Abstract
A physically natural potential energy for simple closed curves in R3 is shown to be invariant under Möbius transformations. This leads to the rapid resolution of several open problems: round circles are precisely the absolute minima for energy; there is a minimum energy threshold below which knotting cannot occur; minimizers within prime knot types exist and are regular. Finally, the number of knot types with energy less than any constant M is estimated. © 1993 American Mathematical Society.
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CITATION STYLE
Bryson, S., Freedman, M. H., He, Z. X., & Wang, Z. (1993). Möbius invariance of knot energy. Bulletin of the American Mathematical Society. https://doi.org/10.1090/S0273-0979-1993-00348-3
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