1. Max Baak, NIKHEF on behalf of the BABAR and BELLE Collaborations
Measurements of 
at BABAR and BELLE
Max Baak, NIKHEF on behalf of the BABAR and BELLE Collaborations
Beauty 2005, Assisi

2. Outline Measurements of  using BD(*)K(*)
GLW Method
ADS Method
D0 Dalitz Method (GGSZ)
Measurements of sin(2+) using B0D(*)  /
Outlook  

3.  in the Unitarity Triangle
(,)
CKM Unitarity Triangle
(0,0)
(1,0)
Expect  ≈ (60 ± 6)° from SM fit to: sin2, |Vub/Vcb|, md, ms, k
Most challenging angle to measure experimentally:
Low branching fractions
Low reconstruction efficiencies
Small interferences
The only solution with  is statistics

4.  from B-  D(*) K- K– D0 B– D0 B– K–
Access  via interference between B-  D(*)0 K- and B-  D(*)0 K-.
Color-allowed
b c amplitude
Color-suppressed
b u amplitude u u K– D0
 f
Vus* s
Vcs*
W – b c b c
amplitude ratio rB relative weak phase  and strong phase B
W –
Vub s B– D0
 f B– K–
Vcb u u
Reconstruct D in final state f accessible both to D0 and D0.
Will discuss 3 methods with different final states f in this talk:
GLW Gronau – London – Wyler
2. ADS Atwood – Dunietz – Soni
3. GGSZ Giri – Grossman – Soffer – Zupan
Belle collaboration
Critical parameter rB~ 0.1 for sensitivity to  !
In order to determine rB, , B simultaneously, need to measure as many D(*)0 modes as possible.

5. Preface: Analysis Techniques
1. B-meson identification
2. Combinatoric e+e–  qq bkg suppression
mES
E = EB*–E*beam
data MC E
Event topological variables combined in
Neural Network or Fisher discriminant
3. K/ separation (Cherenkov angle / TOF)
4. Time-dependent measurements (only B0/B0) – K–
BaBar
Excellent separation between 1.5 and 4 GeV/c D0 B0 KS
tag side e+ e+ B0
lepton
Coherent B0B0 production from (4S)
boost  ≈ 0.55/0.42 allows t measurement

6. GLW Method
Reconstruct D meson in CP-eigenstates (accessible to D0 and D0)
Theoretically very clean (“golden mode”) to determine 
Relatively large BFs (10-5), small CP asymmetry
 3 Independent measurements (A+R+ = -A-R-) and 3 unknowns (rB, , B)
CP even modes: K+K-, +-
CP odd modes: KS0, KS, KS, KS
Phys. Lett. B253, 483 (1991); Phys. Lett. B265, 172 (1991); Phys. Lett. B557, 198 (2003)

7. GLW Method Results PRL92,202002, 214M BB B-CONF-0443, 275M BB
95  15 events
76  13 events
114  21 events
167  21 events
B-CONF-0443, 275M BB

8. GLW Results Combined D0CP K− BaBar Belle Average (HFAG)
RCP+
0.87 ± 0.14 ± 0.06
0.98 ± 0.18 ± 0.10
0.91 ± 0.12
RCP−
0.80 ± 0.14 ± 0.08
1.29 ± 0.16 ± 0.08
1.02 ± 0.12
ACP+
+0.40 ± 0.15 ± 0.08
+0.07 ± 0.14 ± 0.06
+0.22 ± 0.11
ACP−
+0.21 ± 0.17 ± 0.07
–0.11 ± 0.14 ± 0.05
+0.02 ± 0.12
PRL92,202002, 214M BB
B-CONF-0443, 275M BB
D*0CP K− (D*D0CP0)
BaBar
Belle
Average (HFAG)
RCP+
+1.06 ±
1.43 ± 0.28 ± 0.06
1.24 ± 0.20
RCP−
0.94 ± 0.28 ± 0.06
0.94 ± 0.29
ACP+
–0.10 ±
–0.27 ± 0.25 ± 0.04
–0.18 ± 0.17
ACP−
+0.26 ± 0.26 ± 0.03
+0.26 ± 0.26
PRD71,031102, 123 M BB
B-CONF-0443, 275M BB
− 0.09
− 0.04
No useful constraints on  yet due to small branching ratios and limited statistics.
D0CP K*− (K*-  KS−)
BaBar
Average (HFAG)
RCP+
1.77 ± 0.37 ± 0.12
1.77 ± 0.39
RCP−
0.76 ± 0.29 ± (*)
Belle
ACP+
–0.09 ± 0.20 ± 0.06
–0.02 ± 0.33 ± 0.07
–0.07 ± 0.18
ACP−
–0.33 ± 0.34 ± 0.10 ± (*)
0.19 ± 0.50 ± 0.04
–0.16 ± 0.29
hep-ex/ , 227M BB
hep-ex/ , 96M BB
− 0.14
− 0.33
(0.15±0.10) x (ACP--ACP+)
(*) CP-even pollution in the CP-odd channels

