Master's Thesis in Theoretical Physics - Universiteit Utrecht

and particle physics. The Einstein equations that follow from Einstein’s theory of generalrelativity allow for a solution that leads to an accelerated expansion of our universe. A specialtype of matter with negative pressure is needed for this particular solution, and Guthrealized that this is possible within certain scalar field models. The inflationary hypothesiscould solve many of the problems that cosmologists faced at the time, and it lead to arevolution in cosmology. Today there are literally hundreds of inflationary models and newmodels are being build all the time. Many of these models involve exotic new particles andare in that sense not very appealing.In this thesis our main focus is on a particular inflationary model, which we will call nonminimalinflation. In this model a scalar field is coupled to gravity which can effectivelyreduce Newton’s gravitational constant and lead to inflation. The main advantage of thismodel is that in the limit of strong coupling the only scalar particle in the Standard Model,the Higgs boson, is an appropriate candidate for the inflaton, the scalar field that drivesinflation. Since there is no need to introduce any exotic new particles, the beauty of thismodel is evident.The outline of this thesis is the following. In chapter 2 we will introduce some basic cosmology.Then in chapter 3 we outline the basics of cosmological inflation. In chapter 4 we willintroduce the nonminimal inflationary model and we will see that inflation is successful ifthe scalar field is nonminimally coupled to gravity. Furthermore we will see that observationsof the spectrum of density perturbations constrain the quartic self-coupling of theinflaton field in the minimal coupling case to a tiny value, but the constraint can be relaxedby several orders of magnitude if the nonminimal coupling is sufficiently strong. This allowsthe Higgs boson to be the inflaton, proposed by Bezrukov and Shaposhnikov in [4]. We alsointroduce the two-Higgs doublet model in chapter 4, and show that nonminimal inflationworks in this model as well. The extra degrees of freedom and couplings in the two-Higgsdoublet model allow for CP violation and this might lead to baryogenesis.Chapter 5 is all about combining quantum field theory and general relativity. Although itis well known that quantum gravity is a non-renormalizable theory, quantum gravitationaleffects become important only at energies above the reduced Planck scale of M P = 2.4×10 18GeV where the universe was so small that quantum mechanics and gravity become equallyimportant. At lower energies we do not see these effects and we can ’just’ do quantum fieldtheory on a curved background. Quantization of the nonminimally coupled inflaton field inan expanding universe is however not so trivial. We will see that there is no unique vacuumchoice and that in general particle number is not well defined in an expanding universe,which we also mentioned above in the heuristic picture of particle creation. Fortunatelywe will see that we can make a natural vacuum choice during inflation, the Bunch-Daviesvacuum with zero particles. With this specific vacuum we can uniquely quantize the nonminimallycoupled inflaton field and do quantum field theory. We calculate the propagatorfor the scalar inflaton field and eventually extend our results to calculate the propagator forthe two-Higgs doublet model in quasi de Sitter space.In chapter 6 we will calculate the effect of the Higgs boson as the inflaton on the StandardModel fermions. The Higgs boson interacts with the fermions and gives a mass tothe fermions through the Higgs mechanism. As a final application we use the masslessfermion propagator and the propagator for the two-Higgs doublet model in quasi de Sitterspace to calculate the one-loop self-energy for the massless fermions. This one-loop fermionself-energy effectively generates a mass for the massless fermions.