Geometrical diagnostic for purely kinetic k-essence dark energy

Abstract

Geometrical diagnostic, involving the statefinder \r,s\ and Om(x), is widely used to discriminate different dark energy models. We apply the statefinder \r,s\ and Om(x) to purely kinetic k-essence dark energy model with Dirac-Born-Infeld-like Lagrangian which can be considered as scalar field realizations of Chaplygin gas. We plot the evolution trajectories of this model in the statefinder parameter-planes and Om(x) parameter-plane. We find that the statefinder \r,s\ and Om(x) fail to distinguish purely kinetic k-essence model from model at 68.3% confidence level for z 1.