Evolving plane curves by curvature in relative geometries. II

On the 2-dimensional dual Minkowski problem ⋮ A unified flow approach to smooth, even \(L_p\)-Minkowski problems ⋮ Inverse anisotropic mean curvature flow and a Minkowski type inequality ⋮ \(L_p\) Minkowski problem with not necessarily positive data ⋮ Evolving plane curves by curvature in relative geometries. II ⋮ Selfsimilar shrinking curves for anisotropic curvature flow equations ⋮ An estimate for the anisotropic maximum curvature in the planar case ⋮ THE GREEN–OSHER INEQUALITY IN RELATIVE GEOMETRY ⋮ The Scaling Limit for Zero-Temperature Planar Ising Droplets: With and Without Magnetic Fields ⋮ Smooth solutions to the Gauss image problem ⋮ The Heat Equation Shrinks Ising Droplets to Points ⋮ Existence of selfsimilar shrinking curves for anisotropic curvature flow equations ⋮ On a planar conformal curvature problem ⋮ Inverse anisotropic curvature flow from convex hypersurfaces ⋮ Motion by crystalline-like mean curvature: A survey ⋮ A flow approach to the fractional Minkowski problem ⋮ The evolution of immersed locally convex plane curves driven by anisotropic curvature flow ⋮ The evolution of gradient flow minimizing the anisoperimetric ratio of convex plane curves ⋮ Notes on the log-Brunn-Minkowski inequality ⋮ Star-shaped centrosymmetric curves under Gage's area-preserving flow ⋮ NONUNIQUENESS FOR CRYSTALLINE CURVATURE FLOW ⋮ A flow approach to the planar Lp$L_p$ Minkowski problem ⋮ Curvature evolution of plane curves with prescribed opening angle ⋮ Anisotropic area-preserving nonlocal flow for closed convex plane curves ⋮ The logarithmic Minkowski inequality for non-symmetric convex bodies ⋮ An anisotropic area-preserving flow and its geometric application ⋮ An anisotropic area-preserving flow for convex plane curves ⋮ On the number of solutions to the discrete two-dimensional \(L_{0}\)-Minkowski problem. ⋮ Anisotropic flows for convex plane curves ⋮ A flow method for the dual Orlicz–Minkowski problem ⋮ \(2\pi\)-periodic self-similar solutions for the anisotropic affine curve shortening problem. II ⋮ On Yau's problem of evolving one curve to another: convex case ⋮ Zero-temperature 2D stochastic Ising model and anisotropic curve-shortening flow ⋮ 2\(\pi\)-periodic self-similar solutions for the anisotropic affine curve shortening problem ⋮ A new proof of a Harnack inequality for the curve shortening flow ⋮ Existence of self-similar evolution of crystals grown from supersaturated vapor ⋮ Remarks on the 2-Dimensional L_p-Minkowski Problem ⋮ Non-uniqueness of self-similar shrinking curves for an anisotropic curvature flow ⋮ Curve shortening and the Banchoff-Pohl inequality in symmetric Minkowski geometries ⋮ Existence and uniqueness of solutions to Orlicz Minkowski problems involving \(0 < p < 1\) ⋮ Concepts of curvatures in normed planes ⋮ A non-local area preserving curve flow ⋮ The Orlicz Minkowski problem involving \(0 < p < 1 \): from one constant to an infinite interval ⋮ The log-Brunn-Minkowski inequality in ℝ³ ⋮ Variational characterization for the planar dual Minkowski problem ⋮ Existence of smooth even solutions to the dual Orlicz-Minkowski problem ⋮ Crystalline flow starting from a general polygon ⋮ A class of Gauss curvature flows and its applications to an even dual Orlicz-Minkowski type problem ⋮ The planar Orlicz Minkowski problem for \(p=0\) without even assumptions ⋮ Remarks on a planar conformal curvature problem ⋮ A logarithmic Gauss curvature flow and the Minkowski problem. ⋮ The discrete planar \(L_0\)-Minkowski problem ⋮ Evolving plane curves by curvature in relative geometries ⋮ The planar Orlicz Minkowski problem in the \(L^1\)-sense

• Multiphase thermomechanics with interfacial structure. II: Evolution of an isothermal interface
• An isoperimetric inequality with applications to curve shortening
• On the formation of singularities in the curve shortening flow
• The heat equation shrinking convex plane curves
• Four-manifolds with positive curvature operator
• The heat equation shrinks embedded plane curves to round points
• Parabolic equations for curves on surfaces. II: Intersections, blow-up and generalized solutions
• Parabolic equations for curves on surfaces. I: Curves with \(p\)-integrable curvature
• Evolving plane curves by curvature in relative geometries. II
• Nonlinear analytic semiflows
• Deforming a hypersurface by its Gauss-Kronecker curvature
• Shapes of worn stones
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