9. ADS Method B–  D0 K– B–  D0 K– K+– K+–
Reconstruct D in final state K - small BF (10-6)
Amplitude:
 Amplitudes comparable in size  large CP violation
Count B candidates with opposite sign kaons!
Phys. Rev. Lett. 78, 3257 (1997)
suppressed
favored
B–  D0 K– B–  D0 K–
K+– K+–
interference
favored
suppressed
PDG, Phys.Lett. B592, 1 (2004)
D : D decay strong phase unknown.
Scan over all values.
2 observables vs
3 unknowns:
rB, , B

10. ADS Method Results BABAR: 227M BB BELLE: 275M BB −3.2 −5.3 −0.009
preliminary
275 M BB
PRL 94,
B+ D0K+
B+ D0K+
N =
N = (2.3)
−3.2
−5.3
RADS =
RADS = ± 0.001
−0.009
−0.014
AADS = ± 0.06
–0.62
preliminary
B+  [D00]D* K+
BELLE: 275M BB
N = −
−0.8
RADS = −
−0.006
No signal
observed!
B+  [D0]D* K+
preliminary
N =
−1.4
RADS =
−0.013
hep-ex/
-0.1
0.1
E (GeV)

11. The smallness of rB makes the extraction of  with GLW/ADS difficult!
ADS Method Results
0 < D < 2 rd ± 1
48° <  < 73°
same,
any 
RADS
# Events
227 M BB
hep-ex/
Belle (90% CL)
B+ D0K+
RADS =
−0.009
275 M BB
PRL 94,
BaBar (90% CL)
B+ D0K+
RADS = ± 0.001
−0.014
DK: rB < 0.23 D*K: r*B2 < (0.16)2
DK: rB < 0.27
@ 90% C.L.
@ 90% C.L.
BaBar RADS  1
The smallness of rB makes the extraction of  with GLW/ADS difficult!

12. GGSZ Method K– D0 B– B– K– D0
Phys. Rev. D68, (2003)
Color-allowed
b c amplitude
Color-suppressed
b u amplitude KS u u K– D0
Vus* + s
Vcs* -
W – b c b c KS
interference
W –
Vub s B– B– K–
Vcb D0 + u - u
Reconstruct D in final state: KS +- (not a CP-eigenstate)
Employs K-K mixing (“cheap” decay-mode: high BF ~2.2x10-5 )
Final state accessible through many intermediate non-CP states. Need Dalitz analysis to separate resonance interferences!

13. GGSZ Method 2 ± = D0 D0 - + KS KS + -
D decay amplitude f consists of sum of many resonances (more on next slide).
Amplitude f parameterized in terms of Dalitz variables m+2 and m-2
Decay rates  of B+ and B- written as: u u - + d d W W c s c s KS KS D0 D0 + - u u 2
± =
Simultaneous fit to D  KS +- Dalitz planes of B+ and B- to extract rB, , and 

14. Isobar formalism, no D mixing, no CPV in D decays
D0  KS + - Dalitz Model
To extract rB and  need high-precision D decay model f (m+2, m-2)
Obtain f (m+2, m-2) using fit to “tagged” D0 sample:
 Use large D*+ D0+ sample. Charge of the pion gives flavor of D.
Isobar formalism, no D mixing, no CPV in D decays
D*+ D0+, 81.5k events from 91 fb-1, purity 97%
hep-ex/
2 = 3824/ =1.25
K*(892)
DCS
K*(892)
0(770)
0(770)
DCS K*(892)
13 resonances (2 ), 3 DCS partners, 1 non-resonant component

15. D0  KS + - Dalitz Model Belle: indentical approach
hep-ex/
Belle: indentical approach
Include two more DCS resonances: K*+(1410) - , K*+(1680)-
13 resonances (2 ), 5 DCS partners, 1 non-resonant component
D*+ D0+, 186.9k events, purity 97%
K*(892)
DCS K*(892)
m+2 (GeV2/c4)
m-2 (GeV2/c4)
0(770)
m-2 (GeV2/c4)
2 =2543/1106
=2.30
m2 (GeV2/c4)
m+2 (GeV2/c4)

