Local Structure of Ideal Shapes of Knots

Abstract

Relatively extremal knots are the relative minima of the ropelength functional in C1 topology. On the set curves of fixed length, they are the relative maxima of thickness (normal injectivity radius) functional, including the ideal knots. We prove that a C1,1 relatively extremal knot in Rn has thickness equal to half of the minimal double critical distance unless it has constant maximal (generalized) curvature. This result also applies to links since our method is local. Our main approach is to show that the shortest curves with bounded curvature and C1 boundary conditions in Rn contain CLC (circle-line-circle) curves, if they do not have constant maximal curvature.

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