mfb said:
Do you know any particles with negative energy?
No, but I also don't observe particles that are traveling backwards in time.
You can't actually preform a CPT transformation on a particle and observe the resulting particle because that particle would be traveling backwards in time. According to Richard Feynman, a particle traveling backwards in time also has negative energy. So the fact that I don't know any particles with negative energy does not mean that the energy does not flip due to a CPT transformation because a particle with negative energy also travels backwards in time.
This can be understood from the wavefunction "
K = exp(-iEt) ". The wavefunction of a free particle that we observe must disperse throughout space as time passes. So if we flip the time coordinate then we must also flip the energy so that the "-iEt" does not change sign so that the wavefunction disperses as time passes.
My understanding is:
The T operator does the following:
x -> x (Doesn't change)
t -> -t
p -> -p
s -> -s
E -> -E
While he P operator does:
x -> x
t -> t
p -> p
s -> s
E -> E
And the C operator does:
x -> x
t -> t
p -> p
s -> s
E -> E
I'm a little uncertain about what happens to the energy, but it looks as though it flips sign. I'm just having a little trouble finding a text that explicitly does a CPT transformation on a wavefunction, and I'm also having trouble finding a text that mathematically proves that these variables flip as I've described them. I've simply pieced these results together from fragments of various sources.
If I assume that the CPT operators commute with the gamma matrices I then find:
CPT
K(r, t) = - y1 y3 y4 y4 y2
K*(-r, -t)
Where
K(r, t) is the wavefunction, the phase factors are set equal to one, and y1, y2, y3, y4 are the four gamma matrices.
I'm just looking for another's perspective as the sources available to me atm provide inadequate information. There's a lot of information missing here. Such as: how do we prove how each variable changes under a CPT transformation (I think I may know how to do this, I'll probably add this to the thread later)? I think I may know how to derive the P and T transformations as matrices, but atm I'm uncertain about C. I suppose I'll do some more research.