docCorrelated Momentum distributions in nuclear systems
download 
Report Transcription
Correlated Momentum distributions in nuclear systems
Correlated Momentum distributions in nuclear systems A. Rios (UM), A. Polls (UB), W. Dickhoff (WU) Motivation Single particle spectral functions at zero and finite Temperature Single-particle properties Entropy and Free energy Thermodynamical properties. Liquid-gas coexistence. Conclusions and perspectives PRC71 (2005) 014313, PRC69(2004)054305, PRC72(2005)024316,PRC74 (2006) 054317, PRC73 (2006)024305,PRC78(2008)044314, PRC79(2009)025802 The equation of state (EOS) of asymmetric matter (different number of protons and neutrons) is a necessary ingredient in the description of astrophysical environments such as supernova explosions or the structure of neutron stars. Recent data concerning nuclei far from the stability valley has revitalized the interest for asymmetric systems. Heavy ion collisions. The EOS of asymmetric nuclear matter in a wide range of densities and temperatures is one of the challenging open problems in nuclear physics. It is a very old many-body problem and still has not been fully solved. We have two problems : the NN interaction and the many-body problem. Here we will assume that the NN interaction is realistic and we will concentrate in the many-body problem. NN correlations and single particle properties The microscopic study of the single particle properties in nuclear systems requires a rigorous treatment of the nucleon-nucleon (NN) correlations. Strong short range repulsion and tensor components, in realistic interactions to fit NN scattering data îîImportant modifications of the nuclear wave function. Simple Hartree-Fock for nuclear matter at the empirical saturation density using such realistic NN interactions provides positive energies rather than the empirical -16 MeV per nucleon. The effects of correlations appear also in the single-particle properties: Partial occupation of the single particle states which would be fully occupied in a mean field description and a wide distribution in energy of the single-particle strength. Evidencies from (e,e’p) experiments. The Single particle propagator a good tool to study single particle properties Not necessary to know all the details of the system ( the full many-body wave function) but just what happens when we add or remove a particle to the system. It gives access to all single particle properties as : momentum distributions self-energy ( Optical potential) effective masses spectral functions Also permits to calculate the expectation value of a very special twobody operator: the Hamiltonian in the ground state. Recently, enormous progress has been achieved in the calculation of the single-particle propagator: Self-consistent Green’s function (SCGF) and Correlated Basis Function (CBF). Single particle propagator Zero temperature Heisenberg picture T is the time ordering operator Finite temperature The trace is to be taken over all energy eigenstates and all particle number eigenstates of the many-body system 9Z is the grand partition function Lehmann representation + Spectral functions FT+ clossureîLehmann representation The summation runs over all energy eigenstates and all particle number eigenstates The spectral function with where and Momentum distribution T=0 MeV Finite T therefore Is the Fermi function Spectral functions at zero tempearture F Free system r î Interactions î Correlated system Spectral functions at finite Temperature Free system î Interactions î Correlated system Tails extend to the high energy range. Quasi-particle peak shifting with density. Peaks broaden with density. Dyson equation How to calculate the self-energy The self-energy accounts for the interactions of a particle with the particles in the medium. We consider the irreducible self-energy. The repetitions of this block are generated by the Dyson equation. The