TY - JOUR

T1 - A general proof of the equivalence between the δn and covariant formalisms

AU - Naruko, A.

PY - 2012/6

Y1 - 2012/6

N2 - Recently, the equivalence between the δN and covariant formalisms has been shown by Suyama et al. but they essentially assumed Einstein gravity in their proof (arXiv:1201.3163). They showed that the evolution equation of the curvature covector in the covariant formalism on uniform energy density slicings coincides with that of the curvature perturbation in the δN formalism assuming the coincidence of uniform energy and uniform expansion (Hubble) slicings, which is the case on superhorizon scales in Einstein gravity. In this short note, we explicitly show the equivalence between the δN and covariant formalisms without specifying the slicing condition and the associated slicing coincidence, in other words, regardless of the gravity theory.

AB - Recently, the equivalence between the δN and covariant formalisms has been shown by Suyama et al. but they essentially assumed Einstein gravity in their proof (arXiv:1201.3163). They showed that the evolution equation of the curvature covector in the covariant formalism on uniform energy density slicings coincides with that of the curvature perturbation in the δN formalism assuming the coincidence of uniform energy and uniform expansion (Hubble) slicings, which is the case on superhorizon scales in Einstein gravity. In this short note, we explicitly show the equivalence between the δN and covariant formalisms without specifying the slicing condition and the associated slicing coincidence, in other words, regardless of the gravity theory.

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U2 - 10.1209/0295-5075/98/69001

DO - 10.1209/0295-5075/98/69001

M3 - Article

AN - SCOPUS:84863521392

VL - 98

JO - Journal de Physique (Paris), Lettres

JF - Journal de Physique (Paris), Lettres

SN - 0295-5075

IS - 6

M1 - 69001 (5pp)

ER -