2014
DOI: 10.1088/1475-7516/2014/07/007
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Cosmological perturbations through a non-singular ghost-condensate/Galileon bounce

Abstract: We study the propagation of super-horizon cosmological perturbations in a non-singular bounce spacetime. The model we consider combines a ghost condensate with a Galileon term in order to induce a ghost-free bounce. Our calculation is performed in harmonic gauge, which ensures that the linearized equations of motion remain well-defined and nonsingular throughout. We find that, despite the fact that near the bounce the speed of sound becomes imaginary, super-horizon curvature perturbations remain essentially co… Show more

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Cited by 106 publications
(152 citation statements)
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References 81 publications
(148 reference statements)
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“…If the spectrum is generated in a matter phase, non-Gaussianities result due to the growth of fluctuations after Hubble radius crossing in the contracting phase, see Sec. IV E. Observables in the super bounce model are in line with other ekpyrotic models according to [72].…”
Section: F Nonsingular Bounces Via a Galileonsupporting
confidence: 75%
See 2 more Smart Citations
“…If the spectrum is generated in a matter phase, non-Gaussianities result due to the growth of fluctuations after Hubble radius crossing in the contracting phase, see Sec. IV E. Observables in the super bounce model are in line with other ekpyrotic models according to [72].…”
Section: F Nonsingular Bounces Via a Galileonsupporting
confidence: 75%
“…IV, since curvature perturbations stay frozen on super Hubble scales during the bounce, as shown in [72]: here, the computation was per- formed in the harmonic gauge with a detailed discussion of the validity of linear perturbation theory, see Sec. IV A.…”
Section: The Cosmological Super-bouncementioning
confidence: 99%
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“…We will see in the following that kinetic part of this form is useful in matching bounce with inflation, which was first proposed for ghost-free bounce by Cai et al [49], and later connected with Supergravity in [50,51]. Following the Lagrangian (2.1), one can get the equation of motion for φ as:…”
Section: Jhep04(2015)130mentioning
confidence: 97%
“…We also show the shape functions and potential explicitly by numerics in figure 1 and 2. For pioneer works of using this shape functions to model building, see [49][50][51] for ghost-free bounce and see [59] for dark energy models. Now let's go to a little bit more detail about the field evolution both before and after the bounce, which actually become very simple.…”
Section: Jhep04(2015)130mentioning
confidence: 99%