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QUARKS, GLUONS AND NUCLEAR FORCES. Paulo Bedaque University of Maryland, College Park. strong nuclear force: binds neutrons and protons into nuclei. Quantum Chromodynamics (QCD). What do we know ?. 1) NN phase shifts. 1 S 0 neutron-proton. What do we know ?.
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QUARKS, GLUONS AND NUCLEAR FORCES Paulo Bedaque University of Maryland, College Park
strong nuclear force: binds neutrons and protons into nuclei Quantum Chromodynamics (QCD)
What do we know ? 1) NN phase shifts 1S0 neutron-proton
What do we know ? 2) Several potentials that fit them pion exchange all kinds of things …
What do we know ? 3) These potentials explain a lot but not everything • NNn, NNg, couplings few % on nd • NNN forces ~5% of nuclei binding • NY forces strangeness in neutron stars • ...
Can we understand the nuclear forces (and NNN, NNn, …) from first principles ? LATTICE QCD
Quantum mechanics reduced to quadratures operators numbers is as well (or ill) defined as
Imaginary time (t it): just like stat mech probability distribution
But I don’t live in imaginary time ! What can I do with imaginary time correlators ? lowest energy state w/ some overlap
Quantum Chromodynamics Q = spinor, 3 colors, 6 flavors = quarks U = SU(3) matrix = gluons
probability distribution for Ui • algorithm • find {Ui} • compute 1/(DUi+m) • compute observable
Scattering through finite volumes: the Luscher method (Marinari, Hamber, Parisi, Rebbi) one particle Periodic boundary conditions: box is a torus Energy levels at
Scattering through finite volumes: the Luscher method (Marinari, Hamber, Parisi, Rebbi) two particles known function Learn about the deuteron in boxes smaller than the deuteron
The difference between E2N and EN is our signal phase shift
The time to try it is now • Pion masses small enough for chiral extrapolation • No quenching • Volumes ~ (3 fm)3 • Improved actions • Good chiral symmetry • Software resources
S. Beane, T. Luu, K. Orginos, E. Pallante, A. Parreno, M. Savage, A. Walker-Loud, …
Gold platted scattering observable: I=2 pp K(e4) CP-PACS
Improved statistics K(e4) CP-PACS
Nucleon-nucleon “natural” |a| < 1 fm for 350 < mp < 600 MeV a=5.4 fm or 20 fm for mp=138 MeV is indeed fine tuned
Chiral “extrapolation” • no anchor at mp= 0 • wild behavior of the scattering length with mq
The crucial problem is the large statistical errors signal: 2 baryons error: 6 pions
If the minimum pion energy was larger mp, the signal would be better p(-z) = -p(z) ?
Parity orbifold (P.B. +Walker-Loud) parity reversed minimum pion energy is
Parity orbifold: pinhole these points are related by parity minimum pion energy is
Summary • Lattice QCD calculation of hadron interactions are doable • Meson-meson scattering can be computed with few % precision • There is a serious noise problem in baryon-baryon channels, new ideas are needed • New ideas exist ! We’ll find out how they work really soon
weighted fit: lpp = 3.3(6)(3) different weigths mp a2 = -0.0426 (6)(3)(18) 1-loop – 2-loop w/o counterterm lpp K(e4): mp a2 = -0.0454(31)(10)(8) theoretical cPT predicts discretization errors (a2) ~ 1% (D. O’Connel, A. Walker-Loud, R. V. Water, J. Chen) Finite volume (e-mpL) ~ 1% (P.B. & I. Sato)
Extracting physics from euclidean space : energies are "easy" some operator with quantum numbers of the pion, made of quarks and gluons, for instance: lowest energy state with the quantum numbers of the pion
Solution 2: Aharonov-Bohm effect add a background magnetic potential coupled to baryon number with zero curl or or no coupling to local operators !
