Doubling the equatorial for the prescribed scalar curvature problem on SN
Abstract
We consider the prescribed scalar curvature problem on SN SN v-N(N-2)2 v+K(y) vN+2N-2=0 on \ SN, v >0 on \ SN, under the assumptions that the scalar curvature K is rotationally symmetric, and has a positive local maximum point between the poles. We prove the existence of infinitely many non-radial positive solutions, whose energy can be made arbitrarily large. These solutions are invariant under some non-trivial sub-group of O(3) obtained doubling the equatorial. We use the finite dimensional Lyapunov-Schmidt reduction method.
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