Difference between revisions of "Forest Bhabha Scattering"

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=Bhabha (electron -positron) Scattering=
+
=Bhabha (electron - positron) Scattering=
  
 
Bhabha scattering identifies the scatterng of an electron and positron (particle and anti-particle).    There are two processes that can occur
 
Bhabha scattering identifies the scatterng of an electron and positron (particle and anti-particle).    There are two processes that can occur
Line 7: Line 7:
 
2.) annihilation in which the e+ and e- spend some time as a photon which then reconverts back to an e+e- pair
 
2.) annihilation in which the e+ and e- spend some time as a photon which then reconverts back to an e+e- pair
  
=Step 1 Draw the Feynman Diagram=
+
=e+e- scattering (t-channel) (space-like)=
  
 
The Feynman diagram is a space-time description of the interaction where the horizontal axis (abscissa) is used to denote time and the vertical axis (ordinate) is 3-D space.
 
The Feynman diagram is a space-time description of the interaction where the horizontal axis (abscissa) is used to denote time and the vertical axis (ordinate) is 3-D space.
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A particle which travels only along the horizontal time axis is not moving in space while a particle traveling only along the vertical axis is not moving in time (within the uncertainty principle).
 
A particle which travels only along the horizontal time axis is not moving in space while a particle traveling only along the vertical axis is not moving in time (within the uncertainty principle).
  
==e+e- scattering (t-channel) (space-like)==
 
  
If the electron and positron simply scatter off of one another via a coulomb interaction, then they exchange a  photon along the space axis.  You start with an external line from the left to represent the electron.  This is a "t-channel" process in which one of the particles emits a virtual photon that is absorbed by the other particle.  You can tell the exchanged particle is virtual if it is drawn parallel to the time axis in the Feynman diagram.
+
==Step 1 Draw the Feynman Diagram==
 +
 
 +
 
 +
 
 +
If the electron and positron simply scatter off of one another via a coulomb interaction, then they exchange a  photon along the space axis.  You start with an external line from the left to represent the electron.  This is a "t-channel" process in which one of the particles emits a virtual photon that is absorbed by the other particle (the internal photon connects two vertices).  You can tell the exchanged particle is virtual if it is drawn parallel to the time axis in the Feynman diagram.
  
 
[[File:TF_BhaBha_t-chanFeynmanDiag.png | 200 px]]
 
[[File:TF_BhaBha_t-chanFeynmanDiag.png | 200 px]]
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;The time axis is from left to right so the Virtual particle is along the space axis (in some books the diagram has the space axis horizontal).  Also note that a virtual, neutral Z-boson may also be exchanged via the electro-weak interaction.
 
;The time axis is from left to right so the Virtual particle is along the space axis (in some books the diagram has the space axis horizontal).  Also note that a virtual, neutral Z-boson may also be exchanged via the electro-weak interaction.
  
;Momentum conservation at the electron vertex
+
==Step 2 Label 4-Momentum ==
 +
 
 +
 
 +
Let:
 +
 
 +
:<math>p_1=p_{in}(e^-) \equiv</math>  initial electron 4-momentum
 +
:<math>u_1 \equiv</math> initial electron spinor
 +
 
 +
:<math>p_2=p_{out}(e^-) \equiv</math> final electron 4-momentum
 +
:<math>\bar{u}_2 \equiv</math> final electron spinor
 +
 
 +
:<math>p_3= p_{in}(e^+) \equiv</math> initial positron 4-momentum
 +
:<math>\bar{v}_3 \equiv</math> initial positron spinor
 +
 
 +
:<math>p_4 = p_{out}(e^+) \equiv</math> final positron 4-momentum
 +
:<math>v_4 \equiv</math> final positron spinor
 +
 
 +
 
 +
=== Momentum conservation at the electron vertex ===
 +
 
 +
Conservation of 4-momentum at the electron vertex for the e+e- scattering Feynman diagram
 +
 
 
:<math>p^{\mu}_{in}(e^-)  = p^{\mu}_{out}(\gamma^*) + p^{\mu}_{out}(e^-) </math>  
 
:<math>p^{\mu}_{in}(e^-)  = p^{\mu}_{out}(\gamma^*) + p^{\mu}_{out}(e^-) </math>  
 
:<math>\Rightarrow  p^{\mu}_{out}(\gamma^*) =  p^{\mu}_{in}(e^-) - p^{\mu}_{out}(e^-) </math>  
 
:<math>\Rightarrow  p^{\mu}_{out}(\gamma^*) =  p^{\mu}_{in}(e^-) - p^{\mu}_{out}(e^-) </math>  
:<math> q^{\mu} = (E_{\gamma},\vec{p_{\gamma}})= (E_1,\vec{p1}) - (E_2,\vec{p_2}) = (E_1-E_2,\vec{p1} - \vec{p_2})</math>
+
:<math> q^{\mu} = (E_{\gamma},\vec{p_{\gamma}})= (E_1,\vec{p}_1) - (E_2,\vec{p}_2) = (E_1-E_2,\vec{p}_1 - \vec{p}_2)</math>
:<math>q^2 = q_{\mu}q^{\mu}= (E_1-E_2,-(\vec{p1} - \vec{p_2}))  (E_1-E_2,\vec{p1} - \vec{p_2})= (E_1-E_2)^2-(\vec{p1} - \vec{p_2}) \cdot (\vec{p1} - \vec{p_2})</math>
+
:<math>q^2 = q_{\mu}q^{\mu}= (E_1-E_2,-(\vec{p}_1 - \vec{p}_2))  (E_1-E_2,\vec{p}_1 - \vec{p}_2)= (E_1-E_2)^2-(\vec{p}_1 - \vec{p}_2) \cdot (\vec{p}_1 - \vec{p}_2)</math>
 
::<math> = (E_1-E_2)^2-p_1^2 -p_2^2 + 2p_1p_2 \cos(\theta)</math>
 
::<math> = (E_1-E_2)^2-p_1^2 -p_2^2 + 2p_1p_2 \cos(\theta)</math>
 
::<math> = E_1^2 - p_1^2 +E_2^2 - p_2^2  - 2E_1E_2+ 2p_1p_2 \cos(\theta)</math>
 
::<math> = E_1^2 - p_1^2 +E_2^2 - p_2^2  - 2E_1E_2+ 2p_1p_2 \cos(\theta)</math>
::<math> = m_1^2 + m_2^2- 2E_1E_2+ 2p_1p_2 \cos(\theta)</math>
+
::<math> = m_1^2 + m_2^2- 2(E_1E_2- p_1p_2 \cos(\theta))</math>
:: <math>E_{\gamma}^2 - p_{\gamma}^2= m_1^2 + m_2^2 -4p_1p_2\sin^2(\theta/2)</math>
+
:: <math>m_{\gamma}^2=E_{\gamma}^2 - p_{\gamma}^2= m_1^2 + m_2^2 -4p_1p_2\sin^2(\theta/2)</math>
 +
 
