BOUNDEDNESS AND REGULARIZING EFFECTS OF O'HARA'S KNOT ENERGIES

Repulsive knot energies and pseudodifferential calculus for O’Hara’s knot energy family E ^(α) , α ∈ [2, 3) ⋮ Two notes on the O'Hara energies ⋮ On the analyticity of critical points of the Möbius energy ⋮ The \( L^2 \)-gradient of decomposed Möbius energies ⋮ Symmetric critical knots for O'Hara's energies ⋮ Towards a regularity theory for integral Menger curvature ⋮ Discrete Möbius energy ⋮ A Möbius invariant discretization of O’Hara’s Möbius energy ⋮ The gradient flow of the Möbius energy: \(\epsilon\)-regularity and consequences ⋮ Banach gradient flows for various families of knot energies ⋮ Möbius-invariant self-avoidance energies for non-smooth sets of arbitrary dimension and co-dimension ⋮ Stationary points of O'Hara's knot energies ⋮ Variational formulae and estimates of O’Hara’s knot energies ⋮ The gradient flow of O'Hara's knot energies ⋮ Modeling repulsive forces on fibres via knot energies ⋮ Mini-workshop: Nonlocal analysis and the geometry of embeddings. Abstracts from the mini-workshop held November 22--28, 2020 (hybrid meeting) ⋮ A decomposition theorem of the Möbius energy. II: Variational formulae and estimates ⋮ Modeling repulsive forces on fibres via knot energies ⋮ A note on integral Menger curvature for curves ⋮ Harmonic analysis meets critical knots. Critical points of the Möbius energy are smooth ⋮ Decomposition of generalized O'Hara's energies ⋮ Upper and lower bounds and modulus of continuity of decomposed Möbius energies ⋮ Sobolev gradients for the Möbius energy ⋮ Elastic energy regularization for inverse obstacle scattering problems ⋮ On O'Hara knot energies. I: Regularity for critical knots ⋮ Curves between Lipschitz and \(C^1\) and their relation to geometric knot theory ⋮ THE ENERGY SPACES OF THE TANGENT POINT ENERGIES ⋮ On the regularity of critical points for O’Hara’s knot energies: From smoothness to analyticity

• Unnamed Item
• Energy of a knot
• Family of energy functionals of knots
• Energy functionals of knots. II
• Möbius energy of knots and unknots
• DOES FINITE KNOT ENERGY LEAD TO DIFFERENTIABILITY?