Author:
(1) Shivam Gola, The Institute of Mathematical Sciences, Chennai.
Author:
(1) Shivam Gola, The Institute of Mathematical Sciences, Chennai.
Table of Links
2 Dark matter through ALP portal and 2.1 Introduction
2.3 Existing constraints on ALP parameter space
3 A two component dark matter model in a generic π(1)π extension of SM and 3.1 Introduction
3.3 Theoretical and experimental constraints
3.4 Phenomenology of dark matter
3.5 Relic density dependence on π(1)π charge π₯π»
4 A pseudo-scalar dark matter case in π(1)π extension of SM and 4.1 Introduction
4.3 Theoretical and experimental constraints
Appendices
D Feynman diagrams in two-component DM model
B Friedmann equations
Our universe at a large scale can be described well if we assume isotropy and homogeneity of space. The Friedmann-Lemaitre-Robertson-Walker (FLRW) metric hold these assumptions, which is given by,
here p and π are the pressure and energy density of the fluid respectively whereas π’π is the velocity vector in comoving coordinates. One can now derive the Friedmann equations as
Using the above two equations, one can derive the density evolution equation,
where H is the Hubble parameter.
This paper is available on arxiv under CC BY 4.0 DEED license.