 +
if
 +
:<math>E_{\gamma}^2 - p_{\gamma}^2= m_1^2 + m_2^2 -4p_1p_2\sin^2(\theta/2) \ne 0</math>
 +
 
 +
Then
 +
:<math>m_{\gamma}^2 \ne 0 \Rightarrow</math> photon with mass <math>\Rightarrow</math> Virtural Photon
 +
 
 +
 
 +
writing conservation of momentum as a delta function
 +
 
 +
:<math>\delta^4(p_1 -p_2 -q)</math>
 +
:<math>\delta^4(p_3 +q -p_4)</math>
 +
 
 +
==Step 3 Matrix Element==
 +
 
 +
=== electron emits photon Vertex===
  
for the case that the electron and positron have equal and opposite momentum (CM frame) the exchanged particle is clearly a virtual photon
+
The electron scatters
::<math> p^{\mu}_{out}(\gamma^*) = (2m_e,\vec{0})</math>
 
  
==e+e- Annihilation (s-channel) (time-like)==
+
:<math>\bar{u}_2 (ig_e\gamma^{\mu} )u_1</math>
  
If the electron and positron form an intermediate state which then decays back to an electron and positron.  This is a "s-channel" process in which  
+
=== photon propogator===
 +
 
 +
:<math>\left ( \frac{-ig_{\mu \nu}}{(p_1-p_2)^2} \right)</math>
 +
 
 +
=== Positron absorbs photn Vertex===
 +
 
 +
The positron absorbs the photon emitted by the electron
 +
 
 +
:<math>\bar{v}_3 (ig_e\gamma^{\nu} ) v_4</math>
 +
 
 +
;because of the arrow for anti-particles the final state u_4 appears on the most left hand side as the initial state.
 +
 
 +
=== Matrix amplitude===
 +
 
 +
The Matrix element is a product of the vertex and propagator terms
 +
 
 +
:<math>\mathcal{M}_t = (2\pi)^4 \int \left [ \bar{u}_2 (ig_e\gamma^{\mu}) u_1 \right ] \left ( \frac{-ig_{\mu \nu}}{(q)^2} \right) \left [ \bar{v}_3 (ig_e \gamma^{\nu}) v_4 \right ] \delta^4(p_1 -p_2 -q)\delta^4(p_3 +q -p_4) </math>
 +
:::= t-channel scattering matrix amplitude
 +
::<math> = \left [ \bar{u}_2 (ig_e\gamma^{\mu}) u_1 \right ] \left ( \frac{1}{(p_1-p_2)^2} \right) \left [ \bar{v}_3 (ig_e \gamma_{\mu}) v_4\right ]</math> did the integral over the momentum delta functions which cancels out the <math>(2\pi)^4</math>
 +
::<math> =  \left ( \frac{-g_e^2}{(p_1-p_2)^2} \right) [\bar{u}_2 \gamma^{\mu} u_1] [\bar{v}_3 \gamma_{\mu} v_4]</math>
 +
 
 +
 
 +
 
 +
<math>|\mathcal{M}_t |^2 = \frac{e^4}{(p_1-p_2)^4} \Big( [\bar{u}_2 \gamma^{\mu} u_1] [\bar{v}_3 \gamma_{\mu} v_4]\Big)^* \Big( ([\bar{u}_2 \gamma^{\mu} u_1] [\bar{v}_3 \gamma_{\mu} v_4]\Big) </math>
 +
:<math>= \frac{e^4}{(p_1-p_2)^4} \Big( (\bar{u}_1 \gamma^\mu u_2 ) ( \bar{v}_4 \gamma_\mu v_3) \Big) \Big( (\bar{u}_2 \gamma^\nu u_1)( \bar{v}_3 \gamma_\nu v_4 \Big )</math>(complex conjugate will flip order)
 +
:<math>= \frac{e^4}{(p_1-p_2)^4} \Big( (\bar{u}_1 \gamma^\mu u_2 ) (\bar{u}_2 \gamma^\nu u_1)( \bar{v}_4 \gamma_\mu v_3)( \bar{v}_3 \gamma_\nu v_4 \Big)</math> (move terms that depend on same momentum to be next to each other)
 +
 
 +
 
 +
====Spin averaged matrix element====
 +
To determine actual cross-sections and lifetimes you need to insert the specific spinors for the physics process
 +
 
 +
;or you can average over all the initial spin states and sum over all the final spin states to determine the cross section.
 +
;Note: there is a factor of 1/2 if only one of the states is the initial-state particle, the factor is 1/4 is both particles are in the initial state, the factor is 1 if neither particle is in the initial state.
 +
 
 +
<math>< \left | \mathcal{M}^2 \right | > \equiv</math> average over all intial spin states and sum over all the final spin states for <math>\left | \mathcal{M} \right |^2</math>
 +
 
 +
:<math>= \frac{e^4}{(p_1-p_2)^4}  \sum_{s_1} \left ( \bar{u}_1 \gamma^\mu \left [  \sum_{s_2} u_2 \bar{u}_2 \right ]\gamma^\nu u_1 \right) \sum_{s_4} \left ( \bar{v}_4 \gamma_\mu \left [ \sum_{s_3} v_3\bar{v}_3 \right ] \gamma_\nu v_4 \right )</math>
 +
 
 +
 
 +
Working with the first set of matrices
 +
 
 +
:<math>\sum_{s_1} \left ( \bar{u}_1 \gamma^\mu \left [  \sum_{s_2} u_2 \bar{u}_2 \right ]\gamma^\nu u_1 \right)</math>
 +
 
 +
;The completeness relation
 +
:<math>\sum_{s_2} u_2 \bar{u}_2  = p\!\!\!/_2 + m_2 </math>
 +
:<math>\sum_{s_2} v_2 \bar{v}_2  = p\!\!\!/_2 - m_2 </math>
 +
 
