CV+short - EPFL
CV+short - EPFL CV+short - EPFL
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- Page 2 and 3: ¢¡¤£ ¦£¦ §£§©¥£§¦©
- Page 4 and 5: ¨¨¥¥¨¨¨¨ B ¨©¨ ¨ → φ
- Page 6 and 7: D0 − D¯ ¥ 0 ¨¨¨ ¢
- Page 8 and 9: B 0 s ¢ ©¥¨ ¨¨ Υ(5S) ©¨
- Page 10 and 11: J/ψ → p¯p Λ ¯ Λ ¢ ηc →
- Page 12 and 13: ¨¨ B → J/ψK ∗ ¨ ©©¨¨¨
- Page 14: ¢ B0 → K + π−π0 B0 → ρ
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<br />
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<br />
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<br />
<br />
¥ ¨<br />
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b → dγ<br />
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<br />
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¥¨¨¤¨ <br />
|Vtd/Vts|<br />
¥ B 0 − ¯ B 0 ¨¨¨<br />
¨¨<br />
<br />
B0 → D∗−π + B0 → D− <br />
π +<br />
¨¨¨¨¨
¦¥ ¡ ¤ ¥©¨¥<br />
¨¨<br />
<br />
¨<br />
B0 →<br />
ρ + ρ − £¢¥ φ2<br />
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<br />
D0 − D¯ 0 D0 → K + <br />
π− ¡¨ ¡ ¡¨¨¨¨<br />
<br />
<br />
¨¨¨<br />
B0 <br />
→ γγ<br />
¥<br />
B ± → DCPK ± D∗ ¨¨¨<br />
© CPK± ¢ χ ′ c2<br />
γγ → D ¯ D ¥¨¨ <br />
¨¨<br />
<br />
B e + e− √ s = 10.6<br />
¨¨¨<br />
<br />
B → χc1(2)K(K∗ ¨¨<br />
)<br />
|Vub|<br />
¨¨¨¨<br />
¥ <br />
<br />
B ¨¨¥¨¨<br />
¨<br />
¢ © ¨¨¨<br />
B<br />
<br />
¨ ¤ <br />
<br />
B → Xsℓℓ<br />
¨¨¨<br />
<br />
¨<br />
D 0 → K + π − π 0 D 0 → K + π − π + π −<br />
©¨¨¨¨ <br />
<br />
<br />
©©<br />
Θ(1540) +<br />
¢ ¤<br />
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<br />
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Λπ− ¨¨¨¨¨¨<br />
<br />
D0 − D¯ 0 ¢©¨<br />
¨¨©<br />
<br />
B− → D (∗)+ π−ℓ− ¯νℓ<br />
¯B 0 <br />
→ D (∗)0π + ℓ− <br />
¯νℓ<br />
¨¤¨¨¨¨©<br />
© ¡¨<br />
¥¤<br />
B + → ρ + K∗0 ¨¨¨<br />
¢ <br />
B− → J/ψΛ¯p B− → J/ψΣ0 ¯p B0 → J/ψp¯p<br />
©¨¨¨©<br />
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<br />
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©¨¨¨¨<br />
¢<br />
τ − → ℓ−π0 , ℓ−η, ℓ−η ′ ¨¨<br />
¨¨<br />
<br />
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φ2<br />
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B → J/ψK ∗<br />
¨<br />
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<br />
γγ → p¯p<br />
|Vub|<br />
<br />
<br />
<br />
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B<br />
<br />
¢ §¡ ¨©¨¨¨<br />
<br />
B + → pΛγ ¯<br />
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<br />
<br />
<br />
<br />
B 0 → K 0 S K 0 S K0 S<br />
<br />
©¨¨¨<br />
¢ <br />
B → D0η ′ B → D∗0η ′ ¨¨¨¨<br />
©<br />
<br />
B0 → D + D− ¢ B− → D0D− B− → D0 ¢<br />
D∗− ¤¨¨¨¨<br />
¨¨¨¨¨<br />
<br />
b → dγ<br />
©<br />
<br />
¦¥<br />
b → sq¯q<br />
