General Relativity Homework 5

Chasse_neige

Problem 1

Please calculate the connection and the Ricci tensor for the metric

d^{} τ^{2} = B (t, r) {d^{} t}^{2} - A (t, r) {d^{} r}^{2} - r^{2} d^{} Ω^{2}

For this time-relevant metric

g_{μ ν} = (\begin{matrix} - B, A, r^{2}, r^{2} \sin^{2} θ \end{matrix})

First we derive the Christoffel symbol

Γ^{λ}_{μ ν} = g^{λ η} (g_{η μ, ν} + g_{η ν, μ} - g_{μ ν, η})

Calculate the components, we can find all nonzero terms are

\begin{matrix} Γ^{t}_{t r} = Γ^{t}_{r t} = \frac{B^{'}}{2 B} \\ Γ^{r}_{t t} = \frac{B^{'}}{2 A} \\ Γ^{r}_{r r} = \frac{A^{'}}{2 A} \\ Γ^{t}_{t t} = \frac{\dot{B}}{2 B} \\ Γ^{t}_{r r} = \frac{\dot{A}}{2 B} \end{matrix}

\begin{matrix} Γ^{r}_{t r} = Γ^{r}_{r t} = \frac{\dot{A}}{2 A} \\ Γ^{r}_{θ θ} = - \frac{r}{A} \\ Γ^{r}_{ϕ ϕ} = - \frac{r \sin^{2} θ}{A} \\ Γ^{θ}_{r θ} = Γ^{θ}_{θ r} = \frac{1}{r} \\ Γ^{θ}_{ϕ ϕ} = - \sin θ \cos θ \\ Γ^{ϕ}_{r ϕ} = Γ^{ϕ}_{ϕ r} = \frac{1}{r} \\ Γ^{ϕ}_{θ ϕ} = Γ^{ϕ}_{ϕ θ} = \cot θ \end{matrix}

where prime means derivative of the space direction while dot means derivative of the time direction.

Calculate Ricci tensors using the definition

\begin{matrix} R_{μ κ} = g^{λ ν} R_{λ μ ν κ} = R^{λ}_{μ λ κ} \\ = Γ^{λ}_{μ λ, κ} - Γ^{λ}_{μ κ, λ} + Γ^{η}_{μ λ} Γ^{λ}_{η κ} - Γ^{η}_{μ κ} Γ^{λ}_{η λ} \end{matrix}

And we can get all nonzero components

\begin{matrix} R_{t t} = \frac{\ddot{A}}{2 A} - \frac{{\dot{A}}^{2}}{4 A^{2}} - \frac{\dot{A} \dot{B}}{4 A B} - \frac{B^{″}}{2 A} + \frac{B^{'}}{4 A} (\frac{A^{'}}{A} + \frac{B^{'}}{B}) - \frac{B^{'}}{r A} \\ R_{t r} = - \frac{\dot{A}}{r A} \\ R_{r r} = - \frac{\ddot{A}}{2 B} + \frac{\dot{A}}{4 B} (\frac{\dot{A}}{A} + \frac{\dot{B}}{B}) + \frac{B^{″}}{2 B} - \frac{B^{'}}{4 B} (\frac{A^{'}}{A} + \frac{B^{'}}{B}) - \frac{A^{'}}{r A} \\ R_{θ θ} = - 1 + \frac{1}{A} - \frac{r}{2 A} (\frac{A^{'}}{A} - \frac{B^{'}}{B}) \\ R_{ϕ ϕ} = \sin^{2} θ R_{θ θ} \end{matrix}

Please derive the energy-momentum tensor for electromagnetic field.

We use the variation of the action to get the form for the energy-momentum tensor

T^{μ ν} = \frac{2}{\sqrt{- g}} \frac{δ S}{δ g_{μ ν}}

Plugging in the action of the EM field

S = - \frac{1}{4} \int d^{4} x \sqrt{- g} F^{μ ν} F_{μ ν}

and do the variation

\begin{matrix} δ S = - \frac{1}{4} \int d^{4} x F_{α β} F_{μ ν} δ (\sqrt{- g} g^{μ α} g^{ν β}) \\ = - \frac{1}{4} \int d^{4} x F_{α β} F_{μ ν} (g^{μ α} g^{ν β} \cdot \frac{1}{2} \sqrt{- g} g^{ρ σ} δ g_{ρ σ} - \sqrt{- g} g^{ν β} g^{σ α} g^{μ ρ} δ g_{ρ σ} - \sqrt{- g} g^{μ α} g^{ν ρ} g^{σ β} δ g_{ρ σ}) \end{matrix}

So the energy-momentum tensor density is

\begin{matrix} T^{ρ σ} = \frac{2}{\sqrt{- g}} \cdot (- \frac{1}{4} F_{α β} F_{μ ν} (g^{μ α} g^{ν β} \cdot \frac{1}{2} \sqrt{- g} g g^{ρ σ} - \sqrt{- g} g^{ν β} g^{σ α} g^{μ ρ} - \sqrt{- g} g^{μ α} g^{ν ρ} g^{σ β}) \\ = F^{ρ β} F^{σ}_{β} - \frac{1}{4} g^{ρ σ} F^{μ ν} F_{μ ν} \end{matrix}