# Dynamic of generalized transvections

**Authors:** Guido Ahumada (IRIMAS), Nicolas Chevallier (IRIMAS)

arXiv: 1906.07486 · 2019-06-19

## TL;DR

This paper investigates the dynamics of generalized transvections generated by specific homeomorphisms on the plane, analyzing orbit density and invariant measures for various forms of the function .

## Contribution

It introduces the concept of generalized transvections, studies their action on the plane, and characterizes orbit density and invariant measures for particular cases of .

## Key findings

- Most points have dense orbits under the group action.
- All nonzero points have dense orbits when (x) = sgn(x)|x|^2.
- Invariant measures are characterized when  is linear near the origin.

## Abstract

Given an increasing odd homeomorphism $\sigma$ : R $\rightarrow$ R, the two bijective maps h $\sigma$ , v $\sigma$ : R 2 $\rightarrow$ R 2 dened by h $\sigma$ (x, y) = (x + $\sigma$ --1 (y), y) and v $\sigma$ (x, y) = (x, $\sigma$(x) + y). are called generalized transvections. We study the action on the plane of the group $\Gamma$($\sigma$) generated by these two maps. Particularly interesting cases arise when $\sigma$(x) = sgn(x)|x| $\alpha$. We prove that most points have dense orbits and that every nonzero point has a dense orbit when $\sigma$(x) = sgn(x)|x| 2. We also look at invariant measures and thanks to Nogueira's work about SL(2, Z)-invariant measure, we can determine these measures when $\sigma$ is linear in a neighborhood of the origin.

## Full text

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## References

12 references — full list in the complete paper: https://tomesphere.com/paper/1906.07486/full.md

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Source: https://tomesphere.com/paper/1906.07486