Gravitation

Question 1

What does it mean if a line element is proportional to the minkowski line element?

Answer 1

Angles are preserved
*another word for this I can’t remember

Question 2

How can we show that an object is a tensor?

Answer 2

Show that it transforms like a tensor (i.e: with an appropriate jacobian matrix for each index)

*inverse jacobian matrix for lowered indices

Question 3

How does a metric tensor transform?

What is the definition of the jacobian matrix?

Answer 3

Check wall notes (not written out explicitly).
Also make sure to get the definition of the jacobian matrix.

Question 4

What is the difference between an ordinary derivative and a covariant derivative?

What about an absolute derivative (along a curve)?

Answer 4

Mathematical definition is given in the formula sheet.

A covariant derivative tells us about the genuine change in a function over a manifold, including effects from the changing basis vectors with a term in the affine connection.

Absolute derivative parametrises change along a curve - then use chain rule with a covariant derivative.

Question 5

What does the affine connection describe?

Answer 5

Describes how basis vectors vary infinitesimally over the manifold.
*symmetric in bottom two indices
*not a tensor (doesn’t transform like a tensor)

Question 6

What is the equation of an affinely-parametrised affine geodesic?
How can it be derived?

Answer 6

Check wall notes
Derived via transforming N2: a = 0 into curved space from flat space.

Question 7

How can we find the connection by comparing formulae for affine and metric connections.

Answer 7

Apply E-L equations to the effective lagrangian.
L_eff given in Wall notes.
*this gives the minima of the line element between two points: METRIC connection.

Compare this to the equation of an affinely-parametrised affine geodesic to deduce the components of the connection.

*In a tortion-free manifold, metric and affine connections are identical.

Question 8

How can we lower / raise indices?

Answer 8

Apply the metric / inverse metric.

Question 9

What is the connection for minkowski (flat) space?

Answer 9

0

Question 10

What is the significance of the effective Lagrangian where the geodesic is parametrised by proper time?

Answer 10

Constant along the geodesic, equal to either:

+1 : time-like geodesic (trajectory of massive particle)
0 : light-like geodesic (trajectory of light)
-1 : space-like geodesic (unphysical)

L_eff can be shown to be constant by differentiating w.r.t. the geodesic parameter, and applying the equation of an affinely-parametrised affine geodesic.
*also must use the form of the christoffel symbols

Question 11

What is the Ricci identity?
(What does the Riemann Tensor represent?)

Answer 11

The commutator of covariant derivatives acting on a vector is equal to the riemann tensor acting on the vector [check wall notes].

The riemann tensor represents the difference between parallel transporting along different paths to the same destination.

Question 12

What is the relationship between the Ricci tensor and the Riemann tensor?

What about the Ricci scalar?

Answer 12

The Ricci tensor (2-tensor) is the only non-zero contraction of the Riemann tensor (1st and 3rd indices).
In 2D and 3D the Ricci tensor completely describes the Riemann tensor.

The Ricci scalar is the only non-zero contraction of the Ricci tensor (trace). Referred to sometimes as the curvature.
In 2D the Ricci scalar completely describes the Riemann tensor.

Question 13

What are the symmetries of the Riemann tensor?

Answer 13

Considering Riemann tensor with all indices lowered:

Antisymmetric in 1 <=> 2 or 3 <=> 4.
Symmetric in 1,2 <=> 3,4.
Cyclic symmetry in 2,3,4 (sum of all three cycles = 0)

Question 14

What is the definition of the Einstein tensor and what are its key properties?

Answer 14

Check wall notes!
Ricci tensor - 1/2 * metric tensor * Ricci scalar

The Einstein tensor summarises the curvature of a manifold in a covariantly-conserved way. (i.e: covariant derivative of the tensor = 0)

Question 15

What is a general expression for the stress-energy tensor?
-for a dust
-for a fluid

Answer 15

Dust: co-moving energy density / c^2 * two 4-velocities with different indices.

Fluid: Same as dust but density + pressure instead of density. Also extra term: - Pressure * metric tensor

Question 16

How do we know that the stress-energy tensor is covariantly conserved?

Answer 16

Covariant conservation of the stress-energy tensor is equivalent to the continuity equation (energy conservation).

+ energy flux <=> momentum density
momentum density = -d/dx stress tensor

Question 17

What is Einstein’s equation?
How do we get to the trace-reversed version?

Answer 17

Einstein tensor = K * Stress-energy tensor

Contract with inverse metric to get to trace-reversed version.

K = 8 pi G_N / c^4 recovers Newtonian gravity in the non-relativistic limit.

Question 18

How can we parametrise the weak gravity limit?

Answer 18

Metric equal to minkowski metric + h
where h is a metric with determinant much less than 1
( - h for the inverse metric)
Expand in h

The connection can be written simply in terms of h.

Question 19

What is the source term for gravitational waves?

Answer 19

The second time derivative of the moment of inertia (second moment of mass).
*i.e: fast acceleration with large oscillation in quadrupole moment produces large amplitude gravitational waves.

Question 20

What steps do we take to reach the schwarzschild solution?

