Difference between revisions of "Limits based on Mandelstam Variables"
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<center><math> t \le 0 \qquad u \le 0</math></center> | <center><math> t \le 0 \qquad u \le 0</math></center> | ||
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| + | At the condition both t and u are equal to zero, we find | ||
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| + | <center><math> t = 0 \qquad u = 0</math></center> | ||
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| + | <center><math>-2 p \ ^{*2}(1-cos\ \theta) = 0 \qquad -2 p \ ^{*2}(1+cos\ \theta) = 0</math></center> | ||
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| + | <center><math>(-2 p \ ^{*2}+2 p \ ^{*2}cos\ \theta) = 0 \qquad (-2 p \ ^{*2}-2 p \ ^{*2}cos\ \theta) = 0</math></center> | ||
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| + | <center><math>2 p \ ^{*2}cos\ \theta = 2 p \ ^{*2} \qquad -2 p \ ^{*2}cos\ \theta = 2 p \ ^{*2}</math></center> | ||
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| + | <center><math>cos\ \theta = 1 \qquad cos\ \theta = -1</math></center> | ||
Revision as of 23:52, 9 June 2017
Limits based on Mandelstam Variables
Since the Mandelstam variables are the scalar product of 4-momenta, which are invariants, they are invariants as well. The sum of these invariant variables must also be invariant as well. Find the sum of the 3 Mandelstam variables when the two particles have equal mass in the center of mass frame gives:
Since
This implies
In turn, this implies
At the condition both t and u are equal to zero, we find