Isolated Singularities of Nonlinear Polyharmonic Inequalities
Abstract
We obtain results for the following question where m 1 and n 2 are integers. Question. For which continuous functions f [0,∞) [0,∞) does there exist a continuous function φ (0,1) (0,∞) such that every C2m nonnegative solution u(x) of 0 -m u f(u) in B2(0)\0\⊂ Rn satisfies u(x) = O(φ(|x|)) as x 0 and what is the optimal such φ when one exists?
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