RIPL – Reference Input Parameter Library for Calculation of Nuclear Reactions and Nuclear Data Evaluations

We describe the physics and data included in the Reference Input Parameter Library, which is devoted to input parameters needed in calculations of nuclear reactions and nuclear data evaluations. Advanced modelling codes require substantial numerical input, therefore the International Atomic Energy Agency (IAEA) has worked extensively since 1993 on a library of validated nuclear-model input parameters, referred to as the Reference Input Parameter Library (RIPL). A final RIPL coordinated research project (RIPL-3) was brought to a successful conclusion in December 2008, after 15 years of challenging work carried out through three consecutive IAEA projects. The RIPL-3 library was released in January 2009, and is available on the Web through (http://www-nds.iaea.org/RIPL-3/). This work and the resulting database are extremely important to theoreticians involved in the development and use of nuclear reaction modelling (ALICE, EMPIRE, GNASH, UNF, TALYS) both for theoretical research and nuclear data evaluations. The numerical data and computer codes included in RIPL-3 are arranged in seven segments: MASSES contains ground-state properties of nuclei for about 9000 nuclei, including three theoretical predictions of masses and the evaluated experimental masses of Audi et al. (2003). DISCRETE LEVELS contains 117 datasets (one for each element) with all known level schemes, electromagnetic andmore » {gamma}-ray decay probabilities available from ENSDF in October 2007. NEUTRON RESONANCES contains average resonance parameters prepared on the basis of the evaluations performed by Ignatyuk and Mughabghab. OPTICAL MODEL contains 495 sets of phenomenological optical model parameters defined in a wide energy range. When there are insufficient experimental data, the evaluator has to resort to either global parameterizations or microscopic approaches. Radial density distributions to be used as input for microscopic calculations are stored in the MASSES segment. LEVEL DENSITIES contains phenomenological parameterizations based on the modified Fermi gas and superfluid models and microscopic calculations which are based on a realistic microscopic single-particle level scheme. Partial level densities formulae are also recommended. All tabulated total level densities are consistent with both the recommended average neutron resonance parameters and discrete levels. GAMMA contains parameters that quantify giant resonances, experimental gamma-ray strength functions and methods for calculating gamma emission in statistical model codes. The experimental GDR parameters are represented by Lorentzian fits to the photo-absorption cross sections for 102 nuclides ranging from {sup 51}V to {sup 239}Pu. FISSION includes global prescriptions for fission barriers and nuclear level densities at fission saddle points based on microscopic HFB calculations constrained by experimental fission cross sections.« less

[1]  S. Goriely,et al.  Latest results of Skyrme-Hartree-Fock-Bogoliubov mass formulas , 2016 .

[2]  M. W. Herman,et al.  Fission of light actinides:Th232(n,f) andPa231(n,f) reactions , 2006 .

[3]  D. W. Lang The angular momentum-dependence of the nuclear level density , 1966 .

[4]  J. Delaroche,et al.  Structure properties of even–even actinides at normal and super deformed shapes analysed using the Gogny force , 2006 .

[5]  Z. Vrcelj,et al.  Global optical model potential for elastic deuteron scattering from 12 to 90 MeV , 1980 .

[6]  W. Reisdorf Analysis of fissionability data at high excitation energies , 1981 .

[7]  W. H. Dickhoff,et al.  Dispersive-optical-model analysis of the asymmetry dependence of correlations in Ca isotopes , 2007 .

[8]  P. Romain,et al.  Bound single-particle states for neutrons from a global spherical optical model , 2006 .

[9]  R. Capote,et al.  Dispersion relations in the nuclear optical model , 2003 .

[10]  O. Bezshyyko,et al.  COMPARISON AND TESTING OF METHODS FOR E1 STRENGTH CALCULATIONS , 2006 .

[11]  Chadwick,et al.  Particle-hole state densities with linear momentum and angular distributions in preequilibrium reactions. , 1992, Physical review. C, Nuclear physics.

[12]  Qingbiao Shen,et al.  Deuteron global optical model potential for energies up to 200 MeV , 2006 .

