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Main Authors: Gao, Yuan, Patrizi, Stefania
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2502.05962
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author Gao, Yuan
Patrizi, Stefania
author_facet Gao, Yuan
Patrizi, Stefania
contents In this paper, we study the slow patterns of multilayer dislocation dynamics modeled by a multiscale parabolic equation in the half-plane coupled with a dynamic boundary condition on the interface. We focus on the influence of bulk dynamics with various relaxation time scales, on the slow motion pattern on the interface governed by an ODE system. Starting from a superposition of N stationary transition layers, at a specific time scale for the interface dynamics, we prove that the dynamic solution approaches the superposition of N explicit transition profiles whose centers solve the ODE system with a repulsive force. Notably, this ODE system is identical to the one obtained in the slow motion patterns of the one-dimensional fractional Allen-Cahn equation, where the elastic bulk is assumed to be static. Due to the fully coupled bulk and interface dynamics, new corrector functions with delicate estimates are constructed to stabilize the bulk dynamics and characterize the limiting behavior of the dynamic solution throughout the entire half-plane.
format Preprint
id arxiv_https___arxiv_org_abs_2502_05962
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Slow Patterns in Multilayer Dislocation Evolution with Dynamic Boundary Conditions
Gao, Yuan
Patrizi, Stefania
Analysis of PDEs
Pattern Formation and Solitons
In this paper, we study the slow patterns of multilayer dislocation dynamics modeled by a multiscale parabolic equation in the half-plane coupled with a dynamic boundary condition on the interface. We focus on the influence of bulk dynamics with various relaxation time scales, on the slow motion pattern on the interface governed by an ODE system. Starting from a superposition of N stationary transition layers, at a specific time scale for the interface dynamics, we prove that the dynamic solution approaches the superposition of N explicit transition profiles whose centers solve the ODE system with a repulsive force. Notably, this ODE system is identical to the one obtained in the slow motion patterns of the one-dimensional fractional Allen-Cahn equation, where the elastic bulk is assumed to be static. Due to the fully coupled bulk and interface dynamics, new corrector functions with delicate estimates are constructed to stabilize the bulk dynamics and characterize the limiting behavior of the dynamic solution throughout the entire half-plane.
title Slow Patterns in Multilayer Dislocation Evolution with Dynamic Boundary Conditions
topic Analysis of PDEs
Pattern Formation and Solitons
url https://arxiv.org/abs/2502.05962