Experimental Results on Flavour Oscillations and CP-Violation Prafulla Kumar Behera (on behalf of the BABAR Collaboration). TheUniversity ofIowa,IowaCity, USA.E-mail:[email protected] 30yearsagoM.KobayashiandT.Masakawa(wontheNobelPrizeinphysics2008fortheirfamous theory), gave a theory to explaining CP violation. This theory predicted that large CP violation would be observed in B mesons . In the last 10 years, Both the B-factories (BABAR at Stanford Linear Accelerator Center, USA and Belle at KEK, Japan) have observed large CP violation as predicted by the KM mechanism. The ground breaking experimental results of Flavor Oscillation and CP violation in B and D mesons are summarized and compared with the Standard Model expectations. 9 I. INTRODUCTION 0 0 TheoriginofCP violationintheStandardModel(SM) 2 is contained in a complex phase within the Cabibbo- n Kobayashi-Maskawa(CKM) matrix [1]. With one single a phase, the SM predicts clear patterns for quark mixing J and CP violations, to be satisfied by all processes. The 1 unitarity relation V V∗ +V V∗ +V V∗ = 0 among 1 ud ub cd cb td tb the elements of the first and third columns of the CKM ] matrix is represented in the complex plane by a Unitar- ex βity=Triaanrgg[leV(UTV)∗w/VithVa∗n]g,leγs α==aarrgg[[−VVtdVVt∗∗b//VVudVVu∗∗b]]., FIG. 1: Asymmetric energy e+e− collision at Υ(4S). - − cd cb td tb − ud ub cd cb p The angle β, which is the phase of V and appears in td e B0 B0 mixing, induces mixing assisted CP violation h first−observed by BABAR and Belle in the B0 J/ψK0 of the Υ(4S) resonance in the e+e− rest system. Since [ → S decays in 2001. the B flight length in x-y is only 30µm as compared 1 The B-Factorieshavedemonstratedthat CP violation to 200µminz-direction,theapp∼roximationδr=δz= v intheB mesonsystemisconsistentwiththeSMdescrip- z ∼-z canbemade,wherez andz arethezdecay 6 tion given in Eq.[1]. vceprtexteasgof the taggedB with mtageasuredcpflavorand z is 6 cp 4 the CP-eigenstate vertex measured. Since flavor has to A (δt)=S sin(δm δt) C cos(δm δt). (1) 1 CP f d − f d be conserved in the BB system, at any given moment . whenthe taggedB is identified,the otherB hasto be of 1 whereδtisthedifferencebetweentheproperdecaytimes theoppositeflavor,asshowninFig.1,clockedasδt=0. 0 ofthetwomesonsandδm isthemassdifferenceoftheB 9 d Furthermore,becauseoftheasymmetricnature,thesep- mesonmasseigenstates[52]. ThesineterminEq.1comes 0 arationdistancebetweenthe twodecayvertexesmakesa fromthe interferencebetween directdecayanddecay af- : good measurement of the decay distance possible; since v ter a B0 B0 oscillation. A non-zero cosine term arises Xi fromthe−interferencebetweendecayamplitudeswithdif- the20B0flµimghitnlze-ndgitrhecitnioxn-,ythiseoanplypr∼ox3im0µamtioansδcro=mpδazr=edzto r ferent weak and strong phases (direct CP violation) or ∼- z can be made (Fig. 1). BABAR and Belle collectecdp a from CP violation in B0 B0 mixing, where the latter tag − a total of 531 fb−1, and 850 fb−1, respectively with is predicted to be small in the SM and has not been ob- BABAR concluding its data∼taking in April 2008. served to date. The presence of new physics beyond SM could in general change this picture; for this reason it is very important to over-constrain the UT, making many III. MEASUREMENTS OF β