Normalized ground states and threshold scattering for focusing NLS on Rd×T via semivirial-free geometry
Abstract
We study the focusing NLS alignnlsabstract i∂t u+x,y u=-|u|α uNLS align on the waveguide manifold Rd×T in the intercritical regime α∈(4d,4d-1). By assuming that the nlsabstract is independent of y, it reduces to the focusing intercritical NLS on Rd, which is known to have standing wave and finite time blow-up solutions. Naturally, we ask whether these special solutions with non-trivial y-dependence exist. In this paper we give an affirmative answer to this question. To that end, we introduce the concept of semivirial functional and consider a minimization problem mc on the semivirial-vanishing manifold with prescribed mass c. We prove that for any c∈(0,∞) the variational problem mc has a ground state optimizer uc which also solves the standing wave equation -x,yuc+βc uc=|u|α u with some βc>0. Moreover, we prove the existence of a critical number c*∈(0,∞) such that itemize For c∈(0,c*), any optimizer uc of mc must satisfy y uc≠ 0. For c∈(c*,∞), any optimizer uc of mc must satisfy y uc=0. itemize Finally, we prove that the previously constructed ground states characterize a sharp threshold for the bifurcation of scattering and finite time blow-up solutions in dependence of the sign of the semivirial.
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.