Small diffusion and short-time asymptotics for Pucci operators

Abstract

This paper presents asymptotic formulas in the case of the following two problems for the Pucci's extremal operators M. It is considered the solution u(x) of -2 M(∇ 2 u)+u=0 in such that u=1 on . Here, ⊂ RN is a domain (not necessarily bounded) and is its boundary. It is also considered v(x,t) the solution of vt - M(∇2 v)=0 in × (0,∞), v=1 on ×(0,∞) and v=0 on × \0\. In the spirit of their previous works, the authors establish the profiles as or t 0+ of the values of u(x) and v(x,t) as well as of those of their q-means on balls touching . The results represent a further step in the extensions of those obtained by Varadhan and by Magnanini-Sakaguchi in the linear regime.