Striped periodic minimizers of a two-dimensional model for martensitic phase transitions

Abstract

In this paper we consider a simplified two-dimensional scalar model for the formation of mesoscopic domain patterns in martensitic shape-memory alloys at the interface between a region occupied by the parent (austenite) phase and a region occupied by the product (martensite) phase, which can occur in two variants (twins). The model, first proposed by Kohn and Mueller, is defined by the following functional: E(u)=β||u(0,·)||2H1/2([0,h])+ ∫0L dx ∫0h dy (|ux|2 + ε |uyy| ) where u:[0,L]×[0,h] R is periodic in y and uy= 1 almost everywhere. Conti proved that if βε L/h2 then the minimal specific energy scales like \(εβ/L)1/2, (ε/L)2/3\, as (ε/L) 0. In the regime (εβ/L)1/2 (ε/L)2/3, we improve Conti's results, by computing exactly the minimal energy and by proving that minimizers are periodic one-dimensional sawtooth functions.