Semilinear elliptic PDE's with biharmonic operator and a singular potential

Abstract

We study the existence/nonexistence of positive solution to the problem of the type: equationPλ cases 2u-μ a(x)u=f(u)+λ b(x)in ,\\ u>0 in ,\\ u=0= u on ∂, cases equation where is a smooth bounded domain in RN, N≥ 5, a, b, f are nonnegaive functions satisfying certain hypothesis which we will specify later. μ,λ are positive constants. Under some suitable conditions on functions a, b, f and the constant μ, we show that there exists λ*>0 such that when 0<λ<λ*, (Pλ) admits a solution in W2,2() W1,20() and for λ>λ*, it does not have any solution in W2,2() W1,20(). Moreover as λλ*, minimal positive solution of (Pλ) converges in W2,2() W1,20() to a solution of (Pλ*). We also prove that there exists λ*<∞ such that λ*≤λ* and for λ>λ*, the above problem (Pλ) does not have any solution even in the distributional sense/very weak sense and there is complete blow-up. Under an additional integrability condition on b, we establish the uniqueness of positive solution of (Pλ*) in W2,2() W1,20().