How To Have a Transfer of Information From a Prior to a Present Universe, in Lieu of Information Theory
Journal Title: JOURNAL OF ADVANCES IN MATHEMATICS - Year 2013, Vol 3, Issue 1
Abstract
What happens to the topological entanglement entropy of a system, when it is driven out of its ground state by increasing the temperature? This question is basic, especially if there is an increasing amount of temperature up to the interval of Planck time, in early universe cosmology. The author examines what is possible if a cyclic model is arranged via Penrose cyclic cosmology, which may enable entanglement entropy as a way to transfer essential information from a prior to the present universe. We reference Theorem 6.1.2 of the book by Ellis, Maartens, and MacCallum in order to argue that if there is a non zero initial scale factor, that there is a partial breakdown of the Fundamental Singularity theorem which is due to the Raychaudhuri equation. Afterwards, we review a construction of what could happen if we put in what Ellis, Maartens, and MacCallum call the measured effective cosmological constant and substitute Effective ïŒ ï‚® ïŒ in the Friedman equation. I.e. there are two ways to look at the problem, i.e. after Effective ïŒ ï‚® ïŒ , set Vac ïŒ as equal to zero, and have the leftover ïŒ as scaled to background cosmological temperature, as was postulated by Park (2002) or else haveVac ïŒ as proportional to ïŒVac ~1038GeV2which then would imply using what we call a 5 dimensional contribution to ïŒ as proportional to 5 ~ const/ T D ï¢ ïŒ ï‚» ïŒ . We find that both these models do not work for generating an initial singularity. ïŒ removal as a non zero cosmological constant is most easily dealt with by a Bianchi I universe version of the generalized Friedman equation.
Authors and Affiliations
Andrew Beckwith
Keywords
Related Articles
- EP ID EP651195
- DOI 10.24297/jam.v3i1.6550
- Views 190
- Downloads 0
Stability Analysis For Tumour Growth Model Through The Lambertz W Function
In this paper we investigate the stability of the tumor growth system. An approach of the matrix Lambertz W function for the analytical solution to system of delay differential equations is applied to this prob...
Solution of Abel Integral Equation Using Differential Transform Method
The application of fractional differential transform method, developed for differential equations of fractional order, are extended to derive exact analytical solutions of fractional order Abel integral equations. The fr...
Green's Relations in Rings and Completely Simple Rings
In this paper we prove that which of Green's relations $\mathcal{L,R,H}$ and $\mathcal{D}$ in rings preserve the minimality of quasi-ideal. By this it is possible to show the structure of the classes generated by the abo...
On Rough Covexsity Sets
In this paper, we introduced new concepts for surely and possibly , start shaped (convex ) set. Also for rough start shaped ( rough convex) set .We established the neccessary and sufficient conditions for a set to be sta...
HYERS-ULAM STABILITY OF FIRST ORDER LINEAR DIFFERENCE OPERATORS ON BANACH SPACE
In this work, the Hyers-Ulam stability of first order linear difference operator TP defined by (Tpu)(n) = ∆u(n) - p(n)u(n); is studied on the Banach space X = l∞, where p(n) is a sequence of reals.