Mathematical analysis of a mesoscale model for multiphase membranes

Q1 Mathematics GAMM Mitteilungen Pub Date : 2024-08-10 DOI:10.1002/gamm.202470009

Jakob Fuchs, Matthias Röger

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Abstract

In this article, we introduce a mesoscale continuum model for membranes made of two different types of amphiphilic lipids. The model extends work by Peletier and the second author (Arch. Ration. Mech. Anal. 193, 2009) for the one-phase case. We present a mathematical analysis of the asymptotic reduction to the macroscale when a key length parameter becomes arbitrarily small. We identify two main contributions in the energy: one that can be connected to bending of the overall structure and a second that describes the cost of the internal phase separations. We prove the $Γ$ -convergence towards a perimeter functional for the phase separation energy and construct, in two dimensions, recovery sequences for the convergence of the full energy towards a 2D reduction of the Jülicher–Lipowsky bending energy with a line tension contribution for phase separated hypersurfaces.

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多相膜中尺度模型的数学分析

在本文中，我们介绍了由两种不同类型的两亲脂质构成的膜的中尺度连续模型。该模型扩展了 Peletier 和第二位作者（Arch. Ration. Mech. Anal. 193, 2009）针对单相情况所做的工作。我们介绍了当关键长度参数变得任意小时，渐进还原到宏观尺度的数学分析。我们确定了能量的两个主要贡献：一个与整体结构的弯曲有关，另一个描述了内部相分离的代价。我们证明了相分离能量与周长函数的Γ ＄ \Gamma ＄ -收敛性，并在二维维度上构建了恢复序列，用于将全部能量收敛到具有相分离超表面线张力贡献的尤利歇尔-利波斯基弯曲能量的二维还原。

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