Extended family of generalized Chaplygin gas models

Abstract

The generalized Chaplygin gas is usually defined as a barotropic perfect fluid with an equation of state p=-A -α, where and p are the proper energy density and pressure, respectively, and A and α are positive real parameters. It has been extensively studied in the literature as a quartessence prototype unifying dark matter and dark energy. Here, we consider an extended family of generalized Chaplygin gas models parameterized by three positive real parameters A, α and β, which, for two specific choices of β [β=1 and β=(1+α)/(2α)], is described by two different Lagrangians previously identified in the literature with the generalized Chaplygin gas. We show that, for β > 1/2, the linear stability conditions and the maximum value of the sound speed cs are regulated solely by β, with 0 cs 1 if β 1. We further demonstrate that in the non-relativistic regime the standard equation of state p=-A -α of the generalized Chaplygin gas is always recovered, while in the relativistic regime this is true only if β=(1+α)/(2α). We present a regularization of the (α→ 0, A → ∞) limit of the generalized Chaplygin gas, showing that it leads to a logarithmic Chaplygin gas model with an equation of state of the form p = A (/*), where A is a real parameter and *>0 is an arbitrary energy density. We finally derive its Lagrangian formulation.