16. Dalitz sensitivity scan to 
CA: Cabibbo Allowed DCS: Doubly-Cabibbo Suppressed CS: Color Suppressed
Sensitivity to  (MC)
=75°, =180°, rB =0.125
d2 ln L/d2
CA: D0K(892)*-+
CS: D0KS0(770)
DCS: K0(1430)*+ -
DCS: D0K(892)*+- D0
CA: K0(1430)*+ -

17. GGSZ Method Results
The two plots would be the same without CP violation. Are they?

18. BaBar GGSZ Method Results
hep-ex/ DK
D*0(D00)K
D*0(D0)K
Mode
Signal (events)
B+D0K+
282 ± 20
B+D*0K+ (D*0D00)
90 ± 11
B+D*0K+ (D*0D0)
44 ± 8
m-2 B+ B+ B+
m+2
m-2
BABAR: 227M BB
m+2
m-2 B– B–
m-2
DCS K*(892) B–
m+2
m+2

19. Belle GGSZ Method Results
hep-ex/
DCS K*(892)
- thick black line: with interference - thin grey line: without interference
BELLE: 275M BB
Mode
Signal (events)
Bkg.frac. (%)
BD0K−
209 ± 16
25 ± 2
BD*0K−
58 ± 8
13 ± 2
BD0K*−
36 ± 7
27 ± 5
hep-ex/

20. BaBar GGSZ Method Results
68%
95%
Frequentist CLs
BABAR: 227M BB DK
hep-ex/
preliminary
Frequentist CLs
DK : rB = ± ± 0.034
+0.036
–0.034
B = ( 104 ± )°
+17
+16
–21
–24
D*K : rB* = ± 0.096
+0.030
+0.029
–0.028
–0.026
D*K
B* = ( 296 ± ± 15 )°
+14
–12
 = ( 70 ± ) °
+12
+14
–10
–11
stat.
syst.
Dalitz

21. Belle GGSZ Method ResultsrB
hep-ex/
BELLE: 275M BB DK
hep-ex/
B (deg)
Frequentist CLs
DK : DK
rB = ± 0.08 ± 0.03 ± 0.04
B = ( 157 ± 19 ± 11 ± 21 )°
 = ( 64 ± 19 ± 13 ± 11 )°
rB[D*]
D*K
D*K :
B[D*] (deg)
rB* = ± 0.02 ± 0.04
-0.11
B* = ( 321 ± 57 ± 11 ± 21 )°
D*K
Promising results!
 = ( 75 ± 57 ± 11 ± 11 )°
DK* :
rB(K*) = ±0.09 ±0.04 ±0.08
(*)
-0.18
rB[K*]
DK*
B(K*) = ( 353 ±35 ±8 ±21 ±49 )°
B[K*] (deg)
(*)
 = ( 112 ±35 ±9 ±11 ±8)°
(*)
DK*
Combined result of DK and D*K:
 = (  13  11 ) °
-15
stat.
syst.
Dalitz
(*) Possible bias caused by a contribution from non-resonant B–→ DKS–.
 (degrees)
 (degrees)

22. rB(*) World Average BaBar ADS limit pushing rB down.
0 < D < 2 rd ± 1
48° <  < 73°
same,
any 
[ no improved constraint when adding  from CKM fit ]
RADS
Frequentist CLs
Belle ADS (90% CL)
BaBar ADS (90% CL)
Belle Dalitz
BaBar Dalitz
Using GLW, ADS, GGSZ results
Bayesian CLs
rB [BDK]
68%
95%
BaBar ADS limit pushing rB down.
Belle Dalitz value (0.21) relatively large.
0.10  0.04
0.09  0.04

23. CP violation in B0  D(*) /
CP violation through B0-B0 mixing and interference of amplitudes:
 CP violation proportional to ratio r of amplitudes
Small: r  |V*ubVcd / VcbV*ud|  0.020
 Large BF’s, at level of 1%
 No penguin pollution  theoretically clean
Relative weak phase  from bu transition
Relative strong phase 
Suppressed amplitude
through
b  u transition
Favored amplitude
u,c,t
u,c,t
Strong phase
difference
CKM Unitarity Triangle  g

24. sin(2+) from B0  D(*) /
Time evolution for B0 decays and B0 decays (Rmix) to D(*)/:
CP asymmetry: small sine terms
 Need S+ and S- together to give (2+) and 
From D(*)/ sine coefficients, 4 ambiguities in (2+)
Express result as |sin(2+)|
SM: sin(2+) ~ Factorization theory:  is small
SMALL sine terms

