Weak Harnack inequality for the non-negative weak supersolution of quasilinear elliptic equation (Q2911465)

This paper deals with the weak Harnack inequality for the nonnegative weak supersolution of the following quasilinear elliptic equation NEWLINE\[NEWLINE-\text{div}\,A(x,u,\nabla u)+ B(x,u,\nabla u)= 0NEWLINE\]NEWLINE (see Theorem 2). More precisely, ``Harnack inequality'' means that the infimum of a nonnegative supersolution \(u\) over a ball can be estimated from below by the integral average of \(u^\gamma\) for any \(0<\gamma< C(n,p)\), \(C(n,p)=\text{const}\).NEWLINENEWLINE To do this the author introduces and studies the classes \(\widetilde P_p(\mathbb{R}^n), P_p(\mathbb{R}^n)\), \(1< p< n\), as generalizations of the Kato class \(K_n\). The main integredient in the proof of Theorem 2 is the use of the Fefferman type inequality (see Theorem 1).