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

TL;DR

This paper analyzes a simplified 2D model for martensitic phase transitions, showing that under certain conditions, the minimal energy configurations are periodic sawtooth functions, indicating striped domain patterns.

Contribution

It precisely computes the minimal energy and characterizes minimizers as periodic sawtooth functions in a specific parameter regime, improving previous bounds.

Findings

Minimal energy is exactly computed in the specified regime.

Minimizers are proven to be periodic one-dimensional sawtooth functions.

Results enhance understanding of domain pattern formation in martensitic alloys.

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: $${\cal E}(u)=\beta||u(0,\cdot)||^2_{H^{1/2}([0,h])}+ \int_{0}^{L} dx \int_0^h dy \big(|u_x|^2 + \epsilon |u_{yy}| \big)$$ where $u:[0,L]\times[0,h]\to R$ is periodic in $y$ and $u_y=\pm 1$ almost everywhere. Conti proved that if $\beta\gtrsim\epsilon L/h^2$ then the minimal specific energy scales like $\sim \min\{(\epsilon\beta/L)^{1/2}, (\epsilon/L)^{2/3}\}$, as $(\epsilon/L)\to 0$. In the regime $(\epsilon\beta/L)^{1/2}\ll (\epsilon/L)^{2/3}$, we improve Conti's results, by computing exactly the minimal energy and by proving that minimizers are periodic one-dimensional sawtooth functions.