Sharp Boundary Growth Rate Estimate of the Singular Equation - u=u-γ in a Critical Cone

Abstract

For γ>0, we study the sharp boundary growth rate estimate of solutions to the Dirichlet problem of the singular Lane-Emden-Fowler equation equation* - u=u-γ equation* in a critical C1,1 epigraphical cone Cone. We show that the growth rate estimate exhibits fundamentally different behaviors in the following three cases: 1<γ<2, γ=2, and γ>2. Moreover, we obtain the sharp growth rate estimate near the origin for γ>1. As a consequence, we show that when Cone is a C1,1 epigraphical cone, the additional solvability condition in [Theorem 1.3]GuLiZh25 is both sufficient and necessary to achieve the growth rate therein, thereby resolving the main open question left in that paper. With the growth rate estimate, we also derive the optimal modulus of continuity for solutions via the interior Schauder estimate. Our approach is to control the values of a solution U(x) in the region =Cone B1 by introducing a sequence of reference points pk=161-k2en. From the Green function representation of U(x), we derive a discrete integral equation for the sequence ak=16kφU(pk). Such a computation converts the original PDE problem into a recursion for a discrete integral equation, which can be effectively analyzed using basic ODE methods.