Gravitational Energy


Could the Sun's gravitational potential energy be powering the Sun?
How much potential energy does the Sun have?

Consider a sphere of radius R, made up of mass shells with thickness dr:

For each shell, we have

So each shell has gravitational potential energy

 

Now, let's make the Homeresque assumption that density is constant. Then

 

And we get the following expression for the gravitational potential energy of each shell:

 

If we now integrate over all radii, we get the gravitational potential energy of the whole sphere:

And if we remember that

We can get the gravitational potential energy of a uniform sphere

 
What does this have to do with sunshine?

Notice that as R gets smaller, U gets more negative -- energy is being converted to other forms, like heat. If the Sun can radiate this heat into space, then gravitational contraction might produce the luminosity of the sun.


How much of this gravitational energy can be radiated away?

A side trip: The Virial Theorem: 
 

Really? Yep, for example: circular orbits.

But back to the contracting Sun. The virial theorem says that half the change in gravitational energy stays with the star (it heats the star). The other half is radiated away.

So, let's say that the Sun has been contracting and was originally much, much bigger.
Initially its gravitational potential energy was tiny (why?), so the change in gravitational energy is

 

Now, half of this energy could have been radiated as the Sun shrank:

 
 
That's a lot of energy! How long could it sustain the luminosity of the Sun?
(This is called the Kelvin-Helmholtz timescale)
 
So why is this a problem?