Existence of S-shaped type bifurcation curve with dual cusp catastrophe via variational methods
Abstract
We discuss the existence of multiple positive solutions leading to the occurrence of an S-shaped bifurcation curve to the equations of the form -p u= f(μ,λ, u)~ in ~ ⊂ RN where p is a p-Laplacian, p>1, N≥ 1, μ, λ ∈ R. We deal with relatively unexplored cases when f(μ,λ, u) is non-Lipschitz at u=0, f(μ,λ, 0) = 0 and f(μ,λ, u) <0, u ∈ (0,r), for some r<+∞. We develop the nonlinear generalized Rayleigh quotients method to find a range of parameters where the equation may have distinct branches of positive solutions. As a consequence, applying the Nehari manifold method and the mountain pass theorem, we prove that the equation for some range of values μ, λ, has at least three positive solutions with two linearly unstable solutions and one linearly stable. The results evidence that the bifurcation curve is S-shaped and exhibits the so-called dual cusp catastrophe which is characterized by the fact that the corresponding dynamic equation has stable states only within the cusp-shaped region in the control plane of parameters. Our results are new even in the one-dimensional case and p=2.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.