 +
 
 +
Let
 +
:<math>Q = \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu</math> a 4 x 4 matrix
 +
 
 +
Then
 +
 
 +
 
 +
:<math>\sum_{s_1} \left ( \bar{u}_1 \gamma^\mu \left [  \sum_{s_2} u_2 \bar{u}_2 \right ]\gamma^\nu u_1 \right) =\sum_{s_1} \left ( \bar{u}_1 Q u_1 \right)</math>
 +
::<math>= \sum_{s_1} (\bar{u}_1)_i Q_{ij} (u_1)_j </math>
 +
::<math>= Q_{ij} \left ( \sum_{s_1}  u_1 \bar{u}_1 \right )_{ji} </math> property of matrices
 +
::<math>= Q_{ij} \left ( ( p\!\!\!/_1 + m_1) \right )_{ji} </math> completeness relation
 +
::<math>= \left ( Q ( p\!\!\!/_1 + m_1)  \right )_{ii}</math>
 +
::<math>= Tr\left [ Q ( p\!\!\!/_1 + m_1) \right]</math>: Def of trace is the sum of diagonal elements in a matrix
 +
::<math>= Tr\left [  \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right]</math>:
 +
 
 +
====Evaluating the Matrix element in terms of Traces====
 +
Using the above relation for the matrix element
 +
 
 +
:<math>\mathcal{M}_t= \frac{e^4}{(p_1-p_2)^4}  \sum_{s_1} \left ( \bar{u}_1 \gamma^\mu \left [  \sum_{s_2} u_2 \bar{u}_2 \right ]\gamma^\nu u_1 \right) \sum_{s_4} \left ( \bar{v}_4 \gamma_\mu \left [ \sum_{s_3} v_3\bar{v}_3 \right ] \gamma_\nu v_4 \right )</math>
 +
::<math>= \frac{e^4}{(p_1-p_2)^4}  Tr\left [  \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right] Tr\left [  \gamma_\mu \left ( p\!\!\!/_3 + m_3 \right ) \gamma_\nu ( p\!\!\!/_4 + m_4) \right]</math>
 +
 
 +
:<math>Tr\left [  \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right]  =</math>
 +
:: <math>Tr\left [  \gamma^\mu  p\!\!\!/_2 \gamma^\nu  p\!\!\!/_1 \right] +Tr\left [  \gamma^\mu  p\!\!\!/_2 \gamma^\nu  m_1 \right] +Tr\left [  \gamma^\mu  m_2 \gamma^\nu  p\!\!\!/_1\right] + Tr\left [  \gamma^\mu  m_2 \gamma^\nu m_1\right]</math>
 +
 
 +
 
 +
:<math>Tr\left [  \gamma^\mu  p\!\!\!/_2 \gamma^\nu  m_1 \right] +Tr\left [  \gamma^\mu  m_2 \gamma^\nu  p\!\!\!/_1\right] = 0</math> : The trace of a product with an odd number of <math> \gamma</math> matrices is zero (remember <math>p\!\!\!/ = \gamma^{\mu} p_{\mu}</math>).
 +
 
 +
 
 +
:<math>Tr\left [  \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right]  =Tr\left [  \gamma^\mu  p\!\!\!/_2 \gamma^\nu  p\!\!\!/_1 \right] + Tr\left [  \gamma^\mu  m_2 \gamma^\nu m_1\right]</math>
 +
::<math>=Tr\left [ \gamma^{\mu}\gamma^{\lambda} (p_2)_{\lambda} \gamma^{\nu} \gamma^{\rho} (p_1)_{\rho} \right] + m_2m_1Tr\left [  \gamma^\mu  \gamma^\nu \right]</math>
 +
::<math>=  (p_2)_{\lambda} (p_1)_{\rho} Tr\left [ \gamma^{\mu}\gamma^{\lambda}  \gamma^{\nu} \gamma^{\rho} \right] + m_2m_1Tr\left [  \gamma^\mu  \gamma^\nu \right]</math>
 +
 
 +
====Applicable Trace identities====
 +
 
 +
:<math>Tr\left [  \gamma^\mu  \gamma^\nu \right] = 4g^{\mu \nu} = 4
 +
  \begin{bmatrix}
 +
    1 & 0 & 0 & 0\\
 +
    0 & -1 & 0 & 0\\
 +
    0 & 0 & -1 & 0\\
 +
    0 & 0 & 0 & -1
 +
  \end{bmatrix}
 +
</math>
 +
 
 +
:<math>Tr\left [ \gamma^{\mu}\gamma^{\lambda}  \gamma^{\nu} \gamma^{\rho} \right] = 4 (g^{\mu \lambda}  g^{\nu \rho}  - g^{\mu \nu}  g^{\lambda \rho} + g^{\mu \rho}  g^{\lambda \nu}  )</math>
 +
 
 +
 
 +
:<math>(p_2)_{\lambda} (p_1)_{\rho} Tr\left [ \gamma^{\mu}\gamma^{\lambda}  \gamma^{\nu} \gamma^{\rho} \right] = (p_2)_{\lambda} (p_1)_{\rho} 4 (g^{\mu \lambda}  g^{\nu \rho}  + g^{\mu \nu}  g^{\lambda \rho} + g^{\mu \rho}  g^{\lambda \nu}  )</math>
 +
::<math>  = 4\left [ (p_2)_{\lambda} (p_1)_{\rho} g^{\mu \lambda}  g^{\nu \rho}  - (p_2)_{\lambda} (p_1)_{\rho} g^{\mu \nu}  g^{\lambda \rho} + (p_2)_{\lambda} (p_1)_{\rho}g^{\mu \rho}  g^{\lambda \nu}  \right ]</math>
 +
::<math>  = 4\left [ (p_2)^{\mu} (p_1)^{\nu}  - g^{\mu \nu} \left ( p_2 \cdot p_1) \right )  + (p_1)^{\mu}  (p_2)^{\nu} \right ]</math>
 +
 
