In quantum field theory, a branch of theoretical physics, crossing is the property of scattering amplitudes that allows antiparticles to be interpreted as particles going backwards in time.
Crossing states that the same formula that determines the S-matrix elements and scattering amplitudes for particle
A
X
B
Y
\scriptstyleA+\bar{B
Y
\scriptstyle\bar{B
\scriptstyleX
\scriptstyleY+\bar{A
The formal way to state this property is that the antiparticle scattering amplitudes are the analytic continuation of particle scattering amplitudes to negative energies. The interpretation of this statement is that the antiparticle is in every way a particle going backwards in time.
Murray Gell-Mann and Marvin Leonard Goldberger introduced crossing symmetry in 1954.[1] Crossing had already been implicit in the work of Richard Feynman, but came to its own in the 1950s and 1960s as part of the analytic S-matrix program.
Consider an amplitude
l{M}(\phi(p)+... → ...)
\phi(p)
\bar{\phi}(-p)
\phi(p)
l{M}(\phi(p)+... → ...)=l{M}(... → ...+\bar{\phi}(-p))
In the bosonic case, the idea behind crossing symmetry can be understood intuitively using Feynman diagrams. Consider any process involving an incoming particle with momentum p. For the particle to give a measurable contribution to the amplitude, it has to interact with a number of different particles with momenta
q1,q2,...,qn
n | |
\sum | |
k=1 |
qk=p
n | |
\sum | |
k=1 |
qk=-p
In fermionic case, one can apply the same argument but now the relative phase convention for the external spinors must be taken into account.
For example, the annihilation of an electron with a positron into two photons is related to an elastic scattering of an electron with a photon (Compton scattering) by crossing symmetry. This relation allows to calculate the scattering amplitude of one process from the amplitude for the other process if negative values of energy of some particles are substituted.
. David Griffiths (physicist) . An Introduction to Elementary Particles . 1st . John Wiley & Sons . 1987 . 0-471-60386-4 . 21 .