# Restoring discrete Painlev\'e equations from an E$_8^{(1)}$-associated   one

**Authors:** Basil Grammaticos, Alfred Ramani, Ralph Willox

arXiv: 1812.00712 · 2019-06-26

## TL;DR

This paper introduces a systematic restoration method to derive all discrete Painlevé equations sharing a common autonomous limit, expanding applicability beyond QRT-type mappings and including multistep evolution forms.

## Contribution

It develops a new restoration approach for constructing discrete Painlevé equations from autonomous limits, even for non-QRT mappings, and extends results to multistep evolutions.

## Key findings

- Successfully derived discrete Painlevé equations from an E$_8^{(1)}$-associated limit.
- Extended the restoration method to non-QRT mappings.
- Produced multistep evolution versions of the equations.

## Abstract

We present a systematic method for the construction of discrete Painlev\'e equations. The method, dubbed `restoration', allows one to obtain all discrete Painlev\'e equations that share a common autonomous limit, up to homographic transformations, starting from any one of those limits. As the restoration process crucially depends on the classification of canonical forms for the mappings in the QRT family, it can in principle only be applied to mappings that belong to that family. However, as we show in this paper, it is still possible to obtain the results of the restoration even when the initial mapping is not of QRT type (at least for the system at hand, but we believe our approach to be of much wider applicability). For the equations derived in this paper we also show how, starting from a form where the independent variable advances one step at a time, one can obtain versions corresponding to multistep evolutions.

## Full text

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Source: https://tomesphere.com/paper/1812.00712