first contribution corresponds to a generalized HF, weighted with n(k) The second term contains the renormalized interaction, which is calculated in the ladder approximation by propagating particles and holes. The ladder is the minimum approximation that makes sense to treat short-range correlations. It is a complex quantity, one calculates its imaginary part and after the real part is calculated by dispersion relation. The interaction in the medium How to calculate the energy Koltun sum-rule The BHF approach î is the BHF quasi-particle energy Does not include propagation of holes Momentum distributions for symmetric nuclear matter At T= 5 MeV , for FFG k<kF 86 per cent of the particles! and 73 per cent at T=10 MeV. In the correlated case, at T=5 MeV, for FFG k< kF 75 per cent and 66 per cent at T= 10 MeV. -3 1 ρ=0.16 fm , T=10 MeV Av18 FFG 0.8 Av18 FFG 1 0.8 0.6 0.6 0.4 0.4 0.2 0.2 0 0 0.5 1 1.5 Momentum, k/kF 2 0 0.5 1 1.5 Momentum, k/kF 2 0 Momentum distribution, n(k) Momentum distribution, n(k) -3 ρ=0.16 fm , T=5 MeV Density dependence of the occupation of lowest momentum state at T=5 MeV . Symmetric, T=5 MeV Neutron, T=5 MeV 1 1 0.95 0.8 0.9 0.7 Av18 CDBonn FFG 0.6 0 0.08 0.16 0.24 -3 Density, ρ [fm ] Av18 CDBonn FFG 0.32 0 0.08 0.16 0.24 -3 Density, ρ [fm ] 0.85 0.32 n(k=0) n(k=0) 0.9 Momentum distributions of symmetric and neutron matter at T=5 MeV Argonne v18 T=5 MeV 1 Symmetric matter -3 ρ=0.08 fm -3 ρ=0.16 fm -3 ρ=0.24 fm -3 ρ=0.32 fm 0.4 0.2 n(k) -5 10 -6 0 1 10 Neutron matter 0.8 -4 10 n(k) -3 10 0.6 -2 10 -3 0.6 10 0.4 10 0.2 10 0 600 800 1000 1200 1400 10 Momentum, k [MeV] -4 -5 -6 0 1 0.5 1.5 Momentum, k/kF 2 n(k) n(k) 0.8 -2 10 Relation of the momentum distribution and the derivative of the real part time ordered self-energy at the quasi-particle energy. The self-energy down has contributions from 2p1h self-energy diagrams The self-energy up has contributions from 2h1p self-energy diagrams Argonne v18 1 -3 ρ=0.16 fm , T=5 MeV n(k) n↑(k) n↓(k) 0.8 0.6 0.4 10 10 -2 -3 0.2 0 10 -4 -0.2 -0.4 0 0.5 1 1.5 Momentum, k/kF 2 200 400 600 800 1000 1200 10 Momentum, k [MeV] -5 Momentum distribution, n(k) Momentum distribution, n(k) Momentum distributions obtained from the derivatives of the self-energy Different components of the imaginary and real parts of the self-energy -3 Re Σ(0,ω) [MeV] Im Σ(0,ω) [MeV] CDBonn, ρ=0.16 fm , T=5 MeV 20 0 -20 -40 ΣR Σ↑ Σ↓ 20 0 -20 ΣR Σ↑ Σ↓ -40 -60 -1000 -500 0 500 1000 1500 2000 ω−µ [MeV] CDBonn 0 CDBonn 0 -20 -20 -40 -40 -60 -60 0 Argonne v18 Argonne v18 0 -40 -40 -80 -80 -3 ρ=0.08 fm -3 ρ=0.16 fm -3 ρ=0.24 fm -3 ρ=0.32 fm -120 -160 -500 0 500 1000 1500 2000 2500 -500 ω−µ [MeV] 0 500 1000 1500 2000 2500 ω−µ [MeV] -120 -160 ImΣ↓(0,ω) [MeV] Neutron matter, T=5 MeV ImΣ↓(0,ω) [MeV] ImΣ↓(0,ω) [MeV] ImΣ↓(0,ω) [MeV] Symmetric matter, T=5 MeV The circles represent the position of the quasi-particle energy CDBonn CDBonn -20 -20 -40 -40 -3 -60 -60 ρ=0.08 fm -3 ρ=0.16 fm -3 ρ=0.24 fm -3 ρ=0.32 fm -80 -80 -100 ReΣ↓(0,ω) [MeV] 0 ReΣ↓(0,ω) [MeV] 0 Neutron matter, T=5 MeV -100 0 Argonne v18 Argonne v18 0 -40 -40 -80 -80 -120 -120 -160 -160 -200 -200 -200 0 200 400 600 800 ω−µ [MeV] -200 0 200 400 600 800 ω−µ [MeV] ReΣ↓(0,ω) [MeV] ReΣ↓(0,ω) [MeV] Symmetric matter, T=5 MeV CDBonn Symmetric matter 0 Symmetric matter -0.1 -0.1 -0.2 -0.2 ∂ωReΣ↓(0,ω) 0 0 Neutron matter Neutron matter -0.05 ∂ωReΣ↓(0,ω) ∂ωReΣ↓(0,ω) 0 ∂ωReΣ↓(0,ω) Argonne v18 -0.05 -3 ρ=0.08 fm -3 ρ=0.16 fm -3 ρ=0.24 fm -3 ρ=0.32 fm -0.1 -150 -125 -100 -75 -50 ω−µ [MeV] -25 0 -125 -100 -75 -0.1 -50 ω−µ [MeV] -25 0 Proton and neutron momentum distributions a=0.2, r=0.16 fm-3 9The BHF n(k) do not contain correlation effects and very similar to a normal thermal Fermi distribution. 9The SCGF n(k) contain thermal and correlation effects. 9Depletion at low momenta and larger occupation than the BHF n(k) at larger momenta. 