Double-tower Solutions for Higher Order Prescribed Curvature Problem
Abstract
We consider the following higher order prescribed curvature problem on SN : equation* Dm u=K(y) um*-1 on \ SN, u >0 in \ SN. equation* where K(y)>0 is a radial function, m*=2NN-2m and Dm is 2m order differential operator given by equation* Dm=Πi=1m(-g+14(N-2i)(N+2i-2)), equation* where g=gSNis the Riemannian metric. We prove the existence of infinitely many double-tower type solutions, which are invariant under some non-trivial sub-groups of O(3), and their energy can be made arbitrarily large.
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