English

Small diffusion and short-time asymptotics for Pucci operators

Analysis of PDEs 2020-04-21 v2

Abstract

This paper presents asymptotic formulas in the case of the following two problems for the {\it Pucci's extremal operators} M±\mathcal{M}^\pm. It is considered the solution uε(x)u^\varepsilon(x) of ε2M±(2uε)+uε=0-\varepsilon^2 \mathcal{M}^\pm\left(\nabla ^2 u^\varepsilon\right)+u^\varepsilon=0 in Ω\Omega such that uε=1u^\varepsilon=1 on Γ\Gamma. Here, ΩRN\Omega\subset \mathbb{R}^N is a domain (not necessarily bounded) and Γ\Gamma is its boundary. It is also considered v(x,t)v(x,t) the solution of vtM±(2v)=0v_t - \mathcal{M}^\pm\left(\nabla^2 v\right)=0 in Ω×(0,)\Omega\times (0,\infty), v=1v=1 on Γ×(0,)\Gamma\times(0,\infty) and v=0v=0 on Ω×{0}\Omega\times \{0\}. In the spirit of their previous works, the authors establish the profiles as ε\varepsilon or t0+t\to 0^+ of the values of uε(x)u^\varepsilon(x) and v(x,t)v(x,t) as well as of those of their qq-means on balls touching Γ\Gamma. The results represent a further step in the extensions of those obtained by Varadhan and by Magnanini-Sakaguchi in the linear regime.

Keywords

Cite

@article{arxiv.2001.01112,
  title  = {Small diffusion and short-time asymptotics for Pucci operators},
  author = {Diego Berti and Rolando Magnanini},
  journal= {arXiv preprint arXiv:2001.01112},
  year   = {2020}
}

Comments

15 pages. Minor typos fixed. The article, which is dedicated to the 65th birthday of Sergio Vessella, has been accepted by Applicable Analysis: Special Issue on Partial Differential Equations, Inverse and Ill-Posed Problems, Unique Continuation and Applications. The paper is already available in its online version

R2 v1 2026-06-23T13:02:53.991Z