On Rayleigh quotients connected to p-Laplace equations with polynomial nonlinearities
Abstract
Let Ω be a bounded open set and p,q,r>1. The main observation of the present work is the following: W01,p(Ω)-solutions of the equation -Δp u = μ|u|q-2u + |u|r-2u parameterized by μ are in bijection with properly normalized critical points of the 0-homogeneous Rayleigh type quotient Rα(u)=\|∇ u\|pp/ (\|u\|qαp \|u\|rp-αp) parameterized by α. We study this bijection and properties of Rα for various relations between p,q,r. In particular, for the generalized convex-concave problem (the case q<p<r) the bijection allows to provide the existence and characterization of all degenerate solutions corresponding to the inflection point of the fibred energy functional: they are critical points of Rα exclusively with α= (r-p)/(r-q). In the subhomogeneous case q<r ≤ p and under additional assumptions on Ω, the ground state level of Rα is simple and isolated, and minimizers of Rα exhaust the whole set of sign-constant solutions of the corresponding equation. In the superhomogeneous case p < q<r, there are no sign-changing critical points in a vicinity of the ground state level of Rα.
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.