[13]  Vladimir A. Plujko,et al.  Testing and Improvements of Gamma-Ray Strength Functions for Nuclear Model Calculations , 1999, nucl-th/9907111.

[14]  A. G. W. Cameron,et al.  A COMPOSITE NUCLEAR-LEVEL DENSITY FORMULA WITH SHELL CORRECTIONS , 1965 .

[15]  Daniel de Florian,et al.  Phenomenology of forward hadrons in deep inelastic scattering: Fracture functions and its Q 2 evolution , 1997 .

[16]  J. Griffin,et al.  Statistical Model of Intermediate Structure , 1966 .

[17]  M. Blann,et al.  EXTENSIONS OF GRIFFIN'S STATISTICAL MODEL FOR MEDIUM-ENERGY NUCLEAR REACTIONS. , 1968 .

[18]  M. Farine Constrained semi-infinite nuclear matter and droplet model theorems on nuclei surface structure , 1985 .

[19]  I. Kodeli,et al.  Evaluation of Tungsten Nuclear Reaction Data with Covariances , 2008 .

[20]  P. Romain,et al.  Bound single-particle states and scattering of nucleons on spherical nuclei with a global optical model , 2007 .

[21]  S. K. Kataria,et al.  Semiempirical nuclear level density formula with shell effects , 1978 .

[22]  S. Stringari,et al.  Sum rules and giant resonances in nuclei , 1989 .

[23]  M. Danos On the long-range correlation model of the photonuclear effect , 1958 .

[24]  J. Pearson,et al.  Nuclear mass formula via an approximation to the hartree-fock method , 1995 .

[25]  N. Bianchi,et al.  Phenomenological statistical analysis of level densities, decay widths and lifetimes of excited nuclei , 1992 .

[26]  C. Mahaux,et al.  Empirical and theoretical investigation of the average potential of nucleons in 40Ca and 208Pb , 1986 .

[27]  C. Porter,et al.  Fluctuations of Nuclear Reaction Widths , 1956 .

[28]  André Lejeune,et al.  Optical-model potential in finite nuclei from Reid's hard core interaction , 1977 .

[29]  V. Strutinsky,et al.  Shell effects in nuclear masses and deformation energies , 1967 .

[30]  E. Betak,et al.  A statistical derivation of the density of final states for the exciton model , 1976 .

[31]  F. Bauwens,et al.  Dipole excitations to bound states in Sn-116 and Sn-124 , 1998 .

[32]  Turek,et al.  Elastic deuteron scattering and optical model parameters at energies up to 100 MeV. , 1988, Physical review. C, Nuclear physics.

[33]  C. Weizsäcker Zur Theorie der Kernmassen , 1935 .

[34]  E. Arthur Parameter Determination and Application to Nuclear Model Calculations of Neutron-Induced Reactions on Yttrium and Zirconium Isotopes , 1980 .

[35]  B. L. Berman,et al.  Measurements of the giant dipole resonance with monoenergetic photons , 1975 .

[36]  S. Ayik,et al.  Damping of collective vibrations in a memory-dependent transport model , 1992 .

[37]  Uhl,et al.  Test of gamma-ray strength functions in nuclear reaction model calculations. , 1990, Physical review. C, Nuclear physics.

[38]  Y. Alhassid,et al.  On the width of the giant dipole resonance in deformed nuclei , 1991 .

[39]  M. Jong,et al.  Projectile-fragment yields as a probe for the collective enhancement in the nuclear level density , 1998 .

[40]  W. Myers,et al.  Geometrical Relationships of Macroscopic Nuclear Physics , 1988 .

[41]  J. M. Eisenberg,et al.  Nuclear Theory, Vol. 1: Nuclear Models- Collective and Single Particle Phenomena , 1975 .

[42]  R. Q. Wright,et al.  R-matrix analysis of 235U neutron transmission and cross-section measurements in the 0- to 2.25-keV energy range , 1999 .

[43]  Xiao-Hua Li,et al.  Global triton optical model potential , 2007 .

[44]  A. Zilges,et al.  Fine structure of the pygmy dipole resonance in (136)Xe. , 2008, Physical review letters.

