Configurational entropy in $f(R,T)$ brane models

TL;DR

This paper uses configurational entropy to analyze $f(R,T)$ brane models, establishing bounds on model parameters and highlighting the entropy's role in parameter selection in modified gravity theories.

Contribution

It introduces the application of configurational entropy to $f(R,T)$ brane models, providing new bounds and insights for parameter selection in modified gravity.

Findings

CE imposes stricter bounds on model parameters

Identification of a valley region with minimal entropy

CE can serve as an additional criterion for parameter selection

Abstract

In this work we investigate generalized theories of gravity in the so-called configurational entropy (CE) context. We show, by means of this information-theoretical measure, that a stricter bound on the parameter of $f(R,T)$ brane models arises from the CE. We find that these bounds are characterized by a valley region in the CE profile, where the entropy is minimal. We argue that the CE measure can open a new role and an important additional approach to select parameters in modified theories of gravitation.