A local pointwise inequality for a biharmonic equation with negative exponents

Abstract

In this paper, we are inspired by Ng\o, Nguyen and Phan's [15] study of the pointwise inequality for positive C4-solutions of biharmonic equations with negative exponent by using the growth condition of solutions. They propose an open question of whether the growth condition is necessary to obtain the pointwise inequality. We give a positive answer to this open question. We establish the following local pointwise inequality - uu+α|∇ u|2u2+β u-q+12≤CR2 for positive C4-solutions of the biharmonic equations with negative exponent -2u=u-q \ in \ BR where BR denotes the ball centered at x0 with radius R, n≥3, q>1, and some constants α≥0, β>0, C>0.