[45]  A. Woude The Electric Giant Resonances , 1991 .

[46]  R. Capote,et al.  Nuclear state density calculations: An exact recursive approach , 2003 .

[47]  G. Igo,et al.  Theoretical reaction cross sections for alpha particles with an optical model , 1962 .

[48]  Y. Alhassid,et al.  Giant dipole resonances in hot, rotating nuclei: nuclear shapes and shell corrections , 2001 .

[49]  G. Ter-Akopian,et al.  Superheavy nuclei , 1983 .

[50]  Arjan J. Koning,et al.  Towards prediction of fission cross section on the basis of microscopic nuclear inputs , 2009 .

[51]  R. Capote,et al.  Transmission through multi-humped fission barriers with absorption: A recursive approach , 2008 .

[52]  A. Ventura,et al.  Fission of Light Actinides: 232Th(n,f) and 231Pa(n,f) Reactions , 2006 .

[53]  Exotic modes of excitation in atomic nuclei far from stability , 2007, nucl-th/0701081.

[54]  N. Cerf On the application of a Monte Carlo method to the nuclear level density problem , 1991 .

[55]  L. Leal,et al.  Evaluation of the 103Rh Neutron Cross-Section Data in the Unresolved Resonance Region for Improved Criticality Safety , 2007 .

[56]  V. Strutinsky,et al.  Kinetic equation for collective modes of a Fermi system with free surface , 1993 .

[57]  T. Ericson The statistical model and nuclear level densities , 1960 .

[58]  C. Mahaux,et al.  The p-40Ca and n-40Ca mean fields from the iterative moment approach , 1988 .

[59]  K. Schilling,et al.  Low-energy tail of the giant dipole resonance in Mo-98 and Mo-100 deduced from photon-scattering experiments , 2008 .

[60]  J. Quesada,et al.  A Global Dispersive Coupled-Channel Optical Model Potential for Actinides , 2008 .

[61]  Arjan J. Koning,et al.  Improved microscopic nuclear level densities within the Hartree-Fock-Bogoliubov plus combinatorial method , 2008 .

[62]  C. Mahaux,et al.  From scattering to very deeply bound neutrons in 208Pb: Extended and improved moment approaches , 1989 .

[63]  S. Stringari,et al.  Surface and temperature effects in isovector giant resonances , 1988 .

[64]  M. Rayet,et al.  Large-scale fission-barrier calculations with the ETFSI method , 1998 .

[65]  J. Dechargé,et al.  Hartree-Fock-Bogolyubov calculations with the D 1 effective interaction on spherical nuclei , 1980 .

[66]  N. Fröman,et al.  Tunneling and super-barrier transmission through a system of two real potential barriers , 1970 .

[67]  A. Anzaldo-Meneses Particle hole state densities , 1995 .

[68]  Stéphane Goriely,et al.  A new nuclear level density formula including shell and pairing correction in the light of a microscopic model calculation , 1996 .

[69]  J. Lynn The theory of neutron resonance reactions , 1968 .

[70]  P. Obložinský Particle-hole state densities for statistical multi-step compound reactions , 1986 .

[71]  W. Myers,et al.  Nuclear properties according to the Thomas-Fermi model☆ , 1996 .

[72]  P. Endt STRENGTHS OF GAMMA-RAY TRANSITIONS IN A = 45-90 NUCLEI , 1979 .

[73]  G. R. Satchler ISOSPIN DEPENDENCE OF OPTICAL MODEL POTENTIALS. , 1969 .

[74]  A. Lane New Term in the Nuclear Optical Potential: Implications for (p,n) Mirror State Reactions , 1962 .

[75]  Taro Tamura,et al.  ANALYSES OF THE SCATTERING OF NUCLEAR PARTICLES BY COLLECTIVE NUCLEI IN TERMS OF THE COUPLED-CHANNEL CALCULATION , 1965 .

[76]  Arjan J. Koning,et al.  TALYS-1.0 , 2007 .

[77]  R. Hasse Studies in the shape dependence of the droplet model of nuclei (curvature and compressibility effects) , 1971 .

