Menne, Ulrich
N1 - Publisher Copyright:
©.
PY - 2016
Y1 - 2016
N2 - The present paper is intended to provide the basis for the study of weakly differentiable functions on rectifiable varifolds with locally bounded first variation. The concept proposed here is defined by means of integration-by-parts identities for certain compositions with smooth functions. In this class, the idea of zero boundary values is realised using the relative perimeter of superlevel sets. Results include a variety of Sobolev Poincaré-type embeddings, embeddings into spaces of continuous and sometimes Hölder-continuous functions, and point-wise differentiability results both of approximate and integral type as well as coarea formulae. As a prerequisite for this study, decomposition properties of such varifolds and a relative isoperimetric inequality are established. Both involve a concept of distributional boundary of a set introduced for this purpose. As applications, the finiteness of the geodesic distance associated with varifolds with suitable summability of the mean curvature and a characterisation of curvature varifolds are obtained.
AB - The present paper is intended to provide the basis for the study of weakly differentiable functions on rectifiable varifolds with locally bounded first variation. The concept proposed here is defined by means of integration-by-parts identities for certain compositions with smooth functions. In this class, the idea of zero boundary values is realised using the relative perimeter of superlevel sets. Results include a variety of Sobolev Poincaré-type embeddings, embeddings into spaces of continuous and sometimes Hölder-continuous functions, and point-wise differentiability results both of approximate and integral type as well as coarea formulae. As a prerequisite for this study, decomposition properties of such varifolds and a relative isoperimetric inequality are established. Both involve a concept of distributional boundary of a set introduced for this purpose. As applications, the finiteness of the geodesic distance associated with varifolds with suitable summability of the mean curvature and a characterisation of curvature varifolds are obtained.
KW - (generalised) weakly differentiable function
KW - Approximate differentiability
KW - Coarea formula
KW - Curvature varifold
KW - Decomposition
KW - Distributional boundary
KW - Geodesic distance
KW - Rectifiable varifold
KW - Relative isoperimetric inequality
KW - Sobolev Poincaréinequality
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U2 - 10.1512/iumj.2016.65.5829
DO - 10.1512/iumj.2016.65.5829
M3 - Article
AN - SCOPUS:84978823965
SN - 0022-2518
VL - 65
SP - 977
EP - 988
JO - Indiana University Mathematics Journal
JF - Indiana University Mathematics Journal
IS - 3
ER -