Spectral decomposition and Siegel–Veech transforms for strata: the case of marked tori

Jayadev S. Athreya; Jean Lagacé; Martin Möller; Martin Raum

doi:10.4171/JST/563

Spectral decomposition and Siegel–Veech transforms for strata: the case of marked tori

Jayadev S. Athreya, Jean Lagacé^*, Martin Möller, Martin Raum

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

Abstract

Generalizing the well-known construction of Eisenstein series on the modular curves, Siegel–Veech transforms provide a natural construction of square-integrable functions on strata of differentials on Riemann surfaces. This space carries actions of the foliated Laplacian derived from the SL₂(R)-action as well as various differential operators related to relative period translations.

In the paper we give spectral decompositions for the stratum of tori with two marked points. This is a homogeneous space for a special affine group, which is not reductive and thus does not fall into well-studied cases of the Langlands program, but still allows to employ techniques from representation theory and global analysis. Even for this simple stratum, exhibiting all Siegel–Veech transforms requires novel configurations of saddle connections. We also show that the continuous spectrum of the foliated Laplacian is much larger than the space of Siegel–Veech transforms, as opposed to the case of the modular curve. This defect can be remedied by using instead a compound Laplacian involving relative period translations.

Original language	English
Pages (from-to)	895-959
Journal	Journal of Spectral Theory
Volume	15
Issue number	2
DOIs	https://doi.org/10.4171/JST/563
Publication status	Published - 7 May 2025

Keywords

Siegel-Veech transform
spectral decomposition
flat surfaces

Access to Document

10.4171/JST/563Licence: CC BY

Cite this

@article{b767e33c90fa4a36bf20c3cff14114da,

title = "Spectral decomposition and Siegel–Veech transforms for strata: the case of marked tori",

abstract = "Generalizing the well-known construction of Eisenstein series on the modular curves, Siegel–Veech transforms provide a natural construction of square-integrable functions on strata of differentials on Riemann surfaces. This space carries actions of the foliated Laplacian derived from the SL2(R)-action as well as various differential operators related to relative period translations.In the paper we give spectral decompositions for the stratum of tori with two marked points. This is a homogeneous space for a special affine group, which is not reductive and thus does not fall into well-studied cases of the Langlands program, but still allows to employ techniques from representation theory and global analysis. Even for this simple stratum, exhibiting all Siegel–Veech transforms requires novel configurations of saddle connections. We also show that the continuous spectrum of the foliated Laplacian is much larger than the space of Siegel–Veech transforms, as opposed to the case of the modular curve. This defect can be remedied by using instead a compound Laplacian involving relative period translations.",

keywords = "Siegel-Veech transform, spectral decomposition, flat surfaces",

author = "Athreya, {Jayadev S.} and Jean Lagac{\'e} and Martin M{\"o}ller and Martin Raum",

year = "2025",

month = may,

day = "7",

doi = "10.4171/JST/563",

language = "English",

volume = "15",

pages = "895--959",

journal = "Journal of Spectral Theory",

issn = "1664-039X",

publisher = "European Mathematical Society Publishing House",

number = "2",

}

TY - JOUR

T1 - Spectral decomposition and Siegel–Veech transforms for strata: the case of marked tori

AU - Athreya, Jayadev S.

AU - Lagacé, Jean

AU - Möller, Martin

AU - Raum, Martin

PY - 2025/5/7

Y1 - 2025/5/7

N2 - Generalizing the well-known construction of Eisenstein series on the modular curves, Siegel–Veech transforms provide a natural construction of square-integrable functions on strata of differentials on Riemann surfaces. This space carries actions of the foliated Laplacian derived from the SL2(R)-action as well as various differential operators related to relative period translations.In the paper we give spectral decompositions for the stratum of tori with two marked points. This is a homogeneous space for a special affine group, which is not reductive and thus does not fall into well-studied cases of the Langlands program, but still allows to employ techniques from representation theory and global analysis. Even for this simple stratum, exhibiting all Siegel–Veech transforms requires novel configurations of saddle connections. We also show that the continuous spectrum of the foliated Laplacian is much larger than the space of Siegel–Veech transforms, as opposed to the case of the modular curve. This defect can be remedied by using instead a compound Laplacian involving relative period translations.

AB - Generalizing the well-known construction of Eisenstein series on the modular curves, Siegel–Veech transforms provide a natural construction of square-integrable functions on strata of differentials on Riemann surfaces. This space carries actions of the foliated Laplacian derived from the SL2(R)-action as well as various differential operators related to relative period translations.In the paper we give spectral decompositions for the stratum of tori with two marked points. This is a homogeneous space for a special affine group, which is not reductive and thus does not fall into well-studied cases of the Langlands program, but still allows to employ techniques from representation theory and global analysis. Even for this simple stratum, exhibiting all Siegel–Veech transforms requires novel configurations of saddle connections. We also show that the continuous spectrum of the foliated Laplacian is much larger than the space of Siegel–Veech transforms, as opposed to the case of the modular curve. This defect can be remedied by using instead a compound Laplacian involving relative period translations.

KW - Siegel-Veech transform

KW - spectral decomposition

KW - flat surfaces

U2 - 10.4171/JST/563

DO - 10.4171/JST/563

M3 - Article

SN - 1664-039X

VL - 15

SP - 895

EP - 959

JO - Journal of Spectral Theory

JF - Journal of Spectral Theory

IS - 2

ER -

Spectral decomposition and Siegel–Veech transforms for strata: the case of marked tori

Abstract

Keywords

Access to Document

Fingerprint

Cite this