Calculating the Variation of R(t) and the Age of the Universe

Our Goal: take R(t) and physics (gravity) to calculate how R(t) varies with time. Then plug back into (cdt)2 = R(t)2dr2/(1-kr2) Get t versus R(t) and derive age of universe (t0) versus W0 and H0 Simple estimate of t0 = 1/H0 H0 = 50-70 km/sec-Mpc => 1/H0 has units of time = 19-14 billion years Mpc = megaparsec = 3 million lt-years = 3 x 1024 cm

Want to show where the following come from: • H0 = expansion rate for universe today • rc = critical density = 3H0/8pG • W0 = r0/rc <=> k relation • q0 = de-acceleration parameter • L = cosmological constant <=> pressure and why positive L (and WL causes an accelerating universe) 2

The distance light travels on the surface is greatly affected by the value of k. k = -1 open k = 0 flat k = 1 closed And, R(to)r for the observed object translates into a distance to the object today, and our goal is to figure out how to calculate R and r

For the related figures, see page 217 (shows geometry) , 283 (shows R changing in different ways), and 299 (shows R for k = -1, 0, +1)

For the math we will do, assume that there is no dark energy (cosmological constant) until further notice

Predicting the Future from the past: A primary goal of the cosmologist is to tell us what will happen to R as function of time, based on fitting models to the data

Predicting the Future from the past: • Measure R(t) by looking back in time • Measure how the geometry of the universe affects our measure of distance or apparent size. R(t0)/R(t) = 1+ z t = the age of the universe when light left the object t0 = age of the universe today by definition cf. pages 374-376

Predicting the Future from the past: Also, R(t0)/R(t) = lob/lem =lambda(observed)/lambda(emitted). the universe is expanding R(t0) is always greater than R(t) (for us today) lambda(observed) must always be > lambda (emitted) longer lambda (now this means wavelength of light) means redder, we call this a redshift!

How to get R(t) We need to relate R(t) to some “force” The Universe affects itself. It has self gravity Self-gravity will slow down expansion

Equate potential energy (GMm/R) with kinetic energy [(1/2) mv2] M is the self-gravitating mass of the universe R is the scale factor of the universe. M = density(r) x volume[(4/3) x p R3)]

How to get R(t), part 1, cont. density = r ; volume = 4pR3 => M = r4pR3 . v = R Aside: A subscript 0 means “today” (R(t0) = R0 ) to keep from writing R(t) or R(t0). . => (1/2)mv2 = (1/2)mR2 and GMm/R = Gr4pR3m/3R = Gr4pmR2/3

How to get R(t), part 1, cont. KE > PE, we get “escape” KE < PE, the universe will collapse on itself. (1/2)mv2 = GMm/R, KE = PE The little m’s cancel out. Put an energy term on the KE side to allow us to describe “to escape or not to escape”

. R2 + kc2 = G8prR2/3 R2 = G8prR2/3, now adding in the extra term . Yes! The k we used for our geometry and c is the speed of light. . R02 + kc2 = G8pr0R02 /3; today

The KE, kc2, and PE connection . 2 2 R0 = G8pr0R0/3- kc2 So, k = -1 means the KE is more than the PE, and we get escape, and vice versa

Critical density = when pull of gravity (PE) just balances the BB push (KE), i.e. the density when k = 0 !

How to get R(t), part 1, cont. So, rc as it is called is when k = 0 and we have rc = 3R0/(8pGR0), but R0/R0 = H0 ! (another old friend) = the expansion rate of the universe today . . 2 2 2 2 Or, rc = 3H0/8pG 2 2 Or, 1 +kc2/(H0 R0 )= r0/rc = ? W0 2 2 Or kc2/(H0R0) = W0 -1 We see the relationship between k and W0 and the fate of the universe!

Aside on H0: • How to use to get distances (good to 1+z of about 1.2) • D = v/H0 where v = velocity of recession • use km/sec along with H0 = 50 km/sec-Mpc for example • D = v/H0 is the “Hubble Relation” • Observation of this told us Universe is expanding • For z << 1, z = v/c (approximately) z <=> v

Calculating the Variation of R(t) and the Age of the Universe