Quantitative stratification and sharp regularity estimates for supercritical semilinear elliptic equations

Abstract

In this paper, we investigate the interior regularity theory for stationary solutions of the supercritical nonlinear elliptic equation - u=|u|p-1u , p>n+2n-2, where ⊂Rn is a bounded domain with n≥ 3 . Our primary focus is on the structure of stratification for the singular sets. We define the k -th stratification Sk(u) of u based on the tangent functions and measures. We show that the Hausdorff dimension of Sk(u) is at most k and Sk(u) is k -rectifiable, and establish estimates for volumes associated with points that have lower bounds on the regular scales. These estimates enable us to derive sharp interior estimates for the solutions. Specifically, if αp=2(p+1)p-1 is not an integer, then for any j∈Z≥ 0 , we have Dju∈ Llocqj,∞(), which implies that for any '⊂⊂ , \λ>0:λqjLn(\x∈':|Dju(x)|>λ\)\<+∞, where Ln(·) is the n -dimensional Lebesgue measure, and qj=(p-1)(αp+1)2+j(p-1), with αp being the integer part of αp . The proofs of these results rely on Reifenberg-type theorems developed by A. Naber and D. Valtorta to study the stratification of harmonic maps.