Polyharmonic inequalities with nonlocal terms
Abstract
We study the existence and non-existence of classical solutions for inequalities of type m u ≥ ((|x|)*up)uq in RN (N≥ 1). Here, m (m≥ 1) is the polyharmonic operator, p, q>0 and * denotes the convolution operator, where >0 is a continuous non-increasing function. We devise new methods to deduce that solutions of the above inequalities satisfy the poly-superharmonic property. This further allows us to obtain various Liouville type results. Our study is also extended to the case of systems of simultaneous inequalities.
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