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Inclusive decays at order v 7 International Workshop on Heavy Quarkonium

Inclusive decays at order v 7 International Workshop on Heavy Quarkonium Brookhaven National Laboratory. Phenomenological Motivation. P-wave charmonium inclusive decays Electromagnetic width: error on c c0  gg reduced to 20% error on c c2  gg reduced to 10%

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Inclusive decays at order v 7 International Workshop on Heavy Quarkonium

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  1. Inclusive decays at order v7 International Workshop on Heavy Quarkonium Brookhaven National Laboratory

  2. Phenomenological Motivation • P-wave charmonium inclusive decays • Electromagnetic width: error on cc0  gg reduced to 20% • error on cc2  gg reduced to 10% • Hadronic width: error on cc0,2  l.h. reduced to 10% • The ratios of electromagnetic and hadronic widths are clearly sensitive to the NLO corrections in as(M); but, being for charmonium systems as(M) ~ v2 ~ 0.3, the relativistic corrections are of the same order of the pertubative ones and, potentially, of 30%. • Vector S-wave charmonium and bottomonium decays into leptons and light hadrons • The J/y and  electromagnetic decay in two leptons and the hadronic decay in light hadrons are both known with an error less than 5%. The y (2S) and (2S) decays are known with an accuracy of ~ 5% • Corrections of order v4 , as(M) v2 and a2s(M) are needed to reach the same accuracy. • Pseudoscalar S-wave charmonium into two photons or light hadron • hc electromagnetic decay in two photons is known with an accuracy 35% • hc hadronic decay in light hadrons ~ 15%. For reference: G. T Bodwin and A. Petrelli, Phys. Rev. D66, 094011 (2002) J.P. Ma and Q. Wang, Phys Lett. B537, 233 (2002) R. Barbieri, G. Curci, E. D’Emilio, E. Remiddi, Nucl. Phys. B154, 535 (1979) (electro coefficients, NLO) R. Barbieri, M. Caffo, R. Gatto, E. Remiddi, Phys. Lett. B95, 93 (1980) (hadronic coefficients, NLO) J.P. Ma and Q. Wang, Phys Lett. B537, 233 (2002) A. Vairo, Mod. Phys. Lett. A19, 253 (2004) Our calculation use a different power counting

  3. NRQCD Decay widths – Power Counting • NRQCD provides the theoretical framework for the study of electromagnetic and hadronic inclusive G. T. Bodwin, E. Braaten and G.P. Lepage, Phys. Rev. D51, 1125 (1995) • The matching coefficients • are evaluated comparing scattering amplitudes in QCD e NRQCD • have an expansion in as(M) • The matrix elements of four fermion operators • have an expansion in the velocity of the heavy quark. • Power Counting • In NRQCD several different scales are still dynamical: Mv (momentum of the heavy quark), E ~ Mv2 , LQCD . • The matrix elements of four fermion operators will receive contributions from these different scales, so it is impossible to give them a definite power counting. • We choose a “conservative” power counting: each operator of mass dimension d scales as (Mv)d. • Further suppression come if we consider operators acting on subleading component of the quarkonium Fock state

  4. S-wave decay into The contributions up to order v7 to the 3S1 decay into e+e- are: • relativistic corrections to the dimension 6 and 8 operators • spin flip operators of mass dimension 8 containing a chromomagnetic field • operators of mass dimension 9 containing a chromoelectric field ~ v ~ v2 • The set of operators defined in this way is not minimal, and through a field redefinition it is possible to • eliminate from the NRQCD Lagrangian the operators T8(0,2)(3S1), writing them as linear combinations of the operators of mass dimension 10. The decay width reads: ~ v3 ~ v

  5. S-wave and P-wave decays in gg With the same analysis done for the S-wave decays into leptons, we find that the decays width of a pseudoscalar quarkonium into two photons is given by: The contributions up to order v7 to the P-wave decays in two photons are • relativistic corrections to the dimension 8 operators • operators of mass dimension 9 containing a chromoelectric field • In this case, the spin flip operators scale as v8 • It is not possible to find a field redefinition that eliminates the operator containing the chromoelectric field ~ v7 The decay widths read:

  6. Hadronic decay widths • color octet operators • gauge invariance of color octet operators The order of the color matrices and the covariant derivatives becomes relevant. To guarantee gauge invariance, we have to prescribe the ordering: • operators proportional to the total derivative of the quark-antiquark pair If we consider the component of the Fock in the ingoing quarkonium, in the center of mass rest frame the quark-antiquark pair has total momentum different from 0 and proportional to the momentum of the gluon: the matrix element is different from 0. Electromagnetic situation always correspond to the lhs: the total derivative acts on the quark, antiquark and the gluon. In the hadronic case, we have to first situation, but the gluon can also travel until the outgoing pair, in this case the total derivative acts only on the quark-antiquark pair, and the operator is different from 0

  7. S-wave decays into light hadrons. Decay widths • hc (1S0) decay into light hadrons • J/y (3S1) decay into light hadrons

