Local estimates for conformal Q-curvature equations

Abstract

We derive local estimates of positive solutions to the conformal Q-curvature equation (-)m u = K(x) un+2mn-2m ~~~~~~ in ~ near their singular set , where ⊂ Rn is an open set, K(x) is a positive continuous function on , is a closed subset of Rn, 2 ≤ m < n/2 and m is an integer. Under certain flatness conditions at critical points of K on , we prove that u(x) ≤ C [dist(x, )]-(n-2m)/2 when the upper Minkowski dimension of is less than (n-2m)/2.