# The Generic Expansion in Analytic Modified Gravity

**Authors:** Dimitrios Trachilis

arXiv: 1905.12975 · 2019-05-31

## TL;DR

This thesis investigates the existence of generic perturbations in higher-order gravity theories with Lagrangian R+εR^2, showing regular solutions in vacuum but not in radiation, and identifying conditions for general solutions.

## Contribution

It demonstrates the conditions under which regular solutions exist in vacuum and radiation for R+εR^2 gravity, highlighting differences from classical solutions.

## Key findings

- Regular solutions exist in vacuum with the correct number of free functions.
- No regular singular states are admitted in vacuum.
- A particular solution exists in the radiation case.

## Abstract

In this Thesis, we treat the problem of the existence of generic perturbations of the regular and singular state in higher-order gravity in cases of vacuum and radiation models that derives from the lagrangian $R+\epsilon R^2$. We show that there is a regular state of the theory in vacuum in the form of a formal series expansion having the same number of free functions as those required for a general solution of the theory, while this is not true for the case of radiation. This means that there exists an open set in the space of analytic initial data of the theory in vacuum that leads to a regular solution having the correct number of free functions to qualify as a general solution. Further, we show that a singular state of the theory in vacuum cannot be admitted, while in the case of radiation we obtain a particular solution.

## Full text

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## Figures

2 figures with captions in the complete paper: https://tomesphere.com/paper/1905.12975/full.md

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Source: https://tomesphere.com/paper/1905.12975