The Gott-Kaiser-Stebbins (GKS) Effect in an Accelerated Expanding Universe S. Y. Rokni, H. Razmi, and M. R. Bordbar Department of Physics, University of Qom, 7666, Qom, I. R. Iran. Email(s): razmi@qom.ac.ir & razmiha@hotmail.com; s.y.rokni@gmail.com; mbordbar@qom.ac.ir Abstract We want to find the cosmological constant influence on cosmic microwave background (CMB) temperature due to moving linear cosmic strings. Considering the space-time metric of a linear cosmic string in an accelerated expanding universe, the Gott-Kaiser-Stebbins (GKS) effect, as an important mechanism in producing temperature discontinuity in the CMB, is considered and its modification due to the effect of the cosmological constant is calculated. The result shows that a positive cosmological constant (i.e. the presence of cosmic strings in an accelerated expanding universe) weakens the discontinuity in temperature that more strong relution is needed to detect the corresponding influences on the CMB power spectrum and anitropy. Keywords: Cosmic Strings; Cosmological Constant; Cosmic Microwave Background (CMB) PACS:.7.+d; 98.8.Cq; 98.8.Es
Introduction Topological defects have formed during symmetry breaking phase transitions in the early universe []. Among different already known defects, scientists have paid most attention to cosmic strings [-]. These objects, in addition to their importance in cosmology, have been recently under consideration because of their similarities to fundamental strings []. Although one of the first motivations of studying cosmic strings corresponded to density fluctuations due to loop cosmic strings in the early universe as the necessary seeds for the large scale structure we see today [], the data from COBE and BOOMERANG have shown that cosmic strings cannot be considered as the main candidate for the early density fluctuations in our universe [5]. Indeed, precise measurements in cosmic microwave power spectrum have shown that the most possible contribution of cosmic strings in the early fluctuations can be at most up to %; this value constrains the mass density of strings ( G ) up to the limit of Planck al confirm this constraint ( G 7 ) [7]. ~ 7 [6]. The recent results from There are me observational effects for detecting cosmic strings. Loop cosmic strings may be observed via their gravitational radiation [8]; they may be considered as the origin of highenergy cosmic urces [9]. The long (linear) cosmic strings can have gravitational lensing effects [-]; they may have me effects on CMB [-]. There are possible mechanisms for the contribution of linear cosmic strings in producing temperature discontinuity in CMB [5]; among these, the Gott Kaiser Stebbins (GKS) effect is one of the most important ones []. According to this effect, the light ray reaching an observer in front of a linear cosmic string is blue shifted while the ray behind the string remains unchanged;, the observer sees a small temperature discontinuity due to an angular separation at the order of the string deficit angle. Although for a
single cosmic string, it is very hard to observe such an effect, for a network of strings, at small angular scales (high multiples), the GKS effect can have a dominant contribution in angular power spectrum []. Considering today observational evidence for an accelerated expanding universe [6], it is natural to study possible modifications of different already known gravitational and cosmological phenomena under the influence of the positive cosmological term which is usually considered as the driving force for this acceleration. Here, we want to find the cosmological constant influence on the CMB temperature discontinuity due to cosmic strings (the modified GKS effect). A short review of the GKS effect [7] Considering the line element of a linear long cosmic string of mass density ( G ) [] ds dt dz d 8G d () with the deficit angle g d 8 g d G, for two particles moving with the same velocity v relative to the string, the observed temperature T obs in terms of the background temperature T is T obs ( ) T ( u ) ( ucos ) (),
where u vsin and cos ( cos ) for when the urce of emission of the observed photons and the observer are moving away from (toward) each other. The corresponding temperature discontinuity is simply found as: θ Τ Τobs Τ u u cosθ Τ Τ cos( θ) O(u ) (); Or: Τ Τ 8 ( v) vg (), where (v) is the Lorentz relativistic gamma factor which is about ( ( v) ) for when v c. The relation () is known as the GKS effect. Cosmological constant influence on the GKS effect Using the following already known line element around a linear long cosmic string under the influence of a positive cosmological constant [8] ds cos ( dt ( G) dz ) d cos tan d (5), the deficit angle, the relative velocity, and the temperature discontinuity are modified as:
( G) cos sin 8 G G (6), u ( v)( vsin sl vsin ) ( v) v(8g sl 8 8 ) (7), and Τ Τ 8 ( v) vg( 6 G ( sl )) (8), where sl and respectively. are the distances from the string to the last scattering surface and the observer The relation (8) can be considered as the modified GKS effect. Conclusion Although has a very small value ( ~ 5 m ), for cosmic scales values of sl and 5 ( R H ~ m ) and because of small value of G ( 7 ), the modification term ( sl ) in (8) not only isn t negligible but al may be comparable to. This 6 G means the modification of the GKS effect can weaken the standard GKS effect considerably. Among other things, an important consideration is that one needs more strong relution to detect the discontinuity in the CMB temperature due to cosmic strings. Therefore, considering current observational apparatuses, it may take a long time to be able to detect cosmic strings. As we know, a cosmic string alone cannot affect on the CMB; but, it is a set of these topological 5
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