Modified Theories of Gravity

TL;DR

This paper investigates two large-distance modifications of General Relativity, the Cascading DGP and dRGT massive gravity models, analyzing their mathematical consistency and phenomenological viability in explaining cosmic acceleration.

Contribution

It provides a detailed analysis of the regularization, solution structure, and Vainshtein mechanism in the Cascading DGP and dRGT massive gravity models, advancing understanding of their cosmological implications.

Findings

Cascading DGP's thin limit is well-defined and gravity is regularized.

Identified conditions for the critical tension and differences from previous literature.

Characterized the parameter space where the Vainshtein mechanism operates.

Abstract

The recent observational data in cosmology seem to indicate that the universe is currently expanding in an accelerated way. An intriguing interpretation of these data is that they may just be signalling that Einstein's General Relativity is not the correct description of gravity when we consider distances of the order of the present horizon of the universe. In this thesis we consider two models which modify General Relativity at very large distances, the Cascading DGP and the dRGT massive gravity, and investigate their phenomenological viability. We start with a general introduction to standard cosmology and we introduce the late time acceleration problem and the cosmological constant problem. We then provide a pedagogical introduction to the DGP model, of which the Cascading DGP is an extension, and to the dRGT massive gravity. Concerning the Cascading DGP, we show that the thin limit of the 4D brane inside the (already thin) 5D brane is well defined, at least for the class of configurations that we consider, and confirm that gravity is regularized in these set-ups. We give a geometrical interpretation of the presence of the critical tension, and comment on the difference between the results in the literature and our results, which we support with a numerical calculation. Regarding the dRGT massive gravity, we focus on the branch of solutions in which the Vainshtein mechanism can occur. We determine analytically the number and properties of local solutions which exist asymptotically on large scales (but still below the gravitational Compton wavelength), and of local (inner) solutions which exist on small scales. We characterize exactly the properties of global solutions in every point of the phase space, and characterize precisely in which regions the Vainshtein mechanism takes place. We also provide numerical solutions which confirm our analysis.