T1: SR and Classical Field Theory

Question 1

Define pseudo-orthogonality

Answer 1

Λ^T η Λ = η

i.e. Preserving the metric under lorentz transform

Question 2

Define the Lorentz group

Answer 2

The set of matrices which obey the pseudo-orthogonality condition.

These are O(1,3) extending orthogonal group to 1-temporal, 3-spacial component vectors.

Question 3

Define continuously connected to the identity for a matrix.

Answer 3

A matrix can be expressed as:
Λ(ω) = exp(ωM)

at ω = 0, Λ(0) = I

Question 4

What expression governs the Lorentz generators. How do we find it?

Answer 4

ηM + M^t η = 0

By expanding the continuously connected expression and putting in the pseudo-orthogonality contraint.

Question 5

What two Lorentz transforms do we get from detΛ =-1

Answer 5

Parity → flip the spacial coords
Time-reversal → flip the time coord

Question 6

Define the Poincare group

Answer 6

The set of Lorentz, and space-time translations.

x → x’ = Λx - a

Question 7

Define the generators of the Poincare group (coordinates)

Answer 7

M^σρ - Lorentz
P_µ - space-time

Question 8

Define scalar field

Answer 8

A field that is invariant under Poincare transformation

φ’(x’) = φ(x)

Question 9

Define locality for a Lagrangian

Answer 9

The Lagrangian cannot contain terms which couple fields at different spacial points.

Question 10

What does locality impart on the Lagrangian in field theory

Answer 10

We can pass the spacial integral out the front of the Lagrangian since locality says we can only act at a single point.

Question 11

State the boundary conditions for classical field theory

Answer 11

δϕ_a = 0 at initial and final t and as |x| tends to ∞

Question 12

State the EL equation for fields

Answer 12

∂L/∂ϕ + ∂_μ [∂L/∂(∂_μϕ)]

Question 13

Define ∂μ with upper and lower indices

Answer 13

∂_μ = (∂/∂t, ∇)

∂^μ = (-∂/∂t, ∇)

Question 14

State Noeter’s theorem

Answer 14

To each continuous symmetry of action there is a corresponding conservation law/time-independent quantity.

Question 15

Define the continuous transformation of scalar field ϕ and define all terms

Answer 15

ϕ’ = ϕ + αΔϕ + ho

Where Δ denotes the generator of the continuous transformation

Question 16

Define the characteristic conserved current and charge

Answer 16

∂_μ J^μ = 0

Q = INT d^3x J0

Question 17

Give the formula for conserved current J^μ

and define terms

Answer 17

J^μ = -K^μ + SUM_a ∂L/∂(∂_μ ϕa)

Question 18

Define the subgroup SO(1,3)

Answer 18

The subgroup of O(1,3) with det=1 which are continuously connected to the identity. These represent ‘proper Lorentz transformations’

Question 19

State the Lorentz generator for a field

Answer 19

L^ρσ = x^σ ∂/∂x_ρ - x^ρ ∂/∂x_σ

Question 20

State the translation generator for a field

Answer 20

P_μ = ∂/∂x^μ

Question 21

In the continuous transformation, define
δϕ = αΔϕ

Answer 21

The term linear in α where Δ denotes the generator of the transformation.

Question 22

What is the infinitesimal transformation of the action?

Answer 22

δs = 0

Since we require the continuous transformation to be a symmetry of the action

Question 23

What does δs = 0 imply?

Answer 23

That the space-time integral of δL = 0

I.e. δL = ∂_μ (α K^μ)