Generating loops and isolas in semilinear elliptic BVP's

Abstract

In this paper, we ascertain the global λ-structure of the set of positive and negative solutions bifurcating from u=0 for the semilinear elliptic BVP equation* \arrayll -d u= λ a,∇ u+u+λ u2-uq & in , \\ u=0 & on ∂, array. equation* according to the values of d>0 and the integer number q≥ 4. Figures 1.1-1.3 summarize the main findings of this paper according to the values of d and q. Note that the role played by the parameter λ in this model is very special, because, besides measuring the strength of the convection, it quantifies the amplitude of the nonlinear term λ u2. We regard to this problem as a mathematical toy to generate solution loops and isolas in Reaction Diffusion equations.