Ground state solutions for the singular Lane-Emden-Fowler equation with sublinear convection term
Abstract
We are concerned with singular elliptic equations of the form - u= p(x)(g(u)+ f(u)+|∇ u|a) in N (N≥ 3), where p is a positive weight and 0< a <1. Under the hypothesis that f is a nondecreasing function with sublinear growth and g is decreasing and unbounded around the origin, we establish the existence of a ground state solution vanishing at infinity. Our arguments rely essentially on the maximum principle.
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