9The proton depletion is larger than the neutron depletion. Relevant for (e,e’p). Dependence of n(k=0) on the asymmetry -3 1 nν(k=0) 0.95 ρ=0.16 fm , T=5 MeV Neutrons 0.9 0.85 0.8 0.75 0.7 0 Protons Av18 CDBONN FFG 0.2 0.4 0.6 0.8 Asymmetry, β 1 Free Fermi Gas β=0.0 β=0.2 β=0.4 β=0.6 β=0.8 1 0.8 0.6 0.4 0.2 Argonne v18 β=0.0 β=0.2 β=0.4 β=0.6 β=0.8 Neutrons Protons Neutrons Protons 1 0.8 0.6 0.4 0.2 0 0 0 100 200 300 400 500 0 100 200 300 400 500 Momentum, k [MeV] Momentum, k [MeV] Momentum distribution, n(k) Momentum distribution, n(k) Neutron and proton momentum distributions for different asymmetries K=0 MeV proton spectral function for different asymmetries 9a→ 1, kFp→ 0 MeV, the quasi-particle peak gets narrower and higher. 9The spectral function at positive energies is larger with increasing asymmetry. 9 Tails extend to the highenergy range. 9 Peak broadens with density Density and temperature dependence of the spectral function for neutron matter Spectral function, T=5 MeV Argonne V18 Argonne V18 k=0 k=0 -2 -2 10 10 -3 -3 10 10 -4 -4 10 10 -5 -5 10 -6 10 -1 k=kF 10 -2 k=kF 10 -3 -3 10 -4 -4 10 10 -5 -5 10 10 -6 -6 10 -2 10 -3 10 -4 10 -2 10 10 -1 -1 10 10 -3 ρ=0.04 fm -3 ρ=0.08 fm -3 ρ=0.16 fm -3 ρ=0.24 fm -3 ρ=0.32 fm k=2kF k=2kF T=5 MeV T=10 MeV T=15 MeV T=20 MeV -1 10 -2 10 -3 10 -4 10 -5 -5 10 10 -6 10 -500 -250 0 250 ω−µ [MeV] 500 -500 -250 0 250 ω−µ [MeV] 500 -1 -6 10 -1 -1 -1 (2π) A(k,ω) [MeV ] 10 10 -1 10 (2π) A(k,ω) [MeV ] -1 10 -3 Spectral function, ρ=0.16 fm Partial derivative 0 -40 -60 -0.1 -80 -0.2 -100 Neutrons -120 Neutrons -0.3 Neutrons -140 -40 0 Σ↓(k,ω) [MeV] 0 α=0.5 -60 -20 α=0.4 α=0.3 -40 -80 α=0.2 -60 α=0.1 -100 -80 -100 -120 Protons Protons -120 -140 -200 -100 0 100 200 300 -500 0 500 1000 1500 2000 ω−µτ [MeV] ω−µτ [MeV] ∂ω ReΣ↓(k,ω) Σ↓(k,ω) [MeV] 0 -20 -40 -60 -80 -100 -120 Real part -0.1 -0.2 -0.3 Protons -80 -40 -20 -60 ω−µτ [MeV] 0 ∂ω ReΣ↓(k,ω) Imaginary part n(k=0) for nuclear and neutron matter, -3 nn(k=0)-np(k=0) 0.25 0.2 0.15 0.1 ρ=0.16 fm , T=5 MeV CDBONN Reid93 Av18 Av8’ Av6’ Av4’ FFG 0.05 0 0 0.2 0.4 0.6 0.8 Asymmetry, β 1 Real part of the on-shell self-energy for neutron matter -3 ρ=0.08 fm ρ=0.16 fm -3 -3 ρ=0.24 fm 0 0 Re Σ(k,ε(k)) [MeV] Re Σ(k,ε(k)) [MeV] Argonne V18 SCGF -20 -20 BHF SCGF SCGF -40 -40 T=5 MeV T=20 MeV BHF -60 -60 BHF 0 1 2 3 -1 k [fm ] 40 1 2 3 -1 k [fm ] 40 1 2 3 -1 k [fm ] 4 1 1 T=5 MeV 0.8 T=5 MeV 0.8 0.6 0.6 -3 ρ=0.04 fm -3 ρ=0.08 fm -3 ρ=0.16 fm -3 ρ=0.24 fm -3 ρ=0.32 fm 0.4 0.2 0 1 ρ=0.16 fm 0.8 0.4 0.2 -3 ρ=0.16 fm 0 1 -3 0.8 0.6 0.6 T=20 MeV T=16 MeV T=12 MeV T=8 MeV T=4 MeV 0.4 0.2 0 0 0.5 1 k/kF 1.5 2 0 0.5 0.4 0.2 1 k/kF 1.5 2 0 Momentum distribution Momentum distribution Momentum distribution Momentum distribution Argonne V18 frhsfj CDBONN Occupation of the lowest momentum state as a function of density for neutron matter. 1 0.95 0.95 0.9 0.9 0.85 0.85 T=5 MeV T=10 MeV T=15 MeV T=20 MeV T=5 MeV, FFG 0.8 0.75 0.7 0 0.08 0.16 -3 ρ [fm ] 0.24 0.32 0 0.8 0.75 0.08 0.16 -3 ρ [fm ] 0.24 0.32 n(k=0) 1 n(k=0) Argonne V18 CDBONN Summary The calculation and use of the single particle green function is suitable and it is easily extended to finite T. Temperature helps to avoid the “np” pairing instability. The propagation of holes and the use of the spectral functions in the intermediate states of the G-matrix produces repulsion. The effects increase with density. Important interplay between thermal and dynamical correlation effects. For a given temperature and decreasing density, the system approaches the calssical limit and the depletion of n(k) increases. For larger densities, closer to the degenerate limit, dynamical correlations play a more important role and n(0) decreases with increasing density. For a given density when the asymmetry increases, the neutrons get more degenerate and the protons loss degeneracy. The depletion of the protons is larger and has important thermal effects. Three-body forces should not change the qualitative behavior.
