IIA Institutional Repository

Confronting physics of the early universe with cosmological observations

Show simple item record

dc.contributor.author Joby, P. K
dc.date.accessioned 2021-01-31T07:28:02Z
dc.date.available 2021-01-31T07:28:02Z
dc.date.issued 2019-01
dc.identifier.citation Ph.D. Thesis, University of Calicut, Calicut, Kerala en_US
dc.identifier.uri http://hdl.handle.net/2248/7539
dc.description Thesis Supervisor Prof. Pravabati Chingangbam © Indian Institute of Astrophysics en_US
dc.description.abstract The Cosmic Microwave Background (CMB) is the oldest light in the Universe and gives us access to a picture of the Universe when it was only ≈ 300,000 years old. The CMB radiation consists of photons free streaming to us from the surface of last scattering. The existence of such radiation was predicted by Dicke and his group and was experimen- tally detected by Penzias and Wilson in 1965. The CMB gives us a window to study the fundmental laws of physics by observing the Universe on the largest scales. Precise mea- surements of the temperature and polarization fields of the CMB have allowed us to gain valuable physical insights about properties of our Universe. It is found that on length scales larger than ≈ 300 Mpc, our Universe is homogeneous and statistically isotropic. In the first part of our work, we test the fundamental assumption of SI and in the second part, we test the prediction of noncommutative spacetime. The standard ΛCDM cosmological model is the most widely accpeted model of our Universe. The assumption of Statistical Isotropy (SI) is one of the important assumptions of the ΛCDM model and has been found to be consistent with most tests of isotropy using observations. However, there are many models which predict that our Universe is not isotropic and strong limits on the violation of SI can constrain these models. There isn’t any a priori reason for the Universe to be statistically isotropic, and hence it is important to test this fundamental assumption which is one of the pillars of our understanding of the Universe. We have developed techniques to measure the isotropy of random fields on the sphere and in three dimensional flat space, and have used cosmological data to search for deviations from SI. We use Minkowski Tensors (MTs), which carry information regarding the shape of closed curves, as a measure of isotropy. By choosing a suitable threshold to cut off a given field, we get closed curves which form the boundaries of the connected regions and holes. The isotropy and alignment of these closed curves provide information on the SI of the underlying field. MTs were previously defined for closed curves in flat spaces. However, cosmological fields such as the CMB are defined on the sphere and thus the MTs can not be directly applied to these fields. We generalize the definition of MTs to closed curves on the sphere and provide a numerical method to estimate the MTs from pixelated maps. Further, we apply our technique to the CMB temperature data given by the Planck mission and find no signficant deviation from SI. We also apply our method to the beam convolved individual frequency CMB temperature maps given by Planck and find that they are all consistent with SI, except for the 30 GHz maps, which exhibit a mild level of anisotropy. We suspect that an inaccurate estimation of the instrument beam or residual noise at 30 GHz could be the primary reason for this mild discrepancy. We have also used the MTs for three dimensional density fields to demonstrate a method to constrain the effect of Redshift Space Distortion (RSD). RSD is the modification of the apparent shape of galaxy clusters due to the peculiar velocity of the galaxies, which affects the measured redshift of the galaxy, making the Hubble’s redshift-distance relation an inaccurate approximation. We compute the ensemble expectation values of the MTs for a 3D isotropic Gaussian field and develop a numerical and a semi-analytic method to estimate the MTs from a discretely sampled field. We apply our method to estimate the MTs from the isotropic fields and the anisotropic fields obtained by applying a linear RSD operator to the isotropic feilds. We find that RSD leads to a shift in the amplitude of the elements of the MTs and show that this shift can be used to obtain constraints on the linear RSD parameter. In the last part of our work, we have tested spacetime noncommutativity, which is an essential prediction of string theory. Based on evidence from observations, it is believed that the early Universe went through a phase of accelerated expansion, known as Inflation. During this phase, very small regions of space were blown up to cosmological sizes in a very short amount of time. This allows us to search for spacetime noncommutativity, which is an effect relevant at the extremely small scales, by looking at cosmological fields such as the CMB. If our spacetime is noncommutative, then the form of the CMB angular power spectrum is modified and this effect can be used to constrain the energy scale of spacetime noncommutativity. First we estimate the effect of noncommutative spacetime on the CMB angular power spectrum using the publicly available package, CAMB, and show that Planck data is best suited to constrain the spacetime noncommutativity parameter. We then perform a Bayesian analysis of the Planck 2013 CMB temperature data and obtain a lower bound of ≈ 20 TeV on the energy scale of spacetime noncommutativity. Our results, improve upon those of previous works by a factor of two. Finally we summarize all the research work that was carried out as part of this thesis. We also discuss prospects for further research in the context of future CMB experiments having higher resolutions than Planck and the application of MTs for probing the SI of the CMB polarization fields as well as the CMB foregrounds. en_US
dc.language.iso en en_US
dc.publisher Indian Institute of Astrophysics en_US
dc.title Confronting physics of the early universe with cosmological observations en_US
dc.type Thesis en_US


Files in this item

This item appears in the following Collection(s)

Show simple item record

Search DSpace


Browse

My Account