Exact multiplicity of solutions for some semilinear Dirichlet problems

Abstract

The classical result of A. Ambrosetti and G. Prodi [1], in the form of M.S. Berger and E. Podolak [4], gives the exact number of solutions for the problem \[ u+g(u)= μ φ 1(x)+e(x) \;\; in D , \;\; u=0 \;\; on ∂ D \,, \] depending on the real parameter μ, for a class of convex g(u), and ∫ D e(x) φ 1(x)\, dx=0 (where φ 1(x)>0 is the principal eigenfunction of the Laplacian on D, and D ⊂ Rn is a smooth domain). By considering generalized harmonics, we give a similar result for the problem \[ u+g(u)= μ f(x) \;\; in D , \;\; u=0 \;\; on ∂ D \,, \] with f(x)>0. Such problems occur, for example, in "fishing" applications that we discuss, and propose a new model. Our approach also produces a very simple proof of the anti-maximum principle of Ph. Cl\'ement and L.A. Peletier [5].