# The ${\rm PSL}(2,\mathbb{R})^2$-configuration space of four points in   the torus $S^1\times S^1$

**Authors:** Ioannis D. Platis

arXiv: 1703.05124 · 2017-03-16

## TL;DR

This paper introduces a new parametrization of quadruples of points on the torus using cross-ratios, establishing a M"obius structure that links boundary geometries of anti-de Sitter space and symmetric spaces.

## Contribution

It develops a novel cross-ratio framework for the PSL(2,R)^2 configuration space on the torus, connecting boundary structures of AdS3 and symmetric spaces.

## Key findings

- Defined cross-ratios on the torus for quadruples of points
- Established a natural M"obius structure on the torus
- Linked boundary geometries of AdS3 and symmetric spaces

## Abstract

The torus $\mathbb{T}=S^1\times S^1$ appears as the ideal boundary $\partial_\infty AdS^3$ of the three-dimensional anti-de Sitter space $AdS^3$, as well as the F\"urstenberg boundary $\mathbb{F}(X)$ of the rank-2 symmetric space $X={\rm SO}_0(2,2)/{\rm SO}(2)\times{\rm SO}(2)$. We introduce cross-ratios on the torus in order to parametrise the ${\rm PSL}(2,\mathbb{R})^2$ configuration space of quadruples of pairwise distinct points in $\mathbb{T}$ and define a natural M\"obius structure in $\mathbb{T}$ and therefore to $\mathbb{F}(X)$ and $\partial_\infty AdS^3$ as well.

## Full text

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## References

11 references — full list in the complete paper: https://tomesphere.com/paper/1703.05124/full.md

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Source: https://tomesphere.com/paper/1703.05124