Asymptotic behavior of the free interface for entire vector minimizers in phase transitions

TL;DR

This paper analyzes the asymptotic behavior of free interfaces in entire vector minimizers for phase transition models, establishing measure estimates for the diffuse interface and free boundary, with special bounds when the potential's growth is linear.

Contribution

It provides new measure estimates for the diffuse interface and free boundary in vector minimizers of Allen-Cahn systems, including bounds for the case when the potential grows linearly.

Findings

Measure estimates for the diffuse interface scale as r^{n-1}.

Lower bounds for the free boundary measure are established.

Upper bounds are proved when the potential's growth is linear.

Abstract

We study globally bounded entire minimizers $u:\mathbb{R}^n\rightarrow\mathbb{R}^m$ of Allen-Cahn systems for potentials $W\geq 0$ with $\{W=0\}=\{a_1,...,a_N\}$ and $W(u)\sim |u-a_i|^\alpha$ near $u=a_i$, $0<\alpha<2$. Such solutions are, over large regions, identically equal to some zeroes of the potential $a_i$'s. We establish the estimates \begin{equation*} \mathcal{L}^n(I_0\cap B_r(x_0))\leq c_1r^{n-1},\quad \mathcal{H}^{n-1}(\partial^* I_0\cap B_r(x_0))\geq c_2r^{n-1}, \quad r\geq r_0(x_0) \end{equation*} for the diffuse interface $I_0:=\{x\in\mathbb{R}^n: \min_{1\leq i\leq N}|u(x)-a_i|>0\}$ and the free boundary $\partial I_0$. Furthermore, if $\alpha=1$ we establish the upper bound \begin{equation*} \mathcal{H}^{n-1}(\partial^* I_0\cap B_r(x_0))\leq c_3r^{n-1}, \quad r\geq r_0(x_0). \end{equation*}