  8. P-wave decays into light hadrons. Decay widths • cc0 decay into light hadrons • cc2 decay into light hadrons

  9. S-wave decay into leptons: matching coefficients of singlet operators • Matching • order by order in inverse power of the heavy quark mass M. • color singlet operators: • singlet-octet transition operator: • since the QCD scattering amplitude doesn’t have a definite angular momentum, the matching determines more coefficients than needed in the decay widths. p2 p4 p’2 p2 p’2 p4 +p’4 G. T Bodwin and A. Petrelli, Phys. Rev. D66, 094011 (2002) V.A. Novikov, L.B. Okun, M.A. Shifman, A.I. Vainshtein, M.B. Voloshin and V.I. Zakharov, Phys. Rept.41, 1-133, (1978) • The matching can only determine the sum, not the individual matching coefficients

  10. S-wave decay into leptons: matching coefficients of octet operators In QCD we evaluate the imaginary part of the diagrams In NRQCD, we must consider different contributions • four fermions operators with chromoelectric or chromomagnetic field • four fermion operators in which we consider the gluon field in the covariant derivative • four fermion operators with insertions of quark-gluon vertices of the bilinear NRQCD Lagrangian, up to order 1/M5

  11. Decay into photons: matching coefficients of singlet operators • the coefficients of dimension 10 operators agree with the literature • it is not possible to find the individual coefficients of the • 1S0 operators Agrees with the one in Disagree with the ones J.P. Ma and Q. Wang, Phys Lett. B537, 233 (2002) We cannot find the origin of such a discrepancy

  12. Decay into photons: matching coefficients of octet operators As in the S-wave decay into leptons we must consider • four fermions operators with chromoelectric field • four fermion operators in which we consider the gluon field in the covariant derivative • four fermion operators with insertions of quark-gluon vertices of the bilinear NRQCD Lagrangian, up to order 1/M5 Disagree with J.P. Ma and Q. Wang. In particular, being the coefficient of the operator T8(3P2)equal to zero, we find we need another matrix element less than in that paper.

  13. Matching coefficients of singlet operators As far as the singlet operators are concerned, we find the coefficients Original results of this work Agree with the literature

  14. Matching coefficients of octet operators The same QCD Feynman diagrams showed in the previous slide give the matching coefficients of the octet operators that don’t contain a chromoelectric o chromomagnetic field

  15. Matching of operators containing chromoelectric field Work in progress.

  16. Conclusions • Electromagnetic decays • complete calculation of the matching coefficients of dimension 10 operators involved in heavy quarkonium decay in two photon or leptons to order v7 in the velocity expansion • S-wave decays: we confirm the result of Bodwin and Petrelli for the sum of the coefficients of the operators • Q’( 3S1), Q’’(3S1) , Q’( 1S0) and Q’’( 1S0), we can fix the individual coefficients of the same operators, we find the coefficients of dimension 8 operators contaning a chromomagnetic field ( S8(1S0) and S8(3S1) ) and of one operator containing a chromoelectric field, T(1)8(3S1). • P-wave decays: we confirm the result of Ma and Wang for the coefficient P(3P0). We calculated the coefficients of the operators P(3P2), T8(3P0) and T8(3P2). Discrepancy with the results of Ma and Wang. In particular: the vanishing of the coefficient of T8(3P2) and a different decomposition on spherical tensor allow us to write the decay width of the 3P2 decay with two matrix element less. • D-wave decays: we confirm the results of Novikov et. al. • Hadronic decays • we calculated the matching for the singlet and octet operators, confirming the result of Bodwin and Petrelli for S-wave, of Novikov et. al. for D-wave and finding original results for the P-wave. • Perspectives • Before the phenomenological applications is necessary to reduce the number of non perturbative matrix elements. • lattice evaluation, fitting from data. • integration of the mv scale through a pNRQCD analysis.

  17. Cose che potrebbero servire: le trasformazioni di gauge The electromagnetic situation always correspond to the lhs, the total derivative acts on the quark, antiquark and the gluon. In the hadronic case, we have to first situation, but the gluon can also travel until the outgoing pair, in this case the total derivative acts only on the quark-antiquark pair, and the operator is different from 0 Our expression doesn’t contain the operator P(3P2,3F2)

  18. Conclusion: One possibility is to repeat the conclusion of the paper, saying that for the perturbative calculation in the 3S1 decay the bigger uncertainty comes from missing corrections in alphas v^2, in the 1S_0 case from alpha_s^2, alpha_s v^2 besides the uncertainties coming from the the coefficients we have not yet evaluated. Then we have to note that the number of matrix elements involved in the decay widths is pretty big and these matrix elements are not well known. (see, for example, QWG, the matrix element known by fitting or by direct lattice evaluation are O_1 (1P_1), O_8 (^1S_0) and I think also, from Bodwin, Lee and Sinclair, 2005, O_1(3S_1), O_1(1S0) ) So a possibility to reduce the non perturbative is to switch to pNRQCD, where only the mv^2 scale is still dynamical. This has also the advantage that a definite power counting can be assigned to the different matrix elements.

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