We study the motion of discrete interfaces driven by ferromagnetic interactions in a two-dimensional periodic environment by coupling the minimizing movements approach by Almgren, Taylor and Wang and a discrete-to-continuous analysis. The case of a homogeneous environment has been recently treated by Braides, Gelli and Novaga, showing that the effective continuous motion is a flat motion related to the crystalline perimeter obtained by convergence from the ferromagnetic energies, with an additional discontinuous dependence on the curvature, giving in particular a pinning threshold. In this paper we give an example showing that in general the motion does not depend only on the microstructure and that the effective motion is described by a new homogenized velocity. © 2013 European Mathematical Society.
Motion of discrete interfaces in periodic media / Braides, A.; Scilla, G.. - In: INTERFACES AND FREE BOUNDARIES. - ISSN 1463-9963. - 15:4(2013), pp. 451-476. [10.4171/IFB/310]
Motion of discrete interfaces in periodic media
Braides A.;Scilla G.
2013-01-01
Abstract
We study the motion of discrete interfaces driven by ferromagnetic interactions in a two-dimensional periodic environment by coupling the minimizing movements approach by Almgren, Taylor and Wang and a discrete-to-continuous analysis. The case of a homogeneous environment has been recently treated by Braides, Gelli and Novaga, showing that the effective continuous motion is a flat motion related to the crystalline perimeter obtained by convergence from the ferromagnetic energies, with an additional discontinuous dependence on the curvature, giving in particular a pinning threshold. In this paper we give an example showing that in general the motion does not depend only on the microstructure and that the effective motion is described by a new homogenized velocity. © 2013 European Mathematical Society.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