©<br />
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<br />
<br />
¥¨ <br />
B 0 → D ∗+ D ∗− <br />
<br />
<br />
<br />
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<br />
B<br />
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<br />
¢ §¡ ¨¨¨¨<br />
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<br />
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<br />
<br />
¤© B 0 → K 0 S π 0 γ <br />
¨¨¨¨<br />
¢<br />
D1(2420) → Dπ + ¨¨¨<br />
π− ¨<br />
<br />
<br />
<br />
B → φK ∗<br />
<br />
¥¨¨¨¨¨<br />
<br />
γγ → π + π− γγ → K + ¤ £¢¡ ¢<br />
K− ¨¨©¨¨¨<br />
<br />
B0 → J/ψD¯ 0 B + → J/ψ ¯ D0 ¡¨ ¡ ¡¨¨<br />
π +<br />
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¥¨<br />
<br />
B → ηh<br />
<br />
B + → K + π + π− B + → K + K + <br />
K− ¨¨¨©<br />
¢ <br />
<br />
¨¨¨¨<br />
<br />
ωJ/ψ ¥ B → KωJ/ψ<br />
¢ <br />
<br />
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<br />
B0 → π0π0 ¨<br />
¨ ¥<br />
B + <br />
B0 ¨¨¥¨¨
B<br />
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¨¨¨¨<br />
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<br />
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|λ| B<br />
¥ <br />
sin(2φ1) <br />
<br />
<br />
¨¨¨ <br />
<br />
B 0 − ¯ B 0 ∆md<br />
<br />
¨<br />
¢<br />
Λ +<br />
c 𠨨<br />
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B0 → ρπ<br />
<br />
¨¨¨<br />
¢<br />
B + → K1(1270) + γ ¥¨¨¨¨<br />
¨<br />
¢<br />
B + → K + ¨¨¨<br />
ηγ<br />
<br />
<br />
B− → [K + π− ]DK − B− → [K + π− ¨<br />
]Dπ− ¨¨¨¨<br />
<br />
D0 − D¯ 0 D0 → K + ©<br />
π− <br />
<br />
¤ ¡ ¡¨ ¨¨¨<br />
<br />
¨<br />
¯ ¨¢ <br />
B0 → D∗ sJ (2317) + ©¨¨¨<br />
K− ¨<br />
¤ ¥<br />
<br />
B → hh<br />
¥¨¨¨¨©<br />
¡¨¨<br />
¥¤<br />
B + → ρ + π0 ¨¨¨<br />
©¤ Ξ + c<br />
Ξ 0 c<br />
¥¨<br />
<br />
¨¨¨¨¨¨<br />
<br />
¢<br />
B0 → D∗− (5π) + B + → D∗− (4π) ++ B + → ¯ D∗0 ¤<br />
(5π) +<br />
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<br />
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<br />
<br />
B 0 → J/ψπ 0<br />
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¢<br />
B + → ΛΛK ¯ ¢ ¨ §¡ ¨©¨¨¨<br />
+<br />
¨<br />
¨¨<br />
<br />
B0 → D∗± D∓ ¨<br />
<br />
B0 → K ± π∓ ¢¥¨¨ <br />
¨¨<br />
<br />
e + e− √ s 10.6<br />
<br />
¨¨¨¨©<br />
<br />
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φ3<br />
B ± → D (∗) K ±<br />
¨¨¨¨<br />
<br />
e + e− → D (∗)+ D (∗)− ©¨¨¨<br />
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¢<br />
B0 → K + π−π0 B0 → ρ− ¥¨¤¨¥<br />
K +<br />
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¡ <br />
¢ ¢ ©¨¨¨¨¨<br />
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c<br />
b<br />
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