Hypergeometric viable models in $f(R)$ gravity
Abstract
A cosmologically viable hypergeometric model in the modified gravity theory is found from the need for asintoticity towards CDM, the existence of an inflection point in the curve, and the conditions of viability given by the phase space curves , where and are characteristic functions of the model. To analyze the constraints associated with the viability requirements, the models were expressed in terms of a dimensionless variable, i.e. and , where represents the deviation of the model from General Relativity. Using the geometric properties imposed by the inflection point, differential equations were constructed to relate and , and the solutions found were Starobinsky (2007) and Hu-Sawicki type models, nonetheless, it was found that these differential equations are particular cases of a hypergeometric differential equation, so that these models can be obtained from a general hypergeometric model. The parameter domains of this model were analyzed to make the model viable.
Cite
@article{arxiv.2012.00297,
title = {Hypergeometric viable models in $f(R)$ gravity},
author = {Roger Hurtado and Robel Arenas},
journal= {arXiv preprint arXiv:2012.00297},
year = {2025}
}
Comments
10 pages, 3 figures