Least energy solutions to a cooperative system of Schr\"odinger equations with prescribed L2-bounds: at least L2-critical growth

Abstract

We look for least energy solutions to the cooperative systems of coupled Schr\"odinger equations equation* cases - ui + λi ui = ∂iG(u) in \ RN, \ N ≥ 3, ui ∈ H1(RN), ∫RN |ui|2 \, dx ≤ i2 cases i∈\1,…,K\ equation* with G≥ 0, where i>0 is prescribed and (λi, ui) ∈ R × H1 (RN) is to be determined, i∈\1,…,K\. Our approach is based on the minimization of the energy functional over a linear combination of the Nehari and Pohozaev constraints intersected with the product of the closed balls in L2(RN) of radii i, which allows to provide general growth assumptions about G and to know in advance the sign of the corresponding Lagrange multipliers. We assume that G has at least L2-critical growth at 0 and admits Sobolev critical growth. The more assumptions we make about G, N, and K, the more can be said about the minimizers of the corresponding energy functional. In particular, if K=2, N∈\3,4\, and G satisfies further assumptions, then u=(u1,u2) is normalized, i.e., ∫RN |ui|2 \, dx=i2 for i∈\1,2\.

0

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.

Discussion (0)

Sign in to join the discussion.

Loading comments…