 +
 
 +
:<math>Tr\left [  \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right]  =Tr\left [  \gamma^\mu  p\!\!\!/_2 \gamma^\nu  p\!\!\!/_1 \right] + Tr\left [  \gamma^\mu  m_2 \gamma^\nu m_1\right]</math>
 +
::<math>=  (p_2)_{\lambda} (p_1)_{\rho} Tr\left [ \gamma^{\mu}\gamma^{\lambda}  \gamma^{\nu} \gamma^{\rho} \right] + m_2m_1Tr\left [  \gamma^\mu  \gamma^\nu \right]</math>
 +
::<math>=  4\left [ (p_2)^{\mu} (p_1)^{\nu}  - g^{\mu \nu} \left ( p_2 \cdot p_1) \right )  + (p_1)^{\mu}  (p_2)^{\nu} \right ]+ m_2m_14g^{\mu \nu}</math>
 +
::<math>=  4\left [ (p_2)^{\mu} (p_1)^{\nu}  + (p_1)^{\mu}  (p_2)^{\nu} + g^{\mu \nu}  \left ( m_2m_1-  p_2 \cdot p_1 \right )\right ]</math>
 +
 
 +
====Inserting all terms====
 +
 
 +
:<math>\mathcal{M}_t =\frac{e^4}{(p_1-p_2)^4} Tr\left [  \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right] Tr\left [  \gamma_\mu \left ( p\!\!\!/_3 + m_3 \right ) \gamma_\nu ( p\!\!\!/_4 + m_4) \right]</math>
 +
::<math>=\frac{e^4}{(p_1-p_2)^4}  4\left [ (p_2)^{\mu} (p_1)^{\nu}  + (p_1)^{\mu}  (p_2)^{\nu} + g^{\mu \nu}  \left ( m_2m_1-  p_2 \cdot p_1 \right )\right ] </math>
 +
:::<math>\times 4\left [ (p_3)_{\mu} (p_4)_{\nu}  + (p_4)_{\mu}  (p_3)_{\nu} + g_{\mu \nu}  \left ( m_3m_4-  p_3 \cdot p_4 \right )\right ]</math>
 +
::<math>=  \frac{16e^4}{(p_1-p_2)^4} (p_2)^{\mu} (p_1)^{\nu} \left [ (p_3)_{\mu} (p_4)_{\nu}  + (p_4)_{\mu}  (p_3)_{\nu} + g_{\mu \nu}  \left ( m_3m_4-  p_3 \cdot p_4 \right ) \right ]</math>
 +
:::<math>+(p_1)^{\mu}  (p_2)^{\nu} \left [ (p_3)_{\mu} (p_4)_{\nu}  + (p_4)_{\mu}  (p_3)_{\nu} + g_{\mu \nu}  \left ( m_3m_4-  p_3 \cdot p_4 \right ) \right ]</math>
 +
:::<math>+ g^{\mu \nu}  \left ( m_2m_1-  p_2 \cdot p_1 \right ) \left [ (p_3)_{\mu} (p_4)_{\nu}  + (p_4)_{\mu}  (p_3)_{\nu} + g_{\mu \nu}  \left ( m_3m_4-  p_3 \cdot p_4 \right ) \right ]</math>
 +
;Ignoring the particle masses because we are in the relativistic limit
 +
::<math>=  \frac{16e^4}{(p_1-p_2)^4} \left [ (p_2\cdot p_3) (p_1 \cdot p_4)  + (p_2 \cdot p_4 ) (p_1 \cdot p_3) \right ]+ \left [ (p_1\cdot p_3) (p_2 \cdot p_4)  + (p_1\cdot p_4) (p_2\cdot p_3) \right ]</math>
 +
 
 +
 
 +
:<math>\mathcal{M}_t = \frac{32e^4}{(p_1-p_2)^4} \left [  (p_2\cdot p_3) (p_1 \cdot p_4) + (p_2 \cdot p_4 ) (p_1 \cdot p_3) \right ]</math>
 +
::<math>= 2e^4\frac{s^2+u^2}{t^2}</math>
 +
 
 +
Mandelstam variables are defined as
 +
 
 +
:<math>s = (p_1 + p_3)^2 = (p_2 + p_4)^2\approx 2 p_1 \cdot p_3 \approx 2 p_2 \cdot p_4</math>
 +
:<math>t = (p_1 - p_2)^2 = (p_3-p_4)^2 \approx -2 p_1 \cdot p_2 \approx -2 p_3 \cdot p_4</math>
 +
:<math>u = (p_1 - p_4)^2 = (p_3 - p_2)^2\approx -2 p_1 \cdot p_4 \approx -2 p_3 \cdot p_2</math>
 +
 
 +
**Approximations only valid in high relativistic limit
 +
 
 +
=e+e- Annihilation (s-channel) (time-like)=
 +
 
 +
==Step 1 Draw the Feynman diagram==
 +
 
 +
If the electron and positron form an intermediate state which then decays back to an electron and positron.  This is an "s-channel" process in which an intermediate state is created.
  
 
[[File:TF_BhaBha_s-chanFeynmanDiag.png | 200 px]]
 
[[File:TF_BhaBha_s-chanFeynmanDiag.png | 200 px]]
 +
 +
==Step 2 identify 4-Momentum conservation==
 +
  
 
;Momentum conservation at the first vertex
 
;Momentum conservation at the first vertex
:<math>p^{\mu}_{in}(e^-)= p^{\mu}_{in}(e^+)  + p^{\mu}_{out}(\gamma^*) </math> In reality the
+
:<math>p^{\mu}_{1}(e^-) + p^{\mu}_{3}(e^+)  = p^{\mu}_{out}(\gamma) </math> Unlike scattering the e- state combines with the e+ state to emit a photon which will then produce an e+e- pair some time later.  So the initial 4-momentum of the two incident particles combines to form the 4-momentum of the intermediate state
  
=Step 2 identify 4-Momentum conservation=
 
  
 
Let:
 
Let:
Line 61: Line 232:
 
:<math>\bar{u}_4 \equiv</math> finial positron spinor
 
:<math>\bar{u}_4 \equiv</math> finial positron spinor
  
= Step 3 Determine Matrix element for each vertex=
+
==Step 3 Matrix Element==
 +
 