Answer 20

Use general spherically-symmetric line element.
ds^2 = e^nu dt^2 - e^lambda dr^2 - r^2(dtheta^2 + sin^2(theta)dphi^2)
* nu and lambda dependent on r and t generally.

Find the connection using L_eff.
Construct the Riemann tensor -> Ricci tensor and scalar

Apply the free space Einstein’s equation.
Use gauge freedom to remove final free parameter (change t coordinate).

Question 21

What is the schwarszchild radius?

Answer 21

2GM / c^2

Question 22

What is Birkhoff’s theorem?

Answer 22

Spherically symmetric vacuum solutions can always be made static by a suitable choice of variables.
* so spherically symmetric mass distributions cannot emit gravitational waves.

Question 23

What are the 4 classical tests of GR in the solar system?

Answer 23

Gravitational redshift
Light deflection
Perihelion precession
Light delay

Question 24

At what rate does an observer at fixed coordinates in a gravitational well measure time passing?
How is this related to the frequency of light they emit/detect?

Answer 24

Consider schwarzschild line element for fixed spatial coordinates.
In this case the line element is equal to proper time.

dt / dtau gives the rate at which time is measured to pass. This is directly proportional to the frequency of light that is measured/emitted.

Consider the ratio of these rates for different positions in the well. For a distant observer, consider one of the positions as infinitely far from the source.

Question 25

Geodesics for schwarzschild solution (given in formula sheet).
-what does l refer to?
-which is the non-classical term?
-which term should be considered the effective potential?

Answer 25

l is the angular momentum (per unit mass):
r^2 phi(dot)

The non-classical part is the term in l^2 r_s / r^2

The term in square brackets is the effective potential. The other term on the RHS is a constant - total energy.

Question 26

What is the requirement for a stable circular orbit?

Answer 26

Energy = Potential at that radius.
Potential’ = 0
Potential’’ > 0 (otherwise unstable)

i.e: the bottom of a trough in V_eff

Question 27

What property do particles coming from infinity have? (orbital dynamics)

Answer 27

E > 0

Question 28

How can we consider the orbital dynamics of a photon?

Answer 28

Set K = 0 (null geodesic (light-like))
Set epsilon = 1 {it is really more complicated than this, we must reparametrise as tau is no longer a good choice of coordinate (->inf for massless). This reparametrisation is equivalent to setting epsilon = 1}

Question 29

What are some interesting properties of the orbital dynamics of a photon?

Answer 29

Orbit is independent of photon energy.
V_eff shape is independent of angular momentum, just the normalisation.

Question 30

What does V_eff look like in the schwarzschild solution, for:
-classical?
-massive particles?
-massless particles?

Answer 30

Check notes

Question 31

What is perihelion precession?

Answer 31

The GR correction to V_eff makes it clear that elliptical orbits do not exist –> they precess.

Question 32

What factors cause light delay?

Answer 32

Light delay is the fact that light takes longer to reach us if it passes near a gravitational source, this is due to:
-curved path
-gravitational redshift (usually dominant)

Question 33

What is the impact parameter?
What about for light?

Answer 33

The distance between the trajectory (extrapolated from infinity) and the source.

b = l / r{dot} = l / sqrt(2 E_m)

for light b = l (natural units)

*l in this case is angular momentum per unit mass r^2 theta{dot}

Question 34

What is the difference between homogeneity and isotropy?

Answer 34

Homogeneous: universe is the same at all distance scales

Isotropic: universe is the same in all directions

Question 35

What is Schur’s theorem?

Answer 35

Maximally symmetric spaces (homogeneous+isotropic) are manifolds of constant curvature. This leads to the FLRW metric.

• This leads to a simplified form of the reimann tensor

Question 36

What is the meaning of “a” in the FLRW metric?
What r coordinate is used in the form of the metric given in the formula sheet?

Answer 36

a is the “scalefactor of the universe” = sqrt(current curvature / future curvature)
a = 1 currently

Applying 1/a to distance measure r gives a co-moving coordinate, such that galaxies are not moving away from us in this coordinate.

co-moving coordinate = r/a

Question 37

How does the curvature of the universe evolve over time?

Answer 37

Never changes sign
K=0 stays constant but is in unstable equilibrium.

Question 38

What is conformal time?

Answer 38

dt = a * d(conformal time)

Using the conformal time gives a FLRW metric that is conformally equivalent to minkowski space given current flat universe.

Question 39

What is the definition of the hubble parameter H?

Answer 39

a{dot} / a

Question 40

What is the definition of the deceleration parameter q?

Answer 40

-a{doubledot} a / a{dot}^2

positive q means deceleration of the universe

Question 41

What is the current measured value of the hubble constant and the deceleration parameter?

Answer 41

H_0 ~ 70 km per s per Megaparsec
q_0 ~ -0.5 : acceleration

Question 42

How do we derive the Friedmann equations?

Answer 42

Obtain the Ricci tensor from the FLRW metric.
Assume cosmic matter-energy is a perfect fluid.
-> get a rho, -P, -P, -P form of the stress-energy tensor (in the co-moving frame).

