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Liouville-type theorems for unbounded solutions of elliptic equations in half-spaces

We prove that the Dirichlet problem for the Lane-Emden equation in a half-space has no positive solutions which grow at most like the distance to the boundary to a power given by the natural scaling exponent of the equation; in other words, we rule out {\it type~I grow-up} solutions. Such a nonexistence result was previously available only for bounded solutions, or under a restriction on the power in the nonlinearity. Instrumental in the proof are local pointwise bounds for the logarithmic gradient of the solution and its normal derivative, which we also establish.

preprint2020arXivOpen access
Boyan SirakovPhilippe Souplet
math.AP
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Boyan SirakovPhilippe Souplet

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