25. sin(2+) Caveat: determination of r(*)
Simultaneous determination of sin(2+) and r(*) from time-evolution not possible with current statistics  need r(*) as external inputs !
Estimate r(*) from B0  Ds(*)+-/- using SU(3) symmetry [1]
Using: 
[1] I. Dunietz, Phys. Lett. B 427, 179 (1998)
SU(3)
[2]
Inputs used in CKMFitter/ UTFit :
r(D) = ± 0.004
r(D*) = ± 0.006
r(D) = ± 0.006
We add 30% theoretical errors to account for:
Unknown SU(3) breaking uncertainty
Missing W-exchange diagrams in calculation
Missing rescattering diagrams (Can be estimated with B0Ds(*)+K-)
no theoretical errors included
[2] fD : decay constants

26. BaBar: Inclusive B0  D* 
BABAR: 227M BB
Using a,b,c parametrization:
D* partial reconstruction:
fast
Tag side interference:
r’, ’ are the ratio and phase difference between the bu and bc amplitudes in the Btag decay. r’0 in lepton tags.
PRD68,
lepton tags
- High statistics!
- Large backgrounds
preliminary
hep-ex/
preliminary
lepton tags
peaking D*
kaon tags
combinatoric BB
other peaking BB
continuum
18710 ± 270 lepton tags ± 660 kaon tags

27. Belle: Inclusive B0  D* 
hep-ex/
preliminary
BELLE: 152M BB
Belle: only uses lepton tags (no tag-side interference)
sum
signal
bkg.
Same Flavor: mixed events
Opposite Flavor: unmixed events
8322 signal lepton tags

28. BaBar: Exclusive B0  D(*) /
BABAR: 110M BB
Phys.Rev.Lett. 92:251801(2004), 88 M BB
Exclusive reconstruction of channels:
- B  D 
- B  D* 
- B  D    
- Full reco.: ~10x less efficient; far lower backgrounds
- Same sensitivity to sin(2+) as inclusive approach
lepton tags
hep-ex/
preliminary

29. Belle: Exclusive B0  D(*) 
PRL 93 (2004) ; Erratum-ibid. 93 (2004)
BELLE: 152M BB
Exclusive reconstruction of channels:
- B  D 
- B  D* 
Uses B  D*l as control sample for tag-side interference  
cleanest tags
(*) After tagging and vertexing

30. No clear CP violation yet!
HFAG on |sin(2+)|
HFAG Averages:
No clear CP violation yet!

31. Combined Limit on |sin(2+)|
Bayesian CLs
68%
95%
Combined limit on |sin(2+)| :
Assuming 30% error on r(*) for SU(3) breaking:
CKMFitter: |sin(2+)| > 68% C.L.
UTFit: |sin(2+)| > 68% C.L.
Frequentist CLs

32. Outlook
Many approaches to measure  have been investigated by BaBar and Belle.
GLW and ADS methods don't provide strong constraints on  when considered alone. Current experimental results favour small values of rB. GGSZ results are promising!
GLW+ADS+GGSZ:
CKMFitter:  = [ ]°+ n
UTFit:  = [ 64  18 ]°+ n
sin(2+) from D(*)/:
CKMFitter: |sin(2+)| > 68% C.L.
UTFit: |sin(2+)| > 68% C.L.
GLW+ADS+GGSZ+sin(2+):
CKMFitter:  = [ ]°+ n
All results are in good agreement with the global CKM fit ( = [ 60  6 ]°)
All decay modes can use lots more statistics! High statistics expected in next years may allow BaBar and Belle to measure  to < 10°.
-13
Using GLW, ADS, GGSZ results
 (deg)
 = 64 ± 18 95% CL)
-14

33. B A C K U P
slides ...

34. BaBar: Removing the Imaginary (?) 

35. Belle GGSZ: Systematic Errors

36. B  D*-+ time-dependent evolution
a) unmixed
B0(t)
D*-+ B0
Initial state
Flavor eigenstate
b) mixed B0
With bu transition
No bu transition
B0(t) B0
Initial state
Flavor eigenstate
D*-+ b) a) b) a)
B  D*-+
pure cosine: r = 0
- plus sine term,
5x the expected
size in data
r = 0.1,  = 0
sin(2+) = 1
B  D*-+
- pure cosine: r = 0
CP asymmetry: small additional sine term
Smallness of amplitude ratio r greatly reduces sensitivity to sin(2+)

37. () Dependency on rB
BaBar and Belle show quite different sensitivities to 
Both find quite different values for rB (BaBar: ~0.12, Belle: ~0.21)
Different sensitivity to  caused by dependency on rB .
Toy MC Studies
Comparing only results of BDK
stat.
Sensitivity to  very dependent on critical parameter rB (~0.1)!
BaBar
Belle
rB [DK]