English

Heat-content and diffusive leakage from material sets in the low-diffusivity limit

Analysis of PDEs 2021-03-22 v2 Mathematical Physics Differential Geometry math.MP Probability

Abstract

We generalize leading-order asymptotics of a form of the heat content of a submanifold (van den Berg & Gilkey 2015) to the setting of time-dependent diffusion processes in the limit of vanishing diffusivity. Such diffusion processes arise naturally when advection-diffusion processes are viewed in Lagrangian coordinates. We prove that as diffusivity ε\varepsilon goes to zero, the diffusive transport out of a material set SS under the time-dependent, mass-preserving advection-diffusion equation with initial condition given by the characteristic function \mathds1S\mathds{1}_S, is ε/πdA(S)+o(ε)\sqrt{\varepsilon/\pi} d\overline{A}(\partial S) + o(\sqrt{\varepsilon}). The surface measure dAd\overline A is that of the so-called geometry of mixing, as introduced in (Karrasch & Keller, 2020). We apply our result to the characterisation of coherent structures in time-dependent dynamical systems.

Keywords

Cite

@article{arxiv.2102.08311,
  title  = {Heat-content and diffusive leakage from material sets in the low-diffusivity limit},
  author = {Nathanael Schillling and Daniel Karrasch and Oliver Junge},
  journal= {arXiv preprint arXiv:2102.08311},
  year   = {2021}
}

Comments

21 pages, 1 figure, submitted

R2 v1 2026-06-23T23:13:14.674Z