Nonexistence of Positive Supersolutions of Nonlinear Biharmonic Equations without the Maximum Principle

Abstract

We study classical positive solutions of the biharmonic inequality -2 v ≥ f(v) in exterior domains in Rn where f:(0,∞) (0,∞) is continuous function. We give lower bounds on the growth of f(s) at s=0 and/or s=∞ such that this inequality has no C4 positive solution in any exterior domain of Rn. Similar results were obtained by Armstrong and Sirakov [ Nonexistence of positive supersolutions of elliptic equations via the maximum principle, Comm. Partial Differential Equations 36 (2011) 2011-2047] for - v f(v) using a method which depends only on properties related to the maximum principle. Since the maximum principle does not hold for the biharmonic operator, we adopt a different approach which relies on a new representation formula and an a priori pointwise bound for nonnegative solutions of -2u 0 in a punctured neighborhood of the origin in Rn.