... | @@ -109,6 +109,7 @@ If the considered parameter does not depend on other parameters, there are two w |
... | @@ -109,6 +109,7 @@ If the considered parameter does not depend on other parameters, there are two w |
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##### Example
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##### Example
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1. The CKM matrix can be defined in the Wolfenstein parametrization as
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1. The CKM matrix can be defined in the Wolfenstein parametrization as
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```
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{{Description ->"CKM Matrix",
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{{Description ->"CKM Matrix",
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LaTeX -> "V^{CKM}",
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LaTeX -> "V^{CKM}",
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MatrixProduct -> {Vd,Vu},
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MatrixProduct -> {Vd,Vu},
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... | @@ -119,13 +120,16 @@ If the considered parameter does not depend on other parameters, there are two w |
... | @@ -119,13 +120,16 @@ If the considered parameter does not depend on other parameters, there are two w |
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LesHouches -> VCKM,
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LesHouches -> VCKM,
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DependenceSPheno -> Matmul[Transpose[conj[Vd]],Vu],
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DependenceSPheno -> Matmul[Transpose[conj[Vd]],Vu],
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OutputName-> VCKM }},
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OutputName-> VCKM }},
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```
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2. The Wolfenstein parameters are real and the experimental values are known
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2. The Wolfenstein parameters are real and the experimental values are known
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```
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{{Description->"Wolfenstein Parameter eta",
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{{Description->"Wolfenstein Parameter eta",
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Value -> 0.341,
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Value -> 0.341,
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Real -> True,
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Real -> True,
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OutputName-> nWolf,
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OutputName-> nWolf,
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LesHouches -> {WOLFENSTEIN,4} }},
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LesHouches -> {WOLFENSTEIN,4} }},
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```
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Global definitions
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Global definitions
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------------------
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------------------
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... | | ... | |