[78]  J. R. Grover,et al.  SHELL-MODEL COMBINATORIAL CALCULATIONS OF NUCLEAR LEVEL DENSITIES. , 1969 .

[79]  Hodgson,et al.  Global optical potentials for emitted alpha particles. , 1994, Physical review. C, Nuclear physics.

[80]  Chadwick,et al.  Linear momentum in the exciton model: Consistent way to obtain angular distributions. , 1991, Physical review. C, Nuclear physics.

[81]  David S. Saxon,et al.  Diffuse Surface Optical Model for Nucleon-Nuclei Scattering , 1954 .

[82]  B. Morillon,et al.  Dispersive and global spherical optical model with a local energy approximation for the scattering of neutrons by nuclei from 1 keV to 200 MeV , 2004 .

[83]  S. Goriely Nuclear Reaction Data Relevant to Nuclear Astrophysics , 2002 .

[84]  M. Dahlinger,et al.  Empirical saddle-point and ground-state masses as a probe of the droplet model , 1982 .

[85]  R. Lipperheide A semi-phenomenological nuclear optical-model potential , 1967 .

[86]  A. Zilges,et al.  TOPICAL REVIEW: Low-lying dipole modes in vibrational nuclei studied by photon scattering , 2006 .

[87]  H. Sherif,et al.  Inelastic proton scattering and the deformed spin-dependent optical potential☆ , 1968 .

[88]  K. Schilling,et al.  Dipole response of Sr 88 up to the neutron-separation energy , 2007 .

[89]  A. Schiller,et al.  Compilation of giant electric dipole resonances built on excited states , 2006, nucl-ex/0605004.

[90]  Stéphane Goriely,et al.  Improved global α-optical model potential at low energies , 2002 .

[91]  Johnson,et al.  Unified description of the neutron-208Pb mean field between -20 and +165 MeV from the dispersion relation constraint. , 1987, Physical review. C, Nuclear physics.

[92]  D. Bromley Treatise on Heavy Ion Science , 1985 .

[93]  V. Weisskopf,et al.  Theoretical Nuclear Physics , 1953 .

[94]  S. Goriely,et al.  Microscopic HFB+QRPA predictions of dipole strength for astrophysics applications , 2003, nucl-th/0306005.

[95]  H. Baba A shell-model nuclear level density , 1970 .

[96]  Shuryak,et al.  Screening of the topological charge in a correlated instanton vacuum. , 1995, Physical review. D, Particles and fields.

[97]  V. Weisskopf,et al.  Statistics and Nuclear Reactionsl , 1937 .

[98]  V. Maslov Analysis of 232Th(n,2n) reaction data , 1992 .

[99]  Roberto Capote,et al.  A general numerical solution of dispersion relations for the nuclear optical model , 2001, nucl-th/0105026.

[100]  A. Sierk,et al.  Macroscopic model of rotating nuclei. , 1986, Physical review. C, Nuclear physics.

[101]  Total prompt energy release in the neutron-induced fission of 235 U, 238 U, and 239 Pu , 2006, nucl-th/0603071.

[102]  G. Passatore On a dispersion relation for the potential in the optical model , 1967 .

[103]  H. Feldmeier,et al.  Level density of a Fermi gas with pairing interactions , 1985 .

[104]  A. Saxena,et al.  Excitation energy dependence of shell effects on nuclear level densities , 1970 .

[105]  Niels Bohr,et al.  The Mechanism of nuclear fission , 1939 .

[106]  Marilena Avrigeanu,et al.  On temperature dependence of the optical potential for alpha-particles at low energies , 2006 .

[107]  C. Mahaux,et al.  Extrapolation from positive to negative energy of the Woods-Saxon parametrization of the n-208Pb mean field , 1987 .

[108]  T. Rząca-Urban,et al.  Experimental test of the brink hypothesis , 1983 .

[109]  Kurt Snover Giant Resonances in Excited Nuclei , 1986 .

[110]  N. Mau The width of the giant dipole resonance at finite temperature , 1992 .

[111]  F. Thielemann,et al.  Nuclear level density and the determination of thermonuclear rates for astrophysics , 1996, astro-ph/9602087.

