Open AccessRegularity theory for the Möbius energy
Author(s) -
Philipp Reiter
Publication year - 2010
Publication title -
communications on pure andamp applied analysis
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.077
H-Index - 42
eISSN - 1553-5258
pISSN - 1534-0392
DOI - 10.3934/cpaa.2010.9.1463
Subject(s) - knot (papermaking) , parametrization (atmospheric modeling) , möbius strip , mathematics , energy (signal processing) , pure mathematics , class (philosophy) , theoretical physics , calculus (dental) , combinatorics , physics , geometry , computer science , quantum mechanics , artificial intelligence , statistics , chemical engineering , engineering , radiative transfer , medicine , dentistry
The Mobius energy, defined 1991 by O'Hara, is the most prominent example of a knot energy. In this text we will focus on the regularity of local minimizers (within a prescribed knot class) whose arc-length parametrization was shown to be $C^{1,1}$ by Freedman, He, and Wang. Later on, He improved this result to $C^\infty$ regularity. In this text we will briefly outline the main ideas of these two steps which require completely different approaches involving techniques from geometry and analysis. Moreover we explain how to rigorously derive the first variation of the Mobius energy and fix a gap in He's treatise.
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