English

The one-phase fractional Stefan problem

Analysis of PDEs 2022-08-22 v3 Numerical Analysis Numerical Analysis

Abstract

We study the existence and properties of solutions and free boundaries of the one-phase Stefan problem with fractional diffusion posed in RN\mathbb{R}^N. In terms of the enthalpy h(x,t)h(x,t), the evolution equation reads th+(Δ)sΦ(h)=0\partial_t h+(-\Delta)^s\Phi(h) =0, while the temperature is defined as u:=Φ(h):=max{hL,0}u:=\Phi(h):=\max\{h-L,0\} for some constant L>0L>0 called the latent heat, and (Δ)s(-\Delta)^s stands for the fractional Laplacian with exponent s(0,1)s\in(0,1). We prove the existence of a continuous and bounded selfsimilar solution of the form h(x,t)=H(xt1/(2s))h(x,t)=H(x\,t^{-1/(2s)}) which exhibits a free boundary at the change-of-phase level h(x,t)=Lh(x,t)=L. This level is located at the line (called the free boundary) x(t)=ξ0t1/(2s)x(t)=\xi_0 t^{1/(2s)} for some ξ0>0\xi_0>0. The construction is done in 1D, and its extension to NN-dimensional space is shown. We also provide well-posedness and basic properties of very weak solutions for general bounded data h0h_0 in several dimensions. The temperatures uu of these solutions are continuous functions that have finite speed of propagation, with possible free boundaries. We obtain estimates on the growth in time of the support of uu for solutions with compactly supported initial temperatures. Besides, we show the property of conservation of positivity for uu so that the support never recedes. On the contrary, the enthalpy hh has infinite speed of propagation and we obtain precise estimates on the tail. The limits L0+L\to0^+, L+L\to +\infty, s0+s\to0^+ and s1s\to 1^- are also explored, and we find interesting connections with well-studied diffusion problems. Finally, we propose convergent monotone finite-difference schemes and include numerical experiments aimed at illustrating some of the obtained theoretical results, as well as other interesting phenomena.

Keywords

Cite

@article{arxiv.1912.00097,
  title  = {The one-phase fractional Stefan problem},
  author = {Félix del Teso and Jørgen Endal and Juan Luis Vázquez},
  journal= {arXiv preprint arXiv:1912.00097},
  year   = {2022}
}

Comments

46 pages, 7 figures. Acknowledgments updated (to match published paper) and journal reference added below

R2 v1 2026-06-23T12:31:41.310Z