Question 43

What is missing from the Friedmann equations given in the formula sheet?

Answer 43

A term -1/3 * the cosmological constant.

Question 44

What is the “third” Friedmann equation?

Answer 44

Energy conservation / fluid flow equation
(equivalent to the first law of thermodynamics: expansion <=> work)
Comes from covariant conservation of the stress-energy tensor.

*check wall notes

Question 45

What motivates the treatment of the cosmological constant as dark energy?

Answer 45

The cosmological constant terms in the Friedmann equations can be absorbed into energy density and pressure with a mapping.
This mapping leads to the idea of dark energy with equation of state: energy density = -pressure

Question 46

How can we get the equations of state for matter, radiation and dark energy?

Answer 46

Use the the fluid flow equation to get an equation in da / drho

Matter: 0 pressure
Radiation: energy density = 3P
Dark energy: energy density = -P

Question 47

What does k_0 refer to in the Friedmann equations?

Answer 47

The current curvature of the universe

Question 48

How is the critical density defined?

Answer 48

The density which gives a flat universe

= (3 / 8 pi G) * H_0 ^2

Question 49

How can we get an equation to study the evolution of the curvature of the universe?

Answer 49

Consider the Friedmann equations where we define Omega = the sum of Omega for matter, radiation, and dark energy

=> Omega - 1 = K_0 / a{dot}^2

Question 50

How do we define Omega when considering the Friedmann equations?

Answer 50

The density of some cosmic substance / the critical density.

We can define a similar notion for curvature:
- K_0 / H_0 ^2

Question 51

What issues in cosmology motivate the theory of cosmic inflation?

Answer 51

The horizon problem
-we know from the CMB that there are regions of space that should never have been in causal contact and so should not be in thermal equilibrium

The flatness problem
-the current universe is ~ flat, a point of unstable equilibrium. The early universe must have been flat to an extremely precise degree.

Question 52

What is cosmic inflation?

Answer 52

A period of vacuum energy dominance in the very early universe leading to extreme growth. This kind of inflation drives curvature to 0 exponentially. Cosmic inflation also solves the horizon problem.

Question 53

What approximation should we make to study the evolution of the universe?

Answer 53

As radiation forms a relatively small proportion of the energy in the universe, ignore this contribution.

We can then get equations for the deceleration parameter and the scalefactor of the universe in terms of densities of matter and dark energy.

Question 54

What are the equations governing the fate of the universe?

Answer 54

q_0 = 1/2 (Omega_m_0 - 2 Omega_de_0)

Check other one on wall notes

*these can be derived from the friedmann equations by neglecting radiation.

Question 55

What is the weak equivalence principle?

Answer 55

A “freely-falling frame” must be indistinguishable from an inertial frame.

Question 56

What is the strong equivalence principle?

Answer 56

A rest frame in a gravitational field g is indistinguishable from a frame accelerating with acceleration g. (Locally)

Question 57

What is the relationship between the line element and the metric tensor?

Answer 57

Check wall notes

Question 58

What is the definition of the coordinate transformation matrix?

Answer 58

Check wall notes

Question 59

How can we use the form of the covariant derivative given in the formula sheet to express the covariant derivative of tensors with raised indices?

Answer 59

For each raised indice use a plus instead of minus. Also the indices of the connection will need to be changed.

Question 60

What is the defining equation of an affinely-parametrised affine geodesic?

Answer 60

Check wall notes
(tangent vector form as well as connection form)

Question 61

What does rindler space look like?

Answer 61

Check notes

Question 62

When we are investigating the dynamics of light rays in schwarzschild space, what should we use as an affine parameter?

Answer 62

Use u = epsilon tau

(tau –> 0 as m –> 0)

• any linear function of an affine parameter is also an affine parameter

Question 63

What does epsilon refer to in the equation for geodesics of the schwarzschild solution?

Answer 63

Epsilon is the constant obtained by considering the E-L equations for time given by the schwarzschild metric.

epsilon = (1 - r_s / r) dt/dtau

Question 64

What does t refer to in the FLRW metric?

Answer 64

Cosmic time
(time in the cosmic frame - in which the CMB is stationary)

Question 65

What is an isotropic tensor?

Answer 65

An isotropic tensor has the same form in all bases.
Scalars are always isotropic.
Vectors are never isotropic.
Rank-2 isotropic tensors = constant * delta
Rank-3 = constant * levi-cevita

Question 66

What does it mean for something to be covariantly conserved?

Answer 66

Covariant derivative w.r.t. one of the indices of the object = 0

*equivalent of a vector conservation law

Question 67

What is the covariant derivative of the metric (no common indices)?

Answer 67

0

Question 68

What is the inverse metric acting on the metric (1 common index)?

Answer 68

Dirac delta

->trace of this gives d, the dimensionality

Question 69

How can we get the Ricci tensor from the form of the Riemann tensor with all indices lowered?

Answer 69

Apply the metric appropriately
The same should be done to find the Ricci scalar.

Question 70

What does w refer to?

Answer 70

The equation of state P / rho