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This paper proves the existence of solutions that solve the Nonlinear Partial differential equation on the exterior of the ball centered at the origin in R^N with radius R > 0, with boundary conditions u = 0 on the boundary, and u (x) approaches 0 as | x | approaches infinity. When the function is local Lipschitzian grows superlinear at infinity and singular at 0. Also N > 2, f (u) ~ (-1) / (|u| ^q-1 u) for small u with 0 1. Also, K (x) ~ | x |^ - (Alpha) with 2 < Alpha < 2 (N - 1) for large | x |. We used the fixed point method and other techniques to prove the existence.
Ali et al. (Tue,) studied this question.