Large singular solutions for conformal Q-curvature equations on Sn

Abstract

In this paper, we study the existence of positive functions K ∈ C1(Sn) such that the conformal Q-curvature equation equation001 Pm (v) =K vn+2mn-2m~~~~~~ on ~ Sn \equation has a singular positive solution v whose singular set is a single point, where m is an integer satisfying 1 ≤ m < n/2 and Pm is the intertwining operator of order 2m. More specifically, we show that when n≥ 2m+4, every positive function in C1(Sn) can be approximated in the C1(Sn) norm by a positive function K∈ C1(Sn) such that the conformal Q-curvature equation has a singular positive solution whose singular set is a single point. Moreover, such a solution can be constructed to be arbitrarily large near its singularity. This is in contrast to the well-known results of Lin Lin1998 and Wei-Xu Wei1999 which show that the conformal Q-curvature equation, with K identically a positive constant on Sn, n > 2m, does not exist a singular positive solution whose singular set is a single point.