 +
=== First electron positron annihilation Vertex===
 +
 
 +
Initially an electron annihilates with a positron to form a photon
 +
 
 +
:<math>\bar{u}_4 (ig_e\gamma^{\mu} )u_1</math>
 +
 
 +
=== photon propogator===
 +
 
 +
:<math>\left ( \frac{-ig_{\mu \nu}}{(p_1+p_3)^2} \right)</math>
 +
 
 +
=== reconversion Vertex===
 +
 
 +
The photon converts back into an electron-positron pair
 +
 
 +
:<math>\bar{u}_3 (ig_e\gamma^{\nu} ) u_2</math>
 +
 
 +
=== Matrix amplitude and magnitude===
 +
 
 +
 
 +
 
 +
:<math>M_t = \bar{u}_3 (ig_e\gamma^{\mu}) u_2 \left ( \frac{-ig_{\mu \nu}}{(p_1+p_3)^2} \right) \bar{u}_4 (ig_e \gamma^{\nu}) u_1</math> = s-channel annihilation matrix amplitude
 +
::<math> = \bar{u}_3 (ig_e\gamma^{\mu}) u_2 \left ( \frac{1}{(p_1+p_3)^2} \right) \bar{u}_4 (ig_e \gamma_{\mu}) u_1</math>
 +
::<math> = \left ( \frac{g_e^2}{(p_1+p_3)^2} \right) [\bar{u}_3 (\gamma^{\mu}) u_2] [\bar{u}_4 ( \gamma_{\mu}) u_1]</math>
  
 
=Step 4 Find total amplitude=
 
=Step 4 Find total amplitude=
 +
 +
 +
 +
:<math>\mathcal{M}_t = \bar{u}_2 (ig_e\gamma^{\mu}) u_1 \left ( \frac{-ig_{\mu \nu}}{(p_1-p_2)^2} \right) \bar{u}_3 (ig_e \gamma^{\nu}) u_4</math> = t-channel scattering matrix amplitude
 +
 +
 +
:<math>\mathcal{M}_s = \bar{u}_4 (ig_e\gamma^{\mu}) u_2 \left ( \frac{-ig_{\mu \nu}}{(p_1-p_2)^2} \right) \bar{u}_3 (ig_e \gamma^{\nu}) u_1</math> = s-channel annihilation matrix amplitude
 +
 +
 +
The overall amplitude (<math>\mathcal{M}_{tot}</math>) is the coherent sum of the individual amplitudes.  In the case of annihaltion (s-channel) the Feynman diagram depicts particle becoming anti-particles and the reverser.  A "-" sign is introduced to "Asymmetrize" the amplitude and account for particles simply interchanging with their anti-particle.
 +
 +
<math>\mathcal{M}_{tot} = \mathcal{M}_t - \mathcal{M}_s</math>
  
 
=Matrix element for scattering=
 
=Matrix element for scattering=

Latest revision as of 18:13, 22 April 2012

Bhabha (electron - positron) Scattering

Bhabha scattering identifies the scatterng of an electron and positron (particle and anti-particle). There are two processes that can occur

1.) scattering via the "instantaneous" exchange of a virtual photon

2.) annihilation in which the e+ and e- spend some time as a photon which then reconverts back to an e+e- pair

e+e- scattering (t-channel) (space-like)

The Feynman diagram is a space-time description of the interaction where the horizontal axis (abscissa) is used to denote time and the vertical axis (ordinate) is 3-D space.

TF GenericFeynmanSpace-TimeDiagram.jpg

A particle which travels only along the horizontal time axis is not moving in space while a particle traveling only along the vertical axis is not moving in time (within the uncertainty principle).


Step 1 Draw the Feynman Diagram

If the electron and positron simply scatter off of one another via a coulomb interaction, then they exchange a photon along the space axis. You start with an external line from the left to represent the electron. This is a "t-channel" process in which one of the particles emits a virtual photon that is absorbed by the other particle (the internal photon connects two vertices). You can tell the exchanged particle is virtual if it is drawn parallel to the time axis in the Feynman diagram.

TF BhaBha t-chanFeynmanDiag.png

The time axis is from left to right so the Virtual particle is along the space axis (in some books the diagram has the space axis horizontal). Also note that a virtual, neutral Z-boson may also be exchanged via the electro-weak interaction.

Step 2 Label 4-Momentum

Let:

[math]p_1=p_{in}(e^-) \equiv[/math] initial electron 4-momentum
[math]u_1 \equiv[/math] initial electron spinor
[math]p_2=p_{out}(e^-) \equiv[/math] final electron 4-momentum
[math]\bar{u}_2 \equiv[/math] final electron spinor
[math]p_3= p_{in}(e^+) \equiv[/math] initial positron 4-momentum
[math]\bar{v}_3 \equiv[/math] initial positron spinor
[math]p_4 = p_{out}(e^+) \equiv[/math] final positron 4-momentum
[math]v_4 \equiv[/math] final positron spinor


Momentum conservation at the electron vertex

Conservation of 4-momentum at the electron vertex for the e+e- scattering Feynman diagram

[math]p^{\mu}_{in}(e^-) = p^{\mu}_{out}(\gamma^*) + p^{\mu}_{out}(e^-) [/math]
[math]\Rightarrow p^{\mu}_{out}(\gamma^*) = p^{\mu}_{in}(e^-) - p^{\mu}_{out}(e^-) [/math]
[math] q^{\mu} = (E_{\gamma},\vec{p_{\gamma}})= (E_1,\vec{p}_1) - (E_2,\vec{p}_2) = (E_1-E_2,\vec{p}_1 - \vec{p}_2)[/math]
[math]q^2 = q_{\mu}q^{\mu}= (E_1-E_2,-(\vec{p}_1 - \vec{p}_2)) (E_1-E_2,\vec{p}_1 - \vec{p}_2)= (E_1-E_2)^2-(\vec{p}_1 - \vec{p}_2) \cdot (\vec{p}_1 - \vec{p}_2)[/math]
[math] = (E_1-E_2)^2-p_1^2 -p_2^2 + 2p_1p_2 \cos(\theta)[/math]
[math] = E_1^2 - p_1^2 +E_2^2 - p_2^2 - 2E_1E_2+ 2p_1p_2 \cos(\theta)[/math]
[math] = m_1^2 + m_2^2- 2(E_1E_2- p_1p_2 \cos(\theta))[/math]
[math]m_{\gamma}^2=E_{\gamma}^2 - p_{\gamma}^2= m_1^2 + m_2^2 -4p_1p_2\sin^2(\theta/2)[/math]

if

[math]E_{\gamma}^2 - p_{\gamma}^2= m_1^2 + m_2^2 -4p_1p_2\sin^2(\theta/2) \ne 0[/math]

Then

[math]m_{\gamma}^2 \ne 0 \Rightarrow[/math] photon with mass [math]\Rightarrow[/math] Virtural Photon


writing conservation of momentum as a delta function

[math]\delta^4(p_1 -p_2 -q)[/math]
[math]\delta^4(p_3 +q -p_4)[/math]

Step 3 Matrix Element

electron emits photon Vertex

The electron scatters

[math]\bar{u}_2 (ig_e\gamma^{\mu} )u_1[/math]

photon propogator

[math]\left ( \frac{-ig_{\mu \nu}}{(p_1-p_2)^2} \right)[/math]

Positron absorbs photn Vertex

The positron absorbs the photon emitted by the electron

[math]\bar{v}_3 (ig_e\gamma^{\nu} ) v_4[/math]
because of the arrow for anti-particles the final state u_4 appears on the most left hand side as the initial state.