[112]  J. M. Lang,et al.  STATISTICS OF NUCLEAR LEVELS , 1954 .

[113]  André Lejeune,et al.  Many Body Theory of Nuclear Matter , 1976 .

[114]  P. Obloinský Preequilibrium gamma rays with angular momentum coupling. , 1987 .

[115]  Osamu Iwamoto,et al.  Global coupled-channel optical potential for nucleon-actinide interaction from 1 keV to 200 MeV , 2004 .

[116]  K. Schilling,et al.  Pygmy dipole strength close to particle-separation energies --The case of the Mo isotopes , 2005, nucl-ex/0512027.

[117]  C. Fu Simplified Spin Cutoff Factors for Particle-Hole Level Densities in Precompound Nuclear Reaction Theory , 1986 .

[118]  R. Singh,et al.  Energy levels in 238Np and 240, 242, 244Am based on residual interaction studies , 1982 .

[119]  E. Bauge,et al.  Lane consistent, semimicroscopic nucleon nucleus optical model , 2001 .

[120]  Xiao-Hua Li,et al.  Global dispersive optical model potential for proton as projectile in the energy region up to 200 MeV , 2008 .

[121]  Weidenmüller,et al.  Linear-response calculation of electromagnetic strength functions for hot, rotating nuclei. , 1989, Physical review. C, Nuclear physics.

[122]  B. L. Berman,et al.  Atlas of photoneutron cross sections obtained with monoenergetic photons. Second edition , 1974 .

[123]  A. Merchant,et al.  THE INTERACTION OF 1- TO 20-MEV NEUTRONS WITH 238U , 1992 .

[124]  S. G. Thompson,et al.  The New ELement Mendelevium, Atomic Number 101 - eScholarship , 1955 .

[125]  D. M. Patterson,et al.  An energy-dependent Lane-model nucleon-nucleus optical potential , 1976 .

[126]  V. Plujko,et al.  LORENTZIAN-LIKE MODELS OF E1 RADIATIVE STRENGTH FUNCTIONS , 2009 .

[127]  H. Utsunomiya,et al.  Partial photoneutron cross sections for the isomeric state 180Tam. , 2006, Physical review letters.

[128]  R. Capote,et al.  Dispersive coupled-channel analysis of nucleon scattering from 232 Th up to 200 MeV , 2005 .

[129]  W. Swiatecki,et al.  THE DEFORMATION ENERGY OF A CHARGED DROP. PART V. RESULTS OF ELECTRONIC COMPUTER STUDIES , 1963 .

[130]  H. Sagawa,et al.  Structure of giant quadrupole resonances in neutron drip line nuclei , 1997 .

[131]  R. Walter,et al.  A global optical model for neutron scattering for a > 53 and 10 MeV < E < 80 MeV , 1986 .

[132]  J. Huizenga Nuclear Fission , 1973 .

[133]  Chen,et al.  Proton mean field in 40Ca between -60 MeV and +200 MeV deduced from a dispersive optical-model analysis. , 1990, Physical review. C, Nuclear physics.

[134]  H. D. Ferguson,et al.  NUCLEAR LEVEL DENSITIES IN INTERMEDIATE AND HEAVY NUCLEI. , 1967 .

[135]  C. Dunford,et al.  Nuclear Level Density and the Effective Nucleon Mass , 1998 .

[136]  Patrick Talou,et al.  Evaluation of Neutron Reactions for ENDF/B-VII: 232–241U and 239Pu , 2007 .

[137]  H. Sagawa,et al.  Isoscalar and isovector dipole mode in drip line nuclei in comparison with β-stable nuclei , 1998 .

[138]  L. Robledo,et al.  Microscopic theory of the isovector dipole resonance at high angular momenta , 1984 .

[139]  Edward Teller,et al.  On nuclear dipole vibrations , 1948 .

[140]  Arjan J. Koning,et al.  Global and local level density models , 2008 .

[141]  C. Mahaux,et al.  Dispersion relation approach to the mean field and spectral functions of nucleons in 40Ca , 1991 .

