J
2021
Scale-invariant quadratic gravity and inflation in the Palatini formalism
GIALAMAS, Ioannis D., Alexandros KARAM, Thomas PAPPAS and Vassilis C. SPANOS
Basic information
Original name
Scale-invariant quadratic gravity and inflation in the Palatini formalism
Authors
GIALAMAS, Ioannis D., Alexandros KARAM,
Thomas PAPPAS (300 Greece, belonging to the institution) and Vassilis C. SPANOS
Edition
Physical Review D, College Park (USA), American Physical Society, 2021, 2470-0010
Other information
Type of outcome
Článek v odborném periodiku
Field of Study
10308 Astronomy
Country of publisher
United States of America
Confidentiality degree
není předmětem státního či obchodního tajemství
RIV identification code
RIV/47813059:19630/21:A0000116
Organization unit
Institute of physics in Opava
Keywords in English
DARK-MATTER;SYMMETRY-BREAKING;HIGGS;FLATNESS;UNIVERSE;HORIZON;MODELS
Tags
International impact, Reviewed
Links
GA19-03950S, research and development project.
V originále
In the framework of classical scale invariance, we consider quadratic gravity in the Palatini formalism and investigate the inflationary predictions of the theory. Our model corresponds to a two-field scalar-tensor theory, which involves the Higgs field and an extra scalar field stemming from a gauge U(1)(X) extension of the Standard Model, which contains an extra gauge boson and three right-handed neutrinos. Both scalar fields couple nonminimally to gravity and induce the Planck scale dynamically, once they develop vacuum expectation values. By means of the Gildener-Weinberg approach, we describe the inflationary dynamics in terms of a single scalar degree of freedom along the flat direction of the tree-level potential. The one-loop effective potential in the Einstein frame exhibits plateaus on both sides of the minimum and thus the model can accommodate both small and large field inflation. The inflationary predictions of the model are found to comply with the latest bounds set by the Planck collaboration for a wide range of parameters and the effect of the quadratic in curvature terms is to reduce the value of the tensor-to-scalar ratio.
Displayed: 28/12/2024 07:23