Global solution curves in harmonic parameters, and multiplicity of solutions

Abstract

\[ u+g(u)=f(x) for x ∈ , u=0 on ∂ \] decompose f(x)=μ 1 1+e(x), where 1 is the principal eigenfunction of the Laplacian with zero boundary conditions, and e(x) 1 in L2(), and similarly write u(x)= 1 i+U (x), with U 1 in L2(). We study properties of the solution curve (u(x),μ 1)( 1), and in particular its section μ 1=μ 1( 1), which governs the multiplicity of solutions. We consider both general nonlinearities, and some important classes of equations, and obtain detailed description of solution curves under the assumption g'(u)< 2. We obtain particularly detailed results in case of one dimension. This approach is well suited for numerical computations, which we perform to illustrate our results.