[142]  Wang,et al.  Neutron-90Zr mean field from a dispersive optical model analysis. , 1989, Physical review. C, Nuclear physics.

[143]  F. Dyson Statistical Theory of the Energy Levels of Complex Systems. I , 1962 .

[144]  S. F. Kovalev,et al.  Photonuclear data and modern physics of giant resonances , 2006 .

[145]  J. Błocki,et al.  One-body dissipation and the super-viscidity of nuclei , 1978 .

[146]  P. Mohr,et al.  Study of the 89Y(α,α)89Y reaction close to the Coulomb barrier , 2008 .

[147]  Shlomo,et al.  Interplay between one-body and collisional damping of collective motion in nuclei. , 1996, Physical review. C, Nuclear physics.

[148]  A. V. Ignatyuk,et al.  Phenomenological description of energy dependence of the level density parameter , 1975 .

[149]  K. Takahashi,et al.  1975 Mass Predictions: A New Semiempirical Shell Correction to the Droplet Model, Gross Theory of Nuclear Magics , 1976 .

[150]  G. Breit,et al.  Nuclear Structure, Vol. 2: Nuclear Deformations , 1977 .

[151]  K. Schilling,et al.  Dipole response of 88Sr up to the neutron-separation energy , 2007 .

[152]  Marilena Avrigeanu,et al.  Optical model potentials for α-particles scattering around the Coulomb barrier on A∼100 nuclei , 2003 .

[153]  C. Kalbach Improved implementation of pairing corrections in exciton model particle-hole state densities , 1987 .

[154]  S. Goriely,et al.  Further explorations of Skyrme-Hartree-Fock-Bogoliubov mass formulas. VII. Simultaneous fits to masses and fission barriers , 2007 .

[155]  R. Capote,et al.  Is a global coupled-channel dispersive optical model potential for actinides feasible? , 2005 .

[156]  K. Schilling,et al.  Photon strength distributions in stable even–even molybdenum isotopes , 2007, 0707.3932.

[157]  F. D. Becchetti,et al.  NUCLEON--NUCLEUS OPTICAL MODEL PARAMETERS, A > 40, E < 50 MeV. , 1969 .

[158]  Kalbach Surface effects in the exciton model of preequilibrium nuclear reactions. , 1985, Physical review. C, Nuclear physics.

[159]  R. Beringer,et al.  Liquid-Drop Nuclear Model with High Angular Momentum , 1961 .

[160]  J. Frenkel On the Splitting of Heavy Nuclei by Slow Neutrons , 1939 .

[161]  Fred B. Bateman,et al.  Measurement of neutron total cross sections up to 560 MeV , 2001 .

[162]  André Lejeune,et al.  Microscopic calculation of the symmetry and Coulomb components of the complex optical-model potential , 1977 .

[163]  G. Brown,et al.  The giant Gamow-Teller resonance , 1981 .

[164]  Reply to K. Amos et al. (nucl-th/0401055) , 2004, nucl-th/0407060.

[165]  V. Strutinsky,et al.  “Shells” in deformed nuclei , 1968 .

[166]  S. Goriely,et al.  Global microscopic nuclear level densities within the HFB plus combinatorial method for practical applications , 2006 .

[167]  B. Back,et al.  Internal pair decay of giant resonances in hot Pb-200 , 1996 .

[168]  J. S. Zhang,et al.  The Pauli exclusion effect in multiparticle and hole state densities , 1988 .

[169]  Stéphane Goriely,et al.  Microscopic nuclear level densities for practical applications , 2001 .

[170]  E. Betak,et al.  The finite depth of the nuclear potential well in the exciton model of preequilibrium decay , 1976 .

[171]  A. H. Wapstra,et al.  The AME2003 atomic mass evaluation . (II). Tables, graphs and references , 2003 .

[172]  F. Grümmer,et al.  Microscopic description of the low lying and high lying electric dipole strength in stable Ca isotopes , 2007 .

[173]  R. Lipperheide On the nuclear optical-model potential , 1966 .

[174]  F. Hahne,et al.  Damping of nuclear dipole states , 1972 .

