Multiplicity and Bifurcation Results for a Class of Quasilinear Elliptic Problems with Quadratic Growth on the Gradient
Abstract
We investigate the existence, non-existence, and multiplicity of solutions to the following class of quasilinear elliptic equations align*Pλ -div(A(x)Du)=cλ(x)u+( M(x)Du,Du)+h(x), u∈ H01() L∞(), align* where ⊂Rn, n≥ 3, is a bounded domain with a low-regularity boundary ∂. The coefficients c, h ∈ Lp() for some p > n, with c ≥ 0 and cλ(x) := λ c+(x) - c-(x) for a real parameter λ. The matrix A(x) is uniformly positive definite and bounded, while M(x) is positive definite and bounded. Under suitable assumptions, we characterize the solution continuum of (Pλ), including its bifurcation points. We establish existence and uniqueness results in the coercive case (λ ≤ 0) and prove multiplicity results in the non-coercive case (λ > 0). Keywords: Quasilinear elliptic equations, quadratic growth on the gradient, sub and super solutions.
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