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Slow motion in the gradient theory of phase transitions via energy and spectrum - MaRDI portal

Slow motion in the gradient theory of phase transitions via energy and spectrum

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Publication:1382767

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DOI10.1007/s005260050081zbMath0910.35146OpenAlexW1970178857MaRDI QIDQ1382767

Giorgio Fusco, Nicholas D. Alikakos, Lia Bronsard

Publication date: 18 March 1998

Published in: Calculus of Variations and Partial Differential Equations (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1007/s005260050081

zbMATH Keywords

Cahn-Hilliard equations dynamics of almost spherical interfaces

Mathematics Subject Classification ID

Optimality conditions for problems involving partial differential equations (49K20) Stefan problems, phase changes, etc. (80A22) Free boundary problems for PDEs (35R35)

Related Items (17)

Semilinear Neumann boundary value problems on a rectangle ⋮ Slow motion for the 1D Swift-Hohenberg equation ⋮ Exponentially slow dynamics and interfaces intersecting the boundary ⋮ Stochastic Cahn-Hilliard equation in higher space dimensions: the motion of bubbles ⋮ Slow motion for gradient systems with equal depth multiple-well potentials ⋮ Influence of corner layers in the variational determination of bubble solutions of the constrained Allen–Cahn equation ⋮ Gradient invariance of slow energy descent: spectral renormalization and energy landscape techniques ⋮ Critical points of a singular perturbation problem via reduced energy and local linking ⋮ Slow motion for the nonlocal Allen-Cahn equation in \(n\) dimensions ⋮ On the motion law of fronts for scalar reaction-diffusion equations with equal depth multiple-well potentials ⋮ Stability of spot and ring solutions of the diblock copolymer equation ⋮ Gradient Dynamics: Motion Near a Manifold of Quasi-Equilibria ⋮ Second-order \(\Gamma\)-limit for the Cahn-Hilliard functional ⋮ Refined Jacobian estimates and Gross-Pitaevsky vortex dynamics ⋮ Effective dynamics of magnetic vortices ⋮ Periodic motions for multi-wells potentials and layers dynamic for the vector Allen-Cahn equation ⋮ Density estimates for vector minimizers and applications

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