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Auteurs principaux: Rüland, Angkana, Tissot, Camillo, Tribuzio, Antonio, Zillinger, Christian
Format: Preprint
Publié: 2025
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Accès en ligne:https://arxiv.org/abs/2507.06773
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author Rüland, Angkana
Tissot, Camillo
Tribuzio, Antonio
Zillinger, Christian
author_facet Rüland, Angkana
Tissot, Camillo
Tribuzio, Antonio
Zillinger, Christian
contents The objective of this article is to compare different surface energies for multi-well singular perturbation problems associated with martensitic phase transformations involving higher order laminates. We deduce scaling laws in the singular perturbation parameter which are robust in the choice of the surface energy (e.g., diffuse, sharp, an interpolation thereof or discrete). Furthermore, we show that these scaling laws do not require the presence of isotropic surface energies but that generically also highly anisotropic surface energies yield the same scaling results. More precisely, the presence of essentially generic partial directional derivatives in the regularization terms suffices to produce the same scaling behaviour as in the isotropic setting. The only sensitive directional dependences are directly linked to the lamination directions of the well structure -- and even for these only the ``inner-most'' lamination direction is of significance in determining the scaling law. In view of experimental applications, this shows that also for higher-order laminates, the precise structure of the surface energies -- which is often very difficult to determine experimentally -- does not have a crucial impact on the scaling behaviour of the investigated structures but only enters when considering finer properties.
format Preprint
id arxiv_https___arxiv_org_abs_2507_06773
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On surface energies in scaling laws for singular perturbation problems for martensitic phase transitions
Rüland, Angkana
Tissot, Camillo
Tribuzio, Antonio
Zillinger, Christian
Analysis of PDEs
74N15, 74B99
The objective of this article is to compare different surface energies for multi-well singular perturbation problems associated with martensitic phase transformations involving higher order laminates. We deduce scaling laws in the singular perturbation parameter which are robust in the choice of the surface energy (e.g., diffuse, sharp, an interpolation thereof or discrete). Furthermore, we show that these scaling laws do not require the presence of isotropic surface energies but that generically also highly anisotropic surface energies yield the same scaling results. More precisely, the presence of essentially generic partial directional derivatives in the regularization terms suffices to produce the same scaling behaviour as in the isotropic setting. The only sensitive directional dependences are directly linked to the lamination directions of the well structure -- and even for these only the ``inner-most'' lamination direction is of significance in determining the scaling law. In view of experimental applications, this shows that also for higher-order laminates, the precise structure of the surface energies -- which is often very difficult to determine experimentally -- does not have a crucial impact on the scaling behaviour of the investigated structures but only enters when considering finer properties.
title On surface energies in scaling laws for singular perturbation problems for martensitic phase transitions
topic Analysis of PDEs
74N15, 74B99
url https://arxiv.org/abs/2507.06773