# A new approach to the analysis of the reconstruction methods, phase   space, and exact solutions of the alternative theories of gravity

**Authors:** Behzad Tajahmad

arXiv: 1812.03317 · 2018-12-11

## TL;DR

The paper introduces the $rak{B}$-Function Method, a novel, model-independent approach for analyzing the reconstruction, phase space, and exact solutions in alternative gravity theories, streamlining data analysis and physical admissibility assessments.

## Contribution

It proposes the $rak{B}$-Function Method with eight new theorems, enabling efficient determination of physically admissible parameter ranges in alternative gravity models.

## Key findings

- The $rak{B}$-Function encapsulates conditions for physical viability.
- The method simplifies analysis by reducing conditions to a single function.
- It facilitates quick and model-independent data analysis.

## Abstract

A new approach, "$\mathfrak{B}\text{-Function}$ Method", to the analysis of the reconstruction methods, phase space, and exact solutions of the alternative theories of gravity is suggested. The $\mathfrak{B}\text{-function}$ method which is constructed by suggesting eight new model-independent physical theorems, extracts the physically admissible ranges of the evolution of the parameters (i.e. the variables and constant parameters of action and those which emerged by differential equations as the constants of integration) and helps one for quick data analysis. The most significant feature and beauty of the $\mathfrak{B}\text{-function}$ method are that all conditions leading to physically admissible domains, can be expressed only by one new function, $\mathfrak{B}\text{-Function}$, which is the Lie derivative of $\ln(\mathcal{F}(x))$ along a vector field, $\mathbf{X}=x+c$, on a singleton $Q=\{x\}$.

## Figures

1 figure with captions in the complete paper: https://tomesphere.com/paper/1812.03317/full.md

---
Source: https://tomesphere.com/paper/1812.03317