Menger curvature as a knot energy
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Publication:512286
DOI10.1016/j.physrep.2013.05.003zbMath1358.57019OpenAlexW2038638548MaRDI QIDQ512286
Heiko von der Mosel, Paweł Strzelecki
Publication date: 24 February 2017
Published in: Physics Reports (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.physrep.2013.05.003
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Related Items (9)
On the analyticity of critical points of the Möbius energy ⋮ On the analyticity of critical points of the generalized integral Menger curvature in the Hilbert case ⋮ Towards a regularity theory for integral Menger curvature ⋮ Integral Menger curvature and rectifiability of $n$-dimensional Borel sets in Euclidean $N$-space ⋮ Minimal Ws,ns$W^{s,\frac{n}{s}}$‐harmonic maps in homotopy classes ⋮ Dynamics of embedded curves by doubly-nonlocal reaction–diffusion systems ⋮ A speed preserving Hilbert gradient flow for generalized integral Menger curvature ⋮ The elastic trefoil is the doubly covered circle ⋮ Sobolev gradients for the Möbius energy
Cites Work
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- Following knots down their energy gradients
- Tangent-point repulsive potentials for a class of non-smooth \(m\)-dimensional sets in \(\mathbb R^n\). I: smoothing and self-avoidance effects
- Sharp boundedness and regularizing effects of the integral Menger curvature for submanifolds
- Characterization of ideal knots
- Regularity theory for the Möbius energy
- Integral Menger curvature for surfaces
- The gradient flow of the Möbius energy near local minimizers
- What are the longest ropes on the unit sphere?
- Rectifiable sets and the traveling salesman problem
- Energy of a knot
- High-dimensional Menger-type curvatures. II: \(d\)-separation and a menagerie of curvatures
- Criticality for the Gehring link problem
- Diffeomorphism finiteness for manifolds with Ricci curvature and \(L^{n/2}\)-norm of curvature bounded
- Thickness and crossing number of knots
- Thickness of knots
- Analytic capacity, Calderón-Zygmund operators, and rectifiability
- Menger curvature and rectifiability
- Energy functionals of knots. II
- Möbius energy of knots and unknots
- Global curvature and self-contact of nonlinearly elastic curves and rods
- On the minimum ropelength of knots and links
- Euler-Lagrange equations for nonlinearly elastic rods with self-contact
- Global curvature for rectifiable loops
- The gradient flow of O'Hara's knot energies
- Knots.
- Self-interactions of strands and sheets
- Minimal Hölder regularity implying finiteness of integral Menger curvature
- High-dimensional Menger-type curvatures. I: Geometric multipoles and multiscale inequalities
- Characterizing \(W^{2,p}\) submanifolds by \(p\)-integrability of global curvatures
- On rectifiable curves with \(L^{p}\)-bounds on global curvature: self-avoidance, regularity, and minimizing knots
- Global curvature for surfaces and area minimization under a thickness constraint
- On the total curvature of knots
- Repulsive knot energies and pseudodifferential calculus for O’Hara’s knot energy family E (α) , α ∈ [2, 3)
- A constructive approach to modelling the tight shapes of some linked structures
- Reconfigurable Knots and Links in Chiral Nematic Colloids
- On Sphere-Filling Ropes
- TANGENT-POINT SELF-AVOIDANCE ENERGIES FOR CURVES
- Curvature Measures
- Regularizing and self-avoidance effects of integral Menger curvature
- Differential Topology
- Global curvature, thickness, and the ideal shapes of knots
- EXISTENCE OF IDEAL KNOTS
- Non‐recursive functions, knots “with thick ropes,” and self‐clenching “thick” hyperspheres
- A note on integral Menger curvature for curves
- Knot Tightening by Constrained Gradient Descent
- KNOTS OF CONSTANT CURVATURE
- Symmetric criticality for tight knots
- Geometric Sobolev-like embedding using high-dimensional Menger-like curvature
- Sur la courbure totale d'une courbe gauche faisant un nœud
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