Continuum of solutions for an elliptic problem with critical growth in the gradient

Abstract

We consider the boundary value problem equation* - u = λ c(x)u+ μ(x) |∇ u|2 + h(x), u ∈ H10() L∞() (Pλ) equation* where ⊂ N, N ≥ 3 is a bounded domain with smooth boundary. It is assumed that c 0, c,h belong to Lp() for some p > N/2 and that μ ∈ L∞(). We explicit a condition which guarantees the existence of a unique solution of (Pλ) when λ <0 and we show that these solutions belong to a continuum. The behaviour of the continuum depends in an essential way on the existence of a solution of (P0). It crosses the axis λ =0 if (P0) has a solution, otherwise if bifurcates from infinity at the left of the axis λ =0. Assuming that (P0) has a solution and strenghtening our assumptions to μ(x)≥ μ1>0 and h 0, we show that the continuum bifurcates from infinity on the right of the axis λ =0 and this implies, in particular, the existence of two solutions for any λ >0 sufficiently small.