Dirichlet problem for Lane-Emden type equations with several sublinear terms

Abstract

We prove the existence, uniqueness, and sharp bilateral pointwise estimates for positive bounded solutions to the Lane--Emden type problem \[ cases L u = Σi=1mσi uqi+σ0, u≥0 & in , x → y u(x) = f(y), & y ∈ ∂∞, cases \] where 0 < qi < 1. Here Lu = - div(A ∇ u) is a uniformly elliptic operator with bounded coefficients, σi is a nonnegative locally finite Borel measure on an A-regular domain ⊂ Rn which possesses a positive Green function associated with L, and f is a nonnegative continuous function on the boundary ∂∞. An analogous result for positive continuous solutions to the problem is also illustrated. Our method can be adapted to address related sublinear problems with zero boundary conditions involving the fractional Laplace operator (-)α for 0< α < n/2, in place of L, in Rn as well.