Calculus of Variations and Geometric Measure Theory
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M. Morini - V. Slastikov

Geometrically induced phase transitions in two-dimensional dumbbell-shaped domains

created by morini on 18 Nov 2013
modified on 04 Mar 2015



Inserted: 18 nov 2013
Last Updated: 4 mar 2015

Journal: Journal of Differential Equations
Year: 1940


We continue the analysis, started in Morini&Slatikov (2012), of a two-dimensional non-convex variational problem, motivated by studies on magnetic domain walls trapped by thin necks. The main focus is on the impact of extreme geometry on the structure of local minimizers representing the transition between two different constant phases. We address here the case of general non-symmetric dumbbell-shaped domains with a small constriction and general multi-well potentials. Our main results concern the existence and uniqueness of non-constant local minimizers, their full classification in the case of convex bulks, and the complete description of their asymptotic behavior, as the size of the constriction tends to zero.


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