Logarithmic loop corrections, moduli stabilisation and de Sitter vacua in string theory
Abstract
We study string loop corrections to the gravity kinetic terms in type IIB compactifications on Calabi-Yau threefolds or their orbifold limits, in the presence of -branes and orientifold planes. We show that they exhibit in general a logarithmic behaviour in the large volume limit transverse to the -branes, induced by a localised four-dimensional Einstein-Hilbert action that appears at a lower order in the closed string sector, found in the past. Here, we compute the coefficient of the logarithmic corrections and use them to provide an explicit realisation of a mechanism for K\"ahler moduli stabilisation that we have proposed recently, which does not rely on non-perturbative effects and lead to de Sitter vacua. Our result avoids no-go theorems of perturbative stabilisation due to runaway potentials, in a way similar to the Coleman-Weinberg mechanism, and provides a counter example to one of the swampland conjectures concerning de Sitter vacua in quantum gravity, once string loop effects are taken into account; it thus paves the way for embedding the Standard Model of particle physics and cosmology in string theory.
Cite
@article{arxiv.1909.10525,
title = {Logarithmic loop corrections, moduli stabilisation and de Sitter vacua in string theory},
author = {Ignatios Antoniadis and Yifan Chen and George K. Leontaris},
journal= {arXiv preprint arXiv:1909.10525},
year = {2020}
}
Comments
18 pages, 4 figures; published version