Matrix amplitude

The Matrix element is a product of the vertex and propagator terms

[math]\mathcal{M}_t = (2\pi)^4 \int \left [ \bar{u}_2 (ig_e\gamma^{\mu}) u_1 \right ] \left ( \frac{-ig_{\mu \nu}}{(q)^2} \right) \left [ \bar{v}_3 (ig_e \gamma^{\nu}) v_4 \right ] \delta^4(p_1 -p_2 -q)\delta^4(p_3 +q -p_4) [/math]
= t-channel scattering matrix amplitude
[math] = \left [ \bar{u}_2 (ig_e\gamma^{\mu}) u_1 \right ] \left ( \frac{1}{(p_1-p_2)^2} \right) \left [ \bar{v}_3 (ig_e \gamma_{\mu}) v_4\right ][/math] did the integral over the momentum delta functions which cancels out the [math](2\pi)^4[/math]
[math] = \left ( \frac{-g_e^2}{(p_1-p_2)^2} \right) [\bar{u}_2 \gamma^{\mu} u_1] [\bar{v}_3 \gamma_{\mu} v_4][/math]


[math]|\mathcal{M}_t |^2 = \frac{e^4}{(p_1-p_2)^4} \Big( [\bar{u}_2 \gamma^{\mu} u_1] [\bar{v}_3 \gamma_{\mu} v_4]\Big)^* \Big( ([\bar{u}_2 \gamma^{\mu} u_1] [\bar{v}_3 \gamma_{\mu} v_4]\Big) [/math]

[math]= \frac{e^4}{(p_1-p_2)^4} \Big( (\bar{u}_1 \gamma^\mu u_2 ) ( \bar{v}_4 \gamma_\mu v_3) \Big) \Big( (\bar{u}_2 \gamma^\nu u_1)( \bar{v}_3 \gamma_\nu v_4 \Big )[/math](complex conjugate will flip order)
[math]= \frac{e^4}{(p_1-p_2)^4} \Big( (\bar{u}_1 \gamma^\mu u_2 ) (\bar{u}_2 \gamma^\nu u_1)( \bar{v}_4 \gamma_\mu v_3)( \bar{v}_3 \gamma_\nu v_4 \Big)[/math] (move terms that depend on same momentum to be next to each other)


Spin averaged matrix element

To determine actual cross-sections and lifetimes you need to insert the specific spinors for the physics process

or you can average over all the initial spin states and sum over all the final spin states to determine the cross section.
Note
there is a factor of 1/2 if only one of the states is the initial-state particle, the factor is 1/4 is both particles are in the initial state, the factor is 1 if neither particle is in the initial state.

[math]\lt \left | \mathcal{M}^2 \right | \gt \equiv[/math] average over all intial spin states and sum over all the final spin states for [math]\left | \mathcal{M} \right |^2[/math]

[math]= \frac{e^4}{(p_1-p_2)^4} \sum_{s_1} \left ( \bar{u}_1 \gamma^\mu \left [ \sum_{s_2} u_2 \bar{u}_2 \right ]\gamma^\nu u_1 \right) \sum_{s_4} \left ( \bar{v}_4 \gamma_\mu \left [ \sum_{s_3} v_3\bar{v}_3 \right ] \gamma_\nu v_4 \right )[/math]


Working with the first set of matrices

[math]\sum_{s_1} \left ( \bar{u}_1 \gamma^\mu \left [ \sum_{s_2} u_2 \bar{u}_2 \right ]\gamma^\nu u_1 \right)[/math]
The completeness relation
[math]\sum_{s_2} u_2 \bar{u}_2 = p\!\!\!/_2 + m_2 [/math]
[math]\sum_{s_2} v_2 \bar{v}_2 = p\!\!\!/_2 - m_2 [/math]


Let

[math]Q = \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu[/math] a 4 x 4 matrix

Then


[math]\sum_{s_1} \left ( \bar{u}_1 \gamma^\mu \left [ \sum_{s_2} u_2 \bar{u}_2 \right ]\gamma^\nu u_1 \right) =\sum_{s_1} \left ( \bar{u}_1 Q u_1 \right)[/math]
[math]= \sum_{s_1} (\bar{u}_1)_i Q_{ij} (u_1)_j [/math]
[math]= Q_{ij} \left ( \sum_{s_1} u_1 \bar{u}_1 \right )_{ji} [/math] property of matrices
[math]= Q_{ij} \left ( ( p\!\!\!/_1 + m_1) \right )_{ji} [/math] completeness relation
[math]= \left ( Q ( p\!\!\!/_1 + m_1) \right )_{ii}[/math]
[math]= Tr\left [ Q ( p\!\!\!/_1 + m_1) \right][/math]: Def of trace is the sum of diagonal elements in a matrix
[math]= Tr\left [ \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right][/math]:

Evaluating the Matrix element in terms of Traces

Using the above relation for the matrix element

[math]\mathcal{M}_t= \frac{e^4}{(p_1-p_2)^4} \sum_{s_1} \left ( \bar{u}_1 \gamma^\mu \left [ \sum_{s_2} u_2 \bar{u}_2 \right ]\gamma^\nu u_1 \right) \sum_{s_4} \left ( \bar{v}_4 \gamma_\mu \left [ \sum_{s_3} v_3\bar{v}_3 \right ] \gamma_\nu v_4 \right )[/math]
[math]= \frac{e^4}{(p_1-p_2)^4} Tr\left [ \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right] Tr\left [ \gamma_\mu \left ( p\!\!\!/_3 + m_3 \right ) \gamma_\nu ( p\!\!\!/_4 + m_4) \right][/math]
[math]Tr\left [ \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right] =[/math]
[math]Tr\left [ \gamma^\mu p\!\!\!/_2 \gamma^\nu p\!\!\!/_1 \right] +Tr\left [ \gamma^\mu p\!\!\!/_2 \gamma^\nu m_1 \right] +Tr\left [ \gamma^\mu m_2 \gamma^\nu p\!\!\!/_1\right] + Tr\left [ \gamma^\mu m_2 \gamma^\nu m_1\right][/math]


[math]Tr\left [ \gamma^\mu p\!\!\!/_2 \gamma^\nu m_1 \right] +Tr\left [ \gamma^\mu m_2 \gamma^\nu p\!\!\!/_1\right] = 0[/math] : The trace of a product with an odd number of [math] \gamma[/math] matrices is zero (remember [math]p\!\!\!/ = \gamma^{\mu} p_{\mu}[/math]).


