Difference between revisions of "Relativistic Differential Cross-section"
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− | <center><math>|p_{12}^2| =\frac{E_{1}E_{2}-(\vec p_1 \vec p_2)-m^4}{m^2}</math></center> | + | <center><math>\therefore |p_{12}^2| =\frac{E_{1}E_{2}-(\vec p_1 \vec p_2)-m^4}{m^2} \rightarrow |p_{12}^2| =\frac{m}E_{12}-(\vec p_1 \vec p_2)-m^4}{m^2}</math></center> |
Revision as of 02:09, 4 July 2017
Relativistic Differential Cross-section
dQ is the invariant Lorentz phase space factor
and F is the flux of incoming particles
where is the relative velocity between the particles. In the frame where particle 1 is at rest
Using the relativistic definition of energy
Letting the relativistic energy equation can be rewritten such that
From earlier
The relative velocity can be expressed as
The invariant form of F is
In the center of mass frame