independent measurements looking for inconsistencies in the SM. A. sin2β from b→¸cs II. ASYMMETRIC ENERGY e+ e− COLLISION InterferencebetweenB0 f andB0 B0 f leads AT Υ(4S) to time-dependent asymme→try Eq[1]. T→he J/→ψK0 and S b ¸csdecays(J/ψK0,ψ(2S)K0,χ K0,η K0,andJ/ψ Study of time-dependent CP violation requires large K→∗) provide theoreticLally cleanSmeca1surSemecntSs of sin2β. datasamplesofBmesondecayswithprecisedecaylength They are dominatedby a single decay amplitude and S f measurements. The asymmetric energy e+e− colliders, = sin2β for J/ψK0. Extending to other b ¸cs decays, S → PEP-II and KEKB, operating at Υ(4S) facilitates this we obtain sin2β = -η S . The SM corrections to this f f measurementbyprovidingpairofBBfromstrongdecays relation are believed to×be very small and (10−4) [5]. O 2 Events / ( 0.4 ps )Events / ( 0.4 ps )Raw asymmetryRaw asymmetry--242400000000....0000005555 BB 00 ttaaggss ab)) athnesdindB2eβc0a→ycaBnDC0(b.∗e)+pJDs/oiψn(t∗e2π)n−β0tifdairsleolcfymraoymmsb.e→aaMscucacordilenoddrc-eisoncunaptyBrpsir0beus→tsieodnJi/nfψrtoeπmr0- Events / ( 0.8 ps )Events / ( 0.8 ps )442255220055 BB 00 ttaaggss c) insaldospmeicntaatteodr b→tryeecodlioargraallmowwedhilteretehediBag0ra→m.DT(∗h)+eDw(e∗a)−k Raw asymmetryRaw asymmetry--0000....005555 d) Spash=ainsesitnoh2feβtbhien→CabcKcsMsendcmeecaoatfyrspix;eonengleeumiwne-onmuteldidniveaoxtlepvdeecdctoiCnsttr=hibeu0staiaomnndes --55 00 55 DD t t [[ppss]] in SM. The time dependent measurements of the decay 0.5 ps340000 (d) B0 → J/y K0 qq==+- 11 aJ/nψdπC0=by B0e.0ll8e ex0p.1e6rim0e.n0t5a[1re2]S. T=he−b0r.6a5nc±hi0n.g21fr±ac0ti.o0n5 es / 200 ofB0 J−/ψπ0±canbe±usedtoconstrainpossiblepenguin ntri100 contrib→utions to the SU(3)-related decay J/ψ K0 [13], E 0 S y andis measuredto be (J/ψπ0)=(1.69 0.14 0.07) metr0.5 10−5. RecentlyBABARBmeasuredS = 1.±23 0.±21 0.0×4 Asym-0.05 awnhdicChc=or−re0sp.2o0n±ds0t.o19a±4σ0.e0v3idfeonrcCePfo-re−vCePn vB±io0la→tioJn±/ψ[1π40],. -7.5 -5 -2.-5x D 0t(ps2).5 5 7.5 BABAR’s measurement is consistent with Belle’s result. f The decay B0 D(∗)+D(∗)− is a Vector-Vector (VV) → FIG.2: Topfigureshowsthebackgroundsubtracted∆tdis- final state. It can have contributions from L = 0, 1, 2 tribution and the symmetries for events with good tags for angularmomentumstatesandthereforetobothCP-even BABAR and thebottom figure for Belle (B0 →J/ψK0). and CP-odd components. It is necessary to measure the S CP-odd fraction R , and then to take into account the ⊥ dilution due to the admixture. Belle’s preliminary re- sult [16] of R =0.116 0.042 0.004 and CP parame- The latest measurement from BABAR [6] are sin2β= ⊥ ± ± ters: S = 0.93 0.24 0.15andC = 0.16 0.13 0.02. 0.670 ± 0.031 ± 0.013, C = 0.026 ± 0.020 ± 0.016[53]; The publi−shed B±ABAR±measurement [1−5] fou±nd a c±onsis- the δtdistributionandthe measuredrawasymmetryare tentvalueofR =0.143 0.034 0.008andCP parame- shown in Fig. 2. Belle recently updated their results as ⊥ ± ± ters: S = 0.66 0.19 0.04andC = 0.02 0.11 0.02. shown in Fig. 2 and obtained sin2β = 0.642 0.031 − ± ± − ± ± 0.017, C = 0.018 0.021 0.014 [7]. The n±ew BABA±R Belle claims a 3.2σ evidence of direct CP violation in and Belle averagei±s sin2β =±0.657 0.025using J/ψK0 B0 → D+D−; S = −1.13 ± 0.37 ± 0.09 and C = decay. Belle has updated their resu±lts for