Growth and nodal current of complexified horocycle eigenfunctions
Abstract
We study horocycle eigenfunctions at Lobachevsky plane. They are functions u H= C+=\z∈ C z>0\ C such that (-y2(∂2∂ x2+∂2∂ y2)+ 2iτ y∂∂ x)u(x+iy)=s2 u(x+iy), x+iy∈ C+, with τ,s∈ R, τ large and s/τ small. In other words, we study eigenfunctions of magnetic quantum Hamiltonian on hyperbolic plane. By Bohr semiclassical correspondence principle, the asymptotic behavior of such functions is related to horocycle flow on T H. Let u C be analytic continuation of function u to Grauert tube; the latter is an open neighbourhood of H in the complexified Lobachevsky plane H C. If a sequence of horocycle functions possesses microlocal quantum ergodicity at the admissible energy level (with =1/τ) then we may find asymptotic distribution of divisor of u C. This is done by establishing the asymptotic estimates on |u C| in H C. Under imaginary-time horocycle flow, microlocalization of u in T* H is taken to localization of u C on H C. The growth of functions u C as τ∞ turns to be governed by the growth of complexified gauge factor occurring in τ-automorphic kernels for functions on H.
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.