[math]Tr\left [ \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right] =Tr\left [ \gamma^\mu p\!\!\!/_2 \gamma^\nu p\!\!\!/_1 \right] + Tr\left [ \gamma^\mu m_2 \gamma^\nu m_1\right][/math]
[math]=Tr\left [ \gamma^{\mu}\gamma^{\lambda} (p_2)_{\lambda} \gamma^{\nu} \gamma^{\rho} (p_1)_{\rho} \right] + m_2m_1Tr\left [ \gamma^\mu \gamma^\nu \right][/math]
[math]= (p_2)_{\lambda} (p_1)_{\rho} Tr\left [ \gamma^{\mu}\gamma^{\lambda} \gamma^{\nu} \gamma^{\rho} \right] + m_2m_1Tr\left [ \gamma^\mu \gamma^\nu \right][/math]

Applicable Trace identities

[math]Tr\left [ \gamma^\mu \gamma^\nu \right] = 4g^{\mu \nu} = 4 \begin{bmatrix} 1 & 0 & 0 & 0\\ 0 & -1 & 0 & 0\\ 0 & 0 & -1 & 0\\ 0 & 0 & 0 & -1 \end{bmatrix} [/math]
[math]Tr\left [ \gamma^{\mu}\gamma^{\lambda} \gamma^{\nu} \gamma^{\rho} \right] = 4 (g^{\mu \lambda} g^{\nu \rho} - g^{\mu \nu} g^{\lambda \rho} + g^{\mu \rho} g^{\lambda \nu} )[/math]


[math](p_2)_{\lambda} (p_1)_{\rho} Tr\left [ \gamma^{\mu}\gamma^{\lambda} \gamma^{\nu} \gamma^{\rho} \right] = (p_2)_{\lambda} (p_1)_{\rho} 4 (g^{\mu \lambda} g^{\nu \rho} + g^{\mu \nu} g^{\lambda \rho} + g^{\mu \rho} g^{\lambda \nu} )[/math]
[math] = 4\left [ (p_2)_{\lambda} (p_1)_{\rho} g^{\mu \lambda} g^{\nu \rho} - (p_2)_{\lambda} (p_1)_{\rho} g^{\mu \nu} g^{\lambda \rho} + (p_2)_{\lambda} (p_1)_{\rho}g^{\mu \rho} g^{\lambda \nu} \right ][/math]
[math] = 4\left [ (p_2)^{\mu} (p_1)^{\nu} - g^{\mu \nu} \left ( p_2 \cdot p_1) \right ) + (p_1)^{\mu} (p_2)^{\nu} \right ][/math]


[math]Tr\left [ \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right] =Tr\left [ \gamma^\mu p\!\!\!/_2 \gamma^\nu p\!\!\!/_1 \right] + Tr\left [ \gamma^\mu m_2 \gamma^\nu m_1\right][/math]
[math]= (p_2)_{\lambda} (p_1)_{\rho} Tr\left [ \gamma^{\mu}\gamma^{\lambda} \gamma^{\nu} \gamma^{\rho} \right] + m_2m_1Tr\left [ \gamma^\mu \gamma^\nu \right][/math]
[math]= 4\left [ (p_2)^{\mu} (p_1)^{\nu} - g^{\mu \nu} \left ( p_2 \cdot p_1) \right ) + (p_1)^{\mu} (p_2)^{\nu} \right ]+ m_2m_14g^{\mu \nu}[/math]
[math]= 4\left [ (p_2)^{\mu} (p_1)^{\nu} + (p_1)^{\mu} (p_2)^{\nu} + g^{\mu \nu} \left ( m_2m_1- p_2 \cdot p_1 \right )\right ][/math]

Inserting all terms

[math]\mathcal{M}_t =\frac{e^4}{(p_1-p_2)^4} Tr\left [ \gamma^\mu \left ( p\!\!\!/_2 + m_2 \right ) \gamma^\nu ( p\!\!\!/_1 + m_1) \right] Tr\left [ \gamma_\mu \left ( p\!\!\!/_3 + m_3 \right ) \gamma_\nu ( p\!\!\!/_4 + m_4) \right][/math]
[math]=\frac{e^4}{(p_1-p_2)^4} 4\left [ (p_2)^{\mu} (p_1)^{\nu} + (p_1)^{\mu} (p_2)^{\nu} + g^{\mu \nu} \left ( m_2m_1- p_2 \cdot p_1 \right )\right ] [/math]
[math]\times 4\left [ (p_3)_{\mu} (p_4)_{\nu} + (p_4)_{\mu} (p_3)_{\nu} + g_{\mu \nu} \left ( m_3m_4- p_3 \cdot p_4 \right )\right ][/math]
[math]= \frac{16e^4}{(p_1-p_2)^4} (p_2)^{\mu} (p_1)^{\nu} \left [ (p_3)_{\mu} (p_4)_{\nu} + (p_4)_{\mu} (p_3)_{\nu} + g_{\mu \nu} \left ( m_3m_4- p_3 \cdot p_4 \right ) \right ][/math]
[math]+(p_1)^{\mu} (p_2)^{\nu} \left [ (p_3)_{\mu} (p_4)_{\nu} + (p_4)_{\mu} (p_3)_{\nu} + g_{\mu \nu} \left ( m_3m_4- p_3 \cdot p_4 \right ) \right ][/math]
[math]+ g^{\mu \nu} \left ( m_2m_1- p_2 \cdot p_1 \right ) \left [ (p_3)_{\mu} (p_4)_{\nu} + (p_4)_{\mu} (p_3)_{\nu} + g_{\mu \nu} \left ( m_3m_4- p_3 \cdot p_4 \right ) \right ][/math]
Ignoring the particle masses because we are in the relativistic limit
[math]= \frac{16e^4}{(p_1-p_2)^4} \left [ (p_2\cdot p_3) (p_1 \cdot p_4) + (p_2 \cdot p_4 ) (p_1 \cdot p_3) \right ]+ \left [ (p_1\cdot p_3) (p_2 \cdot p_4) + (p_1\cdot p_4) (p_2\cdot p_3) \right ][/math]