the ψ(2S)KS0 n−o0t.9s1u±pp0o.r2t3ed±b0y.06BA[1B7A]R. ’Tshmiseaissuurneemxepnetct[e1d8]i.n SBMothanodf decaymode [8], using 657× 106 BB pairs,with sin2β = the measurements from BABAR are consistent with the 0.718 0.090 0.033andC = 0.019 0.020 0.015; ± ± ± ± SM prediction of tree dominance [19] and therefore with both are in goodagreementwith the B0 J/ψK0 mea- → S theresultinb ccs. Proposednewphysicsmodelscould surement. → causesizablecorrections[20];itisthereforeimportantto reduce experimental uncertainties further. B. Four-fold ambiguity of β IV. MEASUREMENT OF α There remains a four-fold ambiguity for the value of The angle α is measured with a time-dependant anal- β, 21.70, (21.7 + 180)0, 68.30, and (68.3 + 180). One ysis of decays of neutral B mesons, B0 h+h−, with h approach for resolving this ambiguity is to measure = π,ρ, a . These are sensitive to an effe→ctive parameter 1 cos2β, using a time-dependent angular analysis of B0 α due to the interplay of the Tree and the Penguin J/ψK∗0(K0π0) and B0 D0π0. BABAR [9] perform→ed dieafgframs. Hence, Onecandetermine α α [21] using this analysSisusingusing→88 106 BB pairsandobtained isospin relations in the decays B0 h+−h−e,fBf0 h0h0, cos2β = 2.72+−00..0759 ± 0.27×(sin2β = 0.731). A similar and B± → h0h±. The procedu→re of measur→ing the analysiswasperformedbyBelle[10]using275 106BB so-called “isospin-triangles” requires large dataset and × pairsobtainingcos2β =0.87 0.74 0.12(sin2β =0.726), leaveswith up to eight-fold ambiguities. A less stringent theerroronmeasurementis±toola±rgetoresolvethefour- relation sin2(α α ) < (B h0h0)/ (B h0h±) eff − B → B → fold ambiguity. Belle’s recent measurement of a time- holds [22],whichismoreaccessiblewithcurrentdatasets dependent Dalitz analysis of B0 D0π0 [11] disfavors thantheisospinanalysisasitdoesnotrequiretotagthe the 68.30 solution. → flavor of the decaying B. 3 1 - C.L. 10..281 (b) 0.18 Belle pewnliittchaatmperdpelsiietnunvdtoelsvst.iantIgitstpciaecnns.tnaIogttownbaaesls,rohelvloawetdieovfnoesrrh,tiphpoeia1nm2teoudnngokundtoiffw[2en9rs-] 00..46 1 - C.L.00..46 that the variation of the strong phase of the interfering ρ resonance in the dalitz plot provides the necessary de- 0.2 0.2 greesof freedomto constrainα with only the irreducible 0 0 50 100 a (d1e5g0rees) 00 30 6f02 (de9g0ree1s2)0 150 180 (pαerf→ormαed+tπh)isaamnabliygsuiistya.ndTmheeaBsuArBeAdRαe=xp(e8r7im+4e5n)t0 t[3h0u]s. −13 FIG. 3: Left Fig:α expressed as one minus the confidence Belle [31] performed this analysis resulting in a tighter level as afunction of angle. Anupperboundon δαof 390 at constraint of 680 <α<950 at 95% C.L for the solution the90% CL. The curveshows thebounds on α using isospin compatible with SM. method alone, while theshaded region shows the result with SU(3) requirement. Right Fig: same values from Belle using iBsoBsp→inπaπnadlyesciasya.ndSodliirdecltinCePanadsymdamshetrliyneininBd0ic→ateπs0πC0.Lan=d D. α from B→a1π 68.3% and 95%, respectively. The analysis of the decay B0 a±π∓ where a± π∓π±π± has been used to extrac→t α1with a quasi-1tw→o- A. α from B→ππ bodyapproximation. BABAR[32]performedthis analysis using349 fb−1ofdataandmeasuredα =(78.6 7.3)0, eff ± with no evidence for the direct or mixing induced CP The decay B ππ can be used to extract sin2α. BABAR [23] and →Belle [24] performed an isospin anal- vtiioonlastifoonr. SUO(n3c)e-retlhaetemdedaescuaryems e(nBt+s of braa+n(c1h2in7g0)πfraocr- ysis to extract α, using the available information B+ a−(1260)K+ andthe decaysB →K1(1270)π and (S+−,C+−,C00,B+−,B+0,B00), shown in Fig. 3. The B →K1(1400)π) become available, qu→antit1ative bounds preferred value of α=(96+10)0 for BABAR, which is con- → 1 −6 on δα obtained with method [33] will provide significant sistent with Belle measurement of α=(97 11)0. constraints on the angle α through the measurement of ± α in B0 a±(1260)π∓ decays. Recently BABAR [34] eff → 1 performed an analysis to measure these decay modes to B. α from B →ρρ constrain α α . Theyobservedthechargedandneu- eff | − | traldecaymodesforthefirsttimeandfoundnoevidence InB0 ρ+ρ− decays,aspinzeroparticle(theB0 me- for direct CP asymmetry. son) deca→ys into two spin 1 particles (ρ± mesons). Each ρ± mesondecaysinto a π±π0 pair,where the quarkcon- tent of the final decay product is similar to ππ. The V. MEASUREMENT OF γ presence of a π0 in the final state adds to experimen- tal challenge of the measurement. The CP analysis of At the beginning of the B-Factory (e+e− Υ(4S) B0 ρ+ρ− is further complicated by the presence of BB) era, it was thought to be not possible→to measu→re → one amplitude with longitudinal polarization and two γ and it could only be measured at hadron collider like amplitudeswithtransversepolarization. Thedecayisob- CDFandD0. Latterseveralmethodshavebeenpursued servedto be dominated by the longitudinal polarization. using different common decay modes such as CP eigen- There is good agreement between the measurements in states(Gronau,London,andWyler(GLWmethod)[35]), ρ+ρ− from BABAR [25] and Belle [26] for CP violation. suppressed Kπ charge combinations (Atwood, Dunietz, The HFAG average for the longitudinal components are andSoni(ADSmethod)[36]),andK0π+π−decays(Giri, Cρ+ρ− = 0.06 0.13,Sρ+ρ− = 0.05 0.17. Forthefirst Grossman, Soffer, and Zuppan (GGSSZ method) [37]). time, BAB−AR [2±7] showed a prel−imina±ry time-dependant measurement of B0 ρ0ρ0 decay. Using 427 106 BB pairs, BABAR measur→es (B0 ρ0ρ0) = (0.84× 0.29 A. The GLW method 0.17) 10−6,f =0.70 B0.14 →0.05,S =0.5 ±0.9 0.±2, L L × ± ± ± ± C =0.4 0.9 0.2. Consistently,Belle[28]setanupper limLit of ±(B0 ± ρ0ρ0)<1.0 10−6 at a 90% confidence In the GLW method, CP eigenstates with even or level (C.BL). → × odd parity Dc±p are obtained final states common to D0 and D0. The branching fractions ± , − , and BCP± BD0 + have been measured[54], where the observables BD0 C. α from B →ρπ are constructed from their ratios, such as RCP± ( − + + )/( − + + )/2 and A± ( − ≡ BCP± BCP± BD0K BD0K CP ≡ BCP± − The decay B0 π+π−π0 can be used to measure the + )/( − + + ). BABAR [38] published a mea- angle α, in princi→ple however this is not a CP eigenstate sBuCrPe±mentBCoPf±B± BCPD±∗K±, with decay modes D∗0 decay. Performing an isospin analysis is extremely com- D0γ,D0π0, and →D0(D0) reconstructed in CP-even→( 4 the K0π− and K0π+ for λ= 1 for D∗ D0γ and +1 S S − → forotherdecays,respectivelyand ( )aretheam- D+ D− plitudes of the D0(D0) K0π+πA− decAay. These decays → S are describedin a detailedmodel involving severalinter- mediate resonancesextracted fromlargecontrolsamples of