Generalized Galileon cosmology

TL;DR

This paper explores generalized Galileon models with scalar functions, deriving conditions for stable de Sitter solutions and analyzing their cosmological dynamics through both analytic and numerical methods.

Contribution

It introduces a broad class of generalized Galileon theories with second-order equations of motion and analyzes their stability and cosmological implications.

Findings

Identified conditions for ghost and Laplacian stability in generalized Galileon models.

Derived specific forms of scalar functions for stable de Sitter solutions.

Performed detailed numerical simulations of cosmological evolution in these theories.

Abstract

We study the cosmology of a generalized Galileon field $\phi$ with five covariant Lagrangians in which $\phi$ is replaced by general scalar functions $f_{i}(\phi)$ (i=1,...,5). For these theories, the equations of motion remain at second-order in time derivatives. We restrict the functional forms of $f_{i}(\phi)$ from the demand to obtain de Sitter solutions responsible for dark energy. There are two possible choices for power-law functions $f_{i}(\phi)$, depending on whether the coupling $F(\phi)$ with the Ricci scalar $R$ is independent of $\phi$ or depends on $\phi$. The former corresponds to the covariant Galileon theory that respects the Galilean symmetry in the Minkowski space-time. For generalized Galileon theories we derive the conditions for the avoidance of ghosts and Laplacian instabilities associated with scalar and tensor perturbations as well as the condition for the stability of de Sitter solutions. We also carry out detailed analytic and numerical study for the cosmological dynamics in those theories.