guest ::
| Home > Publications database > Inflation with a graceful exit in a random landscape |
| Home > Publications database > Inflation with a graceful exit in a random landscape |
| Book/Report/Internal Report | PUBDB-2016-06064 |
;
2016
This record in other databases: 
Please use a persistent id in citations: doi:10.3204/PUBDB-2016-06064
Report No.: DESY-16-224; IFT-UAM-CSIC-16-128; arXiv:1611.07059
Abstract: We develop a stochastic description of small-field inflationary histories with a graceful exit in a random potential whose Hessian is a Gaussian random matrix as a model of the unstructured part of the string landscape. The dynamical evolution in such a random potential from a small-field inflation region towards a viable late-time de Sitter (dS) minimum maps to the dynamics of Dyson Brownian motion describing the relaxation of non-equilibrium eigenvalue spectra in random matrix theory. We analytically compute the relaxation probability in a saddle point approximation of the partition function of the eigenvalue distribution of the Wigner ensemble describing the mass matrices of the critical points. When applied to small-field inflation in the landscape, this leads to an exponentially strong bias against small-field ranges and an upper bound $N\ll 10$ on the number of light fields $N$ participating during inflation from the non-observation of negative spatial curvature.
|
The record appears in these collections: |
Report/Journal Article
Inflation with a Graceful Exit in a Random Landscape
Journal of high energy physics 2017(3), 163 (2017) [10.1007/JHEP03(2017)163]
Files Fulltext by arXiv.org
BibTeX |
EndNote:
XML,
Text |
RIS
PDF