On positive solutions of minimal growth for singular p-Laplacian with potential term

Abstract

Let be a domain in Rd, d≥ 2, and 1<p<∞. Fix V∈ Lloc∞(). Consider the functional Q and its G\ateaux derivative Q given by Q(u):=1p∫ (|∇ u|p+V|u|p), Q (u):=-∇·(|∇ u|p-2∇ u)+V|u|p-2u. It is assumed that Q≥ 0 on C0∞(). In a previous paper we discussed relations between the absence of weak coercivity of the functional Q on C0∞() and the existence of a generalized ground state. In the present paper we study further relationships between functional-analytic properties of the functional Q and properties of positive solutions of the equation Q (u)=0.