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Nuclear photonics: Learning from the nuclear response to real photons. γ + (N,Z). Giornate di Studio su IRIDE March 14 th – 15 th , 2013 LNF. G. Colò. ELI – NP Experiments. Measuring detailed doorway states by means of (γ,p), (γ,n) … reactions
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Nuclear photonics:Learning from the nuclear response to real photons γ+ (N,Z) Giornate di Studio su IRIDE March 14th – 15th, 2013 LNF G. Colò
ELI – NP Experiments • Measuring detailed doorway states by means of (γ,p), (γ,n) … reactions • Test of chaos in nuclei (spectra fluctuations vs. random matrix theory) • Fine structure of photo-response above particle threshold: (γ,α), (γ,p) and (γ,n) • Nuclear resonance fluorescence experiments on rare isotopes and isomers • … • Management of radioactive waste and isotope-specific identification • Medical applications: producing new medical radioisotopes via (γ,n) • New brilliant neutron source produced via (γ,n) • … From: NuPECC meeting, Milano, March 7th-8th, 2012 (A. Bracco) Cf. also ELI-NP Workshop, Milano, May 14th-16th, 2012 (L. Serafini, A. Bracco)
Introduction: nuclear resonance excitation by photons and typical experiment(s) • Case 1 : Symmetry energy and its impact on astrophysics • Case 2 : Is the nucleus (an)harmonic ? • Other cases: nuclear scales, details of nuclear w.f. … • Simulations by Milano group numbers ! Outline (mainly physics cases)
These amplitudes are forward peaked: AR : Rayleigh scattering (excitation and decay of bound electrons). AD : Delbrück scattering (e+e- pair creation and annihilation). The other two have a specific angulat dependence (1 + cos2θ or …): ANT : The nucleus acts as structureless charged particle and performs oscillations as a whole. It is nearly E-independent. ANR : goes through the excitation of a nuclear (e.g. dipole) resonance and we assume it can be distinguished using the above arguments of angle and energy dependence. Elastic photon scattering CONCLUSION : RESONANCE CONTRIBUTION CAN BE SINGLED OUT. S. Kahane and R. Moreh, PRC 9, 2384 (1974)
A typical experiment • Below separation energy: discrete levels with large branching ratio B = Γ0/Γ to the g.s. • Above separation energy: resonances with small gamma-decay branch Γγ << Γn .
Isovector probes excite in the nucleus vibrational modes in which neutrons and protons oscillate in opposition of phase. Region ≈10-30 MeV: Giant Resonances GDR Nuclear excitation suffers from uncertainties due to the incomplete knowledge of the effective nucleon-nucleon (NN) interaction, and its energy dependence. Moreover, not always a good energy resolution can be achieved with nuclear probes. Wavelength >> nuclear dimension
IVGMR IVSGMR ΔL=0 IVGDR IVSGDR ΔL=1 IVSGDR IVGQR ΔL=2 Goal: relate their properties to more general features of the nuclear medium, like e.g. the incompressibility. Problems: the nucleus is not a homogeneous system, and it has a shell structure. Classification / Motivation to study
Symmetry energy S Symmetric matter EOS Z N Everybody is familiar with the symmetry coefficient in the semi-empiric (i.e., macroscopic) mass formula. The nuclear symmetry energy The microscopic concept associated with this, is the symmetry energy, which is the energy needed to transform a neutron into a proton (or vice-versa) when the system has a given density. Nuclear matter EOS
Ultimately, the energy balance is dominated by: energy of neutron matter (more precisely, β-equilibrated matter) vs. gravitational energy. The stiffer the energy of neutron matter grows with density, the larger is the mass. Impact of symmetry energy on n-stars P.B. Demorest et al., Nature 467, 1081 (2010) M/Msun = 1.97 ± 0.04
M.B. Tsang et al., PRC 86, 015803 (2012) J.M. Lattimer, J. Lim, arXiv:1203.4286 • Nuclear structure experiments • Hadronic/EM probes • Milano • O. Wieland et al., Phys. Rev. Lett. 102, 092502 (2009) • Weak probes • PREX (Roma) • S. Abrahamyan et al., Phys. Rev. Lett. 108, 112502 (2012). • Nuclear reaction experiments • LNS • Observational data Main parameters that govern S:
The isovector quadrupole resonance S. Henshaw et al., PRL 93, 122501 (2004). HIγS (107 γ/s, ΔE/E≈2-3%) Scattering parallel and perpendicular to the polarization plane High intensity polarized photon beam on 209Bi Three-parameter fit of the IVGQR energy, width and strength
Extraction of the symmetry energy parameters • Analysis (rather) model independent • Not necessarily nucleus-independent
The energy of the IVGQR (in analogy with that of other GRs) scales as 135 A-1/3 208Pb: ≈ 23 MeV 120Sn: ≈ 28 MeV 40Ca: ≈ 40 MeV Need of higher excitation energy range as compared with existing or already planned facilities. Overcoming energy limitations
Harmonic behavior of the nucleus Coulomb excitation data exist for the double IVGDR (136Xe and 208Pb), with low energy resolution. For the double GQR, nuclear excitation data from HI reactions are available (strong background and large errors). Real photon excitation can shed a new light on this question. Ann. Rev. Nucl. Part. Sci. 48, 351 (1999)
The energy of the double IVGDR obeys the harmonic expectation, but the cross section does not. In the double GQR of 40Ca the cross section has a big error: ratio with that of the single GQR is 15 ± 8. Scanning the high energy region (20-30 MeV) for a double-GDR search with good energy resolution and without uncertainties related to the reaction process, would be very beneficial.
Nuclear scales • Wavelet analysis is a way to extract the CHARACTERISTIC ENERGY SCALES of the system • In the nucleus three main scale arise • Origin ? PRL 93, 122501 (2004).
Typical cross section for dipole excitation: 10-300 mb • Thick target 3-5 g/cm2: 1022 atoms/cm2 • We assume a high intense and monochromatic beam of 109γ/s Feasibility of experiments (F. Camera/O. Wieland)
Nuclear photonics is a well established field, that aims at understanding the properties of the nuclear excitations without the uncertainties associated with nuclear excitation mechanisms. • This study has general interest (harmonic behaviour of the nucleus, order vs. chaos), and/or impacts on other fields (e.g., nuclear astrophysics). • Nuclear resonance scattering can give access to many physics cases. We are interested, among others, in those for which the energy goes below 20-25 MeV. Other specific needs are discussed. Conclusions
Bracco • F. Camera • O. Wieland • P.F. Bortignon • have contributed to the preparation of this talk Acknowledgments
Classical gravity (Newton) Hydrostatic equilibrium of a n-star General relativity corrections (TOV) In either case, one has to input P(ρ) from the nuclear EOS.
Schematic RPA: Bohr-Mottelson formula: We assume: (i) simple density profile; (ii) relationship with S pot Bohr-Mottelson model ⇒ extension to S shell gap
Neutron skin from the total dipole polarizability There is a certain correlation between the neutron skin of a nucleus and the dipole polarizability, defined as In order to measure it, the dipole response must be scanned with high precision, especially at low energy. excess neutrons “core”
The γ-decay of the GDR • The GDR is fragmented in several states • The decay to the 2+1 state is different for each state • Old measurement of the n-decay showed E-dependence
Theory works at the eV level ! There are several quenching mechanisms acting, since the typical s.p. p-h transition has a width of ≈ 103 eV.
γ-decay of the GQR in 208Pb to g.s. and 3-1: M. Brenna, G.C., P.F. Bortignon, PRC 85, 014305 (2012).