A question about the Second Uniqueness Theorem in electrostatics

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Ahmed1029
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in this example in Griffiths' electrodynamics, he says the following :(Figure 3.7 shows
a simple electrostatic configuration, consisting of four conductors with charges
±Q, situated so that the plusses are near the minuses. It all looks very comfort-
able. Now, what happens if we join them in pairs, by tiny wires, as indicated in
Fig. 3.8? Since the positive charges are very near negative charges (which is where
they like to be) you might well guess that nothing will happen—the configuration
looks stable.
Well, that sounds reasonable, but it’s wrong. The configuration in Fig. 3.8 is
impossible. For there are now effectively two conductors, and the total charge
on each is zero. One possible way to distribute zero charge over these conductors is to have no accumulation of charge anywhere, and hence zero field everywhere)

I feel like there are gaps in this explanation, that is, don't know if he implicitly invoked the first uniqueness theorem here
 
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Well he seems to imply that since one way to redistribute zero total charge over a conductor, is to have zero charge everywhere in the conductor, then this is the only way. Is this the first uniqueness theorem btw?
 
BvU said:
Delta2 said:
Well he seems to imply that since one way to redistribute zero total charge over a conductor, is to have zero charge everywhere in the conductor, then this is the only way. Is this the first uniqueness theorem btw?
Well there are infinite ways to distribute charge on conductors, each with its own electric field. What conditions will tell me which of them is the true one? This is the second uniqueness theorem
 
A conductor has no potential difference. The charge may be distributed unevenly, but the surface potential is the same everywhere.

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Ahmed1029 said:
I feel like there are gaps in this explanation, that is, don't know if he implicitly invoked the first uniqueness theorem here
The situation shown in Figure 3.8 is a fictitious assumption and it is likely not a stable state.

If we think of these two conductors as an isolated capacitor, there is no potential difference and no electric field between them since the net charge in the two conductors is zero. That is, there is also no charge accumulation on the surfaces of the two conductors.
 
Hmm, given a conductor (that is given its shape) and a total charge Q, isn't the way that this charge Q going to redistribute itself along the surface of the conductor, unique? And that depends only on the shape of the conductor?
 
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Delta2 said:
Hmm, given a conductor (that is given its shape) and a total charge Q, isn't the way that this charge Q going to redistribute itself along the surface of the conductor, unique? And that depends only on the shape of the conductor?
I think so too, which seems to be what the uniqueness theorem says.
 
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Delta2 said:
Hmm, given a conductor (that is given its shape) and a total charge Q, isn't the way that this charge Q going to redistribute itself along the surface of the conductor, unique? And that depends only on the shape of the conductor?

There is the small matter of an external field (if present)

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In fact, the situation of Figure 3.8 is impossible because it violates the conservation of energy around closed circuit paths and circuit theory.

A07.jpg
 
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