The Euler characteristic correction to the Kaehler potential - revisited

Abstract

We confirm the leading α'3 correction to the 4d, N = 1 K\"ahler potential of type IIB orientifold compactifications, proportional to the Euler characteristic of the Calabi-Yau threefold (BBHL correction). We present the explicit solution for the α'3-modified internal background metric in terms of the non-harmonic part of the third Chern form of the leading order Calabi-Yau manifold. The corrected internal manifold is almost Calabi-Yau and admits an SU(3) structure with non-vanishing torsion. We also find that the full ten-dimensional Einstein frame background metric is multiplied by a non-trivial Weyl factor. Performing a Kaluza-Klein reduction on the modified background we derive the α'3-corrected kinetic terms for the dilaton and the K\"ahler deformations of the internal Calabi-Yau threefold for arbitrary h1,1. We analyze these kinetic terms in the 4d, N = 2 un-orientifolded theory, confirming the expected correction to the K\"ahler moduli space prepotential, as well as in the 4d, N = 1 orientifolded theory, thus determining the corrections to the K\"ahler potential and K\"ahler coordinates.