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Fractional heat content asymptotics for Carnot groups

Analysis of PDEs 2026-05-05 v2 Probability

Abstract

We propose a novel approach for studying small-time asymptotics of the fractional heat content of C2C^2 non-characteristic domains in Carnot groups. Denoting the sub-Laplacian operator by L\mathcal{L}, the fractional heat content of a bounded domain Ω\Omega is defined as QΩ(α)(t)=Ωuα(x,t)dxQ^{(\alpha)}_\Omega(t)=\int_{\Omega}u_\alpha(x,t) dx, where uαu_\alpha is the solution to the heat equation corresponding to the fractional sub-Laplacian Lα:=Lα/2\mathcal{L}_\alpha:=\mathcal{L}^{\alpha/2} with Dirichlet boundary condition on Ω\Omega. We prove that for 1α21\le \alpha\le 2, there exists explicit rate function μα:(0,)(0,)\mu_\alpha: (0,\infty)\to (0,\infty) such that \begin{align*} \lim_{t\to 0}\frac{|\Omega|-Q^{(\alpha)}_\Omega(t)}{\mu_\alpha(t)}=|\partial \Omega|_H, \end{align*} where Ω|\Omega|, ΩH|\partial \Omega|_H are the volume and horizontal perimeter of Ω\Omega respectively. Moreover, the rate function μα\mu_\alpha coincides with the same for the Euclidean case.

Keywords

Cite

@article{arxiv.2601.04088,
  title  = {Fractional heat content asymptotics for Carnot groups},
  author = {Rohan Sarkar},
  journal= {arXiv preprint arXiv:2601.04088},
  year   = {2026}
}

Comments

22 pages; Statement of Lemma 4.2 has been modified, and some minor changes have been made in the proofs

R2 v1 2026-07-01T08:54:41.298Z