[math]\mathcal{M}_t = \frac{32e^4}{(p_1-p_2)^4} \left [ (p_2\cdot p_3) (p_1 \cdot p_4) + (p_2 \cdot p_4 ) (p_1 \cdot p_3) \right ][/math]
[math]= 2e^4\frac{s^2+u^2}{t^2}[/math]

Mandelstam variables are defined as

[math]s = (p_1 + p_3)^2 = (p_2 + p_4)^2\approx 2 p_1 \cdot p_3 \approx 2 p_2 \cdot p_4[/math]
[math]t = (p_1 - p_2)^2 = (p_3-p_4)^2 \approx -2 p_1 \cdot p_2 \approx -2 p_3 \cdot p_4[/math]
[math]u = (p_1 - p_4)^2 = (p_3 - p_2)^2\approx -2 p_1 \cdot p_4 \approx -2 p_3 \cdot p_2[/math]
    • Approximations only valid in high relativistic limit

e+e- Annihilation (s-channel) (time-like)

Step 1 Draw the Feynman diagram

If the electron and positron form an intermediate state which then decays back to an electron and positron. This is an "s-channel" process in which an intermediate state is created.

TF BhaBha s-chanFeynmanDiag.png

Step 2 identify 4-Momentum conservation

Momentum conservation at the first vertex
[math]p^{\mu}_{1}(e^-) + p^{\mu}_{3}(e^+) = p^{\mu}_{out}(\gamma) [/math] Unlike scattering the e- state combines with the e+ state to emit a photon which will then produce an e+e- pair some time later. So the initial 4-momentum of the two incident particles combines to form the 4-momentum of the intermediate state


Let:

[math]p_1 \equiv[/math] initial electron 4-momentum
[math]u_1 \equiv[/math] initial electron spinor
[math]p_2 \equiv[/math] final electron 4-momentum
[math]u_2 \equiv[/math] final electron spinor
[math]p_3 \equiv[/math] initial positron 4-momentum
[math]\bar{u}_3 \equiv[/math] initial positron spinor
[math]p_4 \equiv[/math] finial positron 4-momentum
[math]\bar{u}_4 \equiv[/math] finial positron spinor

Step 3 Matrix Element

First electron positron annihilation Vertex

Initially an electron annihilates with a positron to form a photon

[math]\bar{u}_4 (ig_e\gamma^{\mu} )u_1[/math]

photon propogator

[math]\left ( \frac{-ig_{\mu \nu}}{(p_1+p_3)^2} \right)[/math]

reconversion Vertex

The photon converts back into an electron-positron pair

[math]\bar{u}_3 (ig_e\gamma^{\nu} ) u_2[/math]

Matrix amplitude and magnitude

[math]M_t = \bar{u}_3 (ig_e\gamma^{\mu}) u_2 \left ( \frac{-ig_{\mu \nu}}{(p_1+p_3)^2} \right) \bar{u}_4 (ig_e \gamma^{\nu}) u_1[/math] = s-channel annihilation matrix amplitude
[math] = \bar{u}_3 (ig_e\gamma^{\mu}) u_2 \left ( \frac{1}{(p_1+p_3)^2} \right) \bar{u}_4 (ig_e \gamma_{\mu}) u_1[/math]
[math] = \left ( \frac{g_e^2}{(p_1+p_3)^2} \right) [\bar{u}_3 (\gamma^{\mu}) u_2] [\bar{u}_4 ( \gamma_{\mu}) u_1][/math]

Step 4 Find total amplitude

[math]\mathcal{M}_t = \bar{u}_2 (ig_e\gamma^{\mu}) u_1 \left ( \frac{-ig_{\mu \nu}}{(p_1-p_2)^2} \right) \bar{u}_3 (ig_e \gamma^{\nu}) u_4[/math] = t-channel scattering matrix amplitude


[math]\mathcal{M}_s = \bar{u}_4 (ig_e\gamma^{\mu}) u_2 \left ( \frac{-ig_{\mu \nu}}{(p_1-p_2)^2} \right) \bar{u}_3 (ig_e \gamma^{\nu}) u_1[/math] = s-channel annihilation matrix amplitude


The overall amplitude ([math]\mathcal{M}_{tot}[/math]) is the coherent sum of the individual amplitudes. In the case of annihaltion (s-channel) the Feynman diagram depicts particle becoming anti-particles and the reverser. A "-" sign is introduced to "Asymmetrize" the amplitude and account for particles simply interchanging with their anti-particle.

[math]\mathcal{M}_{tot} = \mathcal{M}_t - \mathcal{M}_s[/math]

Matrix element for scattering

According to the Feynman RUles for QED:

the term

[math]ig_e \gamma^{\mu}[/math]

is used at the vertex to describe the Quantum electrodynamic (electromagneticc) interaction between the two fermion spinor states entering the vertex and forming a photon which will "connect" this vertex with the next one.

The QED interaction Lagrangian is
[math]-eA_{\mu} \bar{\Psi} \gamma^{\mu} \Psi[/math]

[math]\mathcal{M}_s = \,[/math] [math]e^2 \left( \bar{u}_{3} \gamma^\nu u_4 \right) \frac{1}{(p_1+p_2)^2} \left( \bar{u}_{2} \gamma_\nu u_{1} \right) [/math]

Matrix element for annihilation

[math]\mathcal{M}_a = \,[/math] [math]-e^2 \left( \bar{u}_{3} \gamma^\mu u_{1} \right) \frac{1}{(p_1-p_3)^2} \left( \bar{u}_{2} \gamma_\mu u_4 \right) [/math]


Radiative Bhabha Scattering to measure running of alpha

http://arxiv.org/pdf/hep-ex/0105065.pdf

Forest_QMII