flavor-tagged D∗+ D0π+ decays produced in cc events. The Cartesian→variables x∗ = r∗ cos(δ∗ γ), y∗ = r∗ sin(δ∗ γ) are used by∓the eBxperimBen∓ts to av∓oid thBe bias Br∗∓being positive definite. Belle recon- B structed the decays B∓ D∗0K∓, with D∗0 D0π0 FIG. 4: Left Fig: For BABAR, 1− CL as a function of γ and D0 K0π+π−, an→d measured r = 0.16→ 0.04, including statistical and systematic uncertainties and their r∗ = 0.2→1 0.S08 and γ = (76+12)0 [40B] using 657± 106 correlations. Thedashed(upper)anddotted(lower)horizon- B ± −13 × BB pairs. BABAR recently published a result based on tal lines correspond to the one- and two-standard deviation 383 106BB pairs[41]. Inadditiontothemodeusedby intervals, respectively. Right Fig: For Belle, Projections of confidence regions for B+ → D∗K+ mode onto the (r, γ) Bell×e, BABAR also reconstructed the decays D∗0 D0γ, planes. Contours indicate projections of one, two and three B± D0K∗±[K0π±], and D0 K0K+K−.→BABAR standard deviation regions. deter→mines the (x,Sy)∗ parameter→s witSh the same accu- ∓ racyasBelle. BABARdatafavorssmallerr values(r = B B 0.086 0.035,r∗ =0.135 0.51,kr =0.163+0.088)[55] , ± B ± S −0.105 K+K−,π+π−), CP-odd (K0π0,K0ω,K0φ), and flavor- and thus a larger error on γ ( γ = (76+23)0. The result S S S −24 s0p.0e9cific0m.0o1d,esA(CKP+−π+=).+T0h.e0y6obt0a.i1n0edA0C.P0+2,=R−CP0.+11=± faonrd(xB,eyll)e∓airnetshheowBn∓in→FDig0.K4.∓ decay mode from BABAR ± ± ± 1.31 0.13 0.04, R = 1.10 0.12 0.04. The CP− ± ± ± ± accuracy of this measurement does not allow a determi- nation of γ with GLW method alone but it contributes to improving the overall precision when combined with other methods. VI. SIN2β FROM b→qqs PENGUIN DECAYS The decay B0 φK0 is dominated by a penguin dia- B. The ADS method gram. The SM am→plituSde is expressed by Decays with similar overall amplitudes are selected to P V∗V Pu+V∗V Pc+V∗V Pt (2) maximizetheinterferenceandthereforesensitivitytoCP ∼ ub us cb cs tb ts V∗V (Pc Pt)+V∗V (Pu Pt) (3) asymmetries. Favored B D decays followed by sup- ∼ cb cs − ub us − → pressedD decays,or vice-versaprovide anidealdata set forthesestudies. Itispossibletodefinearatioofbranch- Where V∗V can be eliminated using one of the CKM tb ts iBaB2nnrBBgd→+fr→rDaCDscsPuitsnpiuoKγpanKs/ssiB+ynom)δBf/→sm(/uBDeRpBtfpra−rive→eKssDs.esa=duspaBKrnADe2−dlAle+fDa+Sv[r3oB29r=e]Bd+Brde+(2ce→BrecDnBaDty−rslsuBy→pacKDsop+ssRuuγ)bpAcKlDois−sShδeB=−=d, Ouifidnr(esiAnttatλtirc4eiat(ryρmlt−,roeObliaη→(t)Ai)oλincsc2sss),u,aVpcncp∗obdrVneltcessaasie+dndssVctCouo∗bmKsViMpnuas2rβ+ee.ldeVTmttoh∗beVentthtssseec=fiwornhs0ditc.thteeTrrammhree,. D B B ADS For other b s penguin modes, there are additional mDe→asuKre+mπe−n,tsbasoefdtohne65d7ec×a1y06cBhaBinpaBir−s. T→hey dDoKn−ot, tsimonallfrcoomntrbibut→iuontsr.eeFdoriaBgr0am→, η′K(AS0λ,4f(0ρKS0,iηa))c,onctarnibbue- observeastatisticallysignificantsignalinthesuppressed → O − mode, obtaining RADS = (8.0+−65..37+−22..08) × 10−3, and ptrriebsuetnito.nTfrhoemBt0he→bπ0KuS0traeneddiωaKgrS0amca.nInalasdodhitaivoen,athcoense- A = ( 0.13+0.97 0.26). These results are used to → ADS − −0.88± modes contain b sdd instead of b sss. Considering set a 90% C.L upper limit of rB <0.19. these effects, the→SM corrections up→to (λ2) 5% can O ≡ bepossibleintheextractionofsin2β andthemagnitudes of