2016
DOI: 10.1007/s00220-016-2749-x
|View full text |Cite
|
Sign up to set email alerts
|

Superscars for Arithmetic Toral Point Scatterers

Abstract: We consider momentum push-forwards of measures arising as quantum limits (semiclassical measures) of eigenfunctions of a point scatterer on the standard flat torus T 2 = R 2 /Z 2 . Given any probability measure arising by placing delta masses, with equal weights, on Z 2 -lattice points on circles and projecting to the unit circle, we show that the mass of certain subsequences of eigenfunctions, in momentum space, completely localizes on that measure and are completely delocalized in position (i.e., concentrati… Show more

Help me understand this report
View preprint versions

Search citation statements

Order By: Relevance

Paper Sections

Select...
3
1

Citation Types

2
7
0

Year Published

2016
2016
2023
2023

Publication Types

Select...
6
1

Relationship

1
6

Authors

Journals

citations
Cited by 7 publications
(9 citation statements)
references
References 70 publications
2
7
0
Order By: Relevance
“…These results were partially generalised to three dimensions by Yesha [18,19] who showed that for the cubic torus, all eigenfunctions equidistribute in position space, and that almost all eigenfunctions equidistribute in phase space. These results are further complimented by Kurlberg and Rosenzweig [7] who show the existence of localisation in position representation in 2 dimensions and momentum representation in both 2 and 3 dimensions. In this paper we generalise the results on the cubic torus to include nonzero quasimomentum, which destroys the high eigenvalue multiplicity and consequently, the equidistribution observed by Yesha.…”
Section: Introductionsupporting
confidence: 69%
See 1 more Smart Citation
“…These results were partially generalised to three dimensions by Yesha [18,19] who showed that for the cubic torus, all eigenfunctions equidistribute in position space, and that almost all eigenfunctions equidistribute in phase space. These results are further complimented by Kurlberg and Rosenzweig [7] who show the existence of localisation in position representation in 2 dimensions and momentum representation in both 2 and 3 dimensions. In this paper we generalise the results on the cubic torus to include nonzero quasimomentum, which destroys the high eigenvalue multiplicity and consequently, the equidistribution observed by Yesha.…”
Section: Introductionsupporting
confidence: 69%
“…These results were partially generalised to three dimensions by Yesha [18,19] who showed that for the cubic torus, all eigenfunctions equidistribute in position space, and that almost all eigenfunctions equidistribute in phase space. These results are further complimented by Kurlberg and Rosenzweig [7]…”
Section: Introductionsupporting
confidence: 67%
“…The quantum limits of a point scatterer on a torus with an irrational aspect ratio (also known as the Šeba billiard [23]) were further studied by Kurlberg-Ueberschär [20], who proved the existence of "scars", i.e., localized quantum limits. The existence of scars for arithmetic point scatterers was established by Kurlberg and Rosenzweig [18]. 1.4.…”
Section: Toral Point Scatterersmentioning
confidence: 99%
“…This system can be rigorously studied by means of von Neumann's theory of self-adjoint extensions. Over the past twenty years much work has been devoted to the study of the spectrum and eigenfunctions of such billiards [12,5,6,7,8,19,31,23,24,21,22]. In particular, arithmetic Seba billiards have been shown to be quantum ergodic [31,23], whereas diophantine Seba billiards possess scarred semiclassical measures [24,21].…”
Section: Introductionmentioning
confidence: 99%