corrections can vary in different modes [42]. A larger C. GGSZ method deviationexceedingthesecorectionswillbeanindication of new physics in penguin loops. ThethreebodydecaysofD0 andD0 suchasK0π+π− Individual results from BABAR and Belle, as well as S or K0K+K− depend on the interference of Cabibbo al- theiraveragesforeachdecaymode ofb spenguinand S lowed, doubly-Cabibbo suppressed, and CP eigenstate, most recent sin2β from b ccs [43], sho→wn in Fig. 5 are decayamplitudes. TheB± D0(D0)K± amplitudecan mutually consistent. All s→in2β measurements, except → eff wbehewrreitmte2n aasndA∓(m∗)2(ma2−re,mth2+e)s∝quAarDe∓d+invλarrB∗iaeni(tδB∗m±aγs)sAeDs±of, φvaKluS0e, πof0πsi0nK2βS0,=an0d.6K7+K0−.0K20fraorme wbithicncs∼. 1σ from the − + ± → 5 CDF Run II L = 1.0 fb-1 sin(2b eff) ≡ sin(2f eff) HHFFAAGG 1 CKM2008 1 b→+-000000ppwph¢K K K K K K KSScc000fprfs Kf K KK K K KS0SSSSS WBBABBABBABBABBABBABBABBABABBAaevaevaevaevaevaevaevaevavaevoeeeeeeeeeeBlBlBlBlBlBlBlBlBBllllllllllreeeeeeeeerrrrrrrrrrlaaaaaaaaaadaaaaaaaaaarrrrrrrrrr ggggggggggAeeeeeeeeeeveragHFAGe CKM2008 HFAGHFAGHFAGHFAGCKM2008HFAGHFAGCKM2008CKM2008HFAGHFAGCKM2008CKM2008CKM2008HFAGCKM2008HFAGCKM2008CKM2008CKM2008000...666148-- 0000000000++±--..........0000 2563561874....002212P67405716232495..51R 0±±±±±±±±±±±±55.E- 9 0000000000000000000+±L-0...................00 I2013234074657548500 ..000000000M22+-680201681979475229969.........00I646666990 ..N12±±±±±±±±±±±±±±±±±±±±74340277380 A 00000000000000000000++++++++++----------R....................0000000000000000000000000000000001124001....................Y231112111111050500212324838738927774178022787158691332323413 foFaosnIrcGdila.ullaln6t:cidoeLenrAmplitudeUct.123a-a-2p010000yinp0temires 1 oddde.saa6afindtt4tsaaavg5ie t––– ies5uvs i111rtry.. ss66:ec 44u255o5s s.ssm8h (tps1obshta0-1wtie.n osBnelydt)s0h.-1Be5L0smoowesaec2sri0ullrapetlddsoiiaogttnana2:iDfi5mcmfaTrnspc e(ehlpq=ies1tu%-u31e)l0donegcayvra∆itlhummess -2 -1 0 1 2 FIG. 5: Summary of effective sin2β measurement in b → s rived V /V =0.2060 0.0007(exp)+0.0081(theor),and decay modes, compared to the world average sin2β value in | td ts| ± −0.0060 found no evidence of CP violation. The D0 [48] experi- b→c¸s. ment also measured a stringent limit of 17 < δm < 21 s ps−1 at 90% C.L with 1 fb−1. ∼ VII. CP VIOLATION IN BB MIXING IX. MIXING AND CP VIOLATION IN THE D0 SYSTEM The SM allows CP violation in BB mixing itself in analogytoǫ inK0 system[44]. Thisleadsto q/p = 1, k | |6 The D0 system is unique among the neutral mesons where p and q are the coefficients relating the mass and becauseitistheonlyoneinwhichmixingproceedsviain- flavor eigenstates of the neutral B mesons, because M 12 termediatestateswithdown-typequarks(up-typequarks and Γ have different phases. In SM we expect the ob- 12 insupersymetricmodels). TheD0-D0rateisexpectedto servable effect to be 1 − |pq|2 ≃ Im(MΓ1122) ∼ O(10−3). besmall(10−4 orless)inSM.BABAR[49]foundevidence Observation of a significantly large effect would be an of D0-D0 mixing in the variationin decay time distribu- exciting result. BABAR [45] has measured |pq| − 1 = tionfor D0 K+ π− comparedto thatofthe Cabibbo- ( 0.8 2.7 1.9) 10−3 using 232 106 BB pairs. favored deca→y D0 K− π+. Belle [50] also found evi- B−elle [4±6] me±asured×q =1.0005 0.00×40 0.0043. The dence of D0-D0 m→ixing with 3.2σ using 540 fb−1 data. |p| ± ± results from BABAR and Belle are consistent with unity. More recently the CDF [51] has found evidence for mix- This implies that CP violation in B0-B0 mixing is be- ing in D0 decays. No evidence for CP violation is found low the (10−2) level. These measurements are already by BABAR, Belle, and CDF experiments. O limited by their systematic uncertainties. X. SUMMARY VIII. MIXING AND CP VIOLATION IN THE B0 s SYSTEM The B-Factories have observed CP violation in sev- eral B decays. All categories of CP violation in B de- The determination of B0- B0 oscillation frequency re- cays are consistent with SM expectations. The preci- s s lated to ∆m can be used to extract the magnitude of sion of sin2β measurements is now measured to better s V , one of the nine elements of the CKM matrix. The than 4% and significantly constrains the UT. The decay ts CDF experiment [47] reported an observation of B0- B0 B ππ,ρρ,ρπ,anda π areusedtostudy α. The decay mixing, measuring δm = 17.77 0.10 0.07 ps−1swiths ρ+→ρ− gave stringent c1onstraint on α. There are other s a data sample of 1 fb−1 from pp¯±collisio±ns at √s = 1.96 decays which are being investigated and hopefully will TeV. The amplitude values and B0 B0 oscillation fre- contribute to the measurement of α. At the begining quency∆m areshowninFig.6,ansd−itissconsistentwith of the B-Factory (e+e− Υ(4S) BB) era, it was s → → the SM expectation. Using this value of ∆m they de- thought to be not possible to measure the angle γ. The s 6 dalitz analysis of B± D0K± has the best sensitivity served in B0-B0, B0-B0, and D0-D0. Constraints on forγ. Thedecayb s→penguinisofprimefocusbecause both ∆Γ and ∆m fosr Ds0-D0 mixing will allow further → of sensitivity to physics beyond SM. studiesofCP violationwhichremainsapotentialground Mixing but no evidence of CP violation has been ob- for observing New Physics. [1] N. Cabibbo, Phys. Rev. Lett. 10, 531 (1963); M. [29] H. R. Quinn and A. E. Snyder, Phys. Rev. D 48, 2139 Kobayashiand T. Maskawa, Prog. Theor. Phys. 49, 652 (1993). (1973). [30] B. Aubert et al., the BABAR Collaboration, Phys. Rev. [2] R.M.Barnettetal.,ParticleDataGroup(PDG),Review D 76, 012004 (2007). of Particle Properties, Phys. Rev.D 54, 1 (1996). [31] A. Kusaka et al., Belle Collaboration, Phys. Rev. Lett. [3] B. Aubert et al., (BABAR Collaboration), Nucl. Instr. 98, 221602 (2007). Methods Phys.Res., Sect.A479, 1 (2002). [32] B. Aubert et al., the BABAR Collaboration, Phys. Rev. [4] A. Abashian et al., the Belle Collaboration, Nucl. Instr. Lett. 98, 181803 (2007). Methods Phys.Res., Sect.A479, 117 (2002). [33] M. 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Aubert et al., the BABARCollaboration, ture. arXiv:0708.1630[hep-ex] [53] Here and in the following, unless otherwise noted, the [28] TheBelleCollaboration,LaThuile2008preliminary,un- first error is statistical and the second one systematic, published. they are combined if only one error is given 7 [54] The superscripts refer to the charge of the B, the sub- [55] The amplitude ratio B± → D0K± events is described scripttotheCP parityoftheDeigenstateDC±P ortothe by krS, with k taking in to account non-resonant KS0π± flavorof te D for flavor-specificdecays respectively. contributions.