[175]  H. Vonach,et al.  Level density parameters for the back-shifted fermi gas model in the mass range 40 < A < 250 , 1973 .

[176]  M. Blann Decay of deformed and superdeformed nuclei formed in heavy ion reactions , 1980 .

[177]  Stéphane Goriely,et al.  A Hartree-Fock Nuclear Mass Table , 2001 .

[178]  S. Kailas,et al.  Global alpha-nucleus optical potential , 2006 .

[179]  J. Gaardhøje Nuclear Structure at High Excitation Energy Studied with Giant Resonances , 1992 .

[180]  B. Bhandari Three-hump fission barrier in ^{232}Th , 1979 .

[181]  B. Holmqvist,et al.  An Experimental Study of the Prompt Fission Neutron Spectrum Induced by 0.5-MeV Neutrons Incident on Uranium-235 , 1977 .

[182]  Haixia An,et al.  Global deuteron optical model potential for the energy range up to 183 MeV , 2006 .

[183]  G. Bartholomew,et al.  Gamma-Ray Strength Functions , 1973 .

[184]  S. Åberg,et al.  Heavy-element fission barriers , 2009 .

[185]  G. Burgio,et al.  Zero-temperature relaxation time. A test for the collision integral☆ , 1989 .

[186]  V. Strutinsky,et al.  Intermediate states in fission , 1969 .

[187]  S. K. Kataria,et al.  Macroscopic systematics of nuclear level densities , 1980 .

[188]  V. Maslov Pairing effects in 232Th neutron-induced fission cross section , 2004 .

[189]  F. C. Williams Particle-hole state density in the uniform spacing model , 1971 .

[190]  M. Divadeenam,et al.  Neutron cross sections , 1981 .

[191]  S. Kailas,et al.  Decay of hot, high-spin nuclei produced in 6 Li-induced fusion reactions , 1982 .

[192]  A. Tudora Systematic behaviour of the average parameters required for the Los Alamos model of prompt neutron emission , 2009 .

[193]  A. Marcinkowski,et al.  Particle-hole state densities for calculation of the multi-step compound emission , 1985 .

[194]  J. Speth,et al.  Theoretical description of giant resonances in stable and unstable magic nuclei , 1994 .

[195]  R. Lipperheide,et al.  Energy dependence of phenomenological optical-model potentials , 1968 .

[196]  S. Goriely Radiative neutron captures by neutron-rich nuclei and the r-process nucleosynthesis , 1998 .

[197]  J. Delaroche,et al.  Combinatorial nuclear level densities based on the Gogny nucleon-nucleon effective interaction , 2001 .

[198]  J. E. Lynn,et al.  The double-humped fission barrier , 1980 .

[199]  E. Melby,et al.  γ-ray strength function and pygmy resonance in rare earth nuclei , 2000, nucl-ex/0009018.

[200]  W. M. Howard,et al.  Calculated fission barriers, ground-state masses, and particle separation energies for nuclei with 76 ≤ Z ≤ 100 and 140 ≤ N ≤ 184☆ , 1980 .

[201]  R. Capote,et al.  Level densities of transitional Sm nuclei , 2005 .

[202]  S. Goriely,et al.  Further explorations of Skyrme-Hartree-Fock-Bogoliubov mass formulas. V. Extension to fission barriers , 2005 .

[203]  Philip R. Page,et al.  ENDF/B-VII.0: Next Generation Evaluated Nuclear Data Library for Nuclear Science and Technology , 2006 .

[204]  M. Avrigeanu,et al.  Partial level densities for nuclear data calculations , 1998, physics/9805002.

[205]  A. Koning,et al.  Generalized particle-hole state densities within the equidistant spacing model , 1998 .

[206]  E. Hilf,et al.  Droplet Model of the Giant Dipole Resonance , 1977 .

[207]  S. Wynchank,et al.  Neutron-Resonance Spectroscopy. VIII. The Separated Isotopes of Erbium: Evidence for Dyson's Theory Concerning Level Spacings , 1972 .

[208]  R. Capote,et al.  Exact formulation of particle-hole state densities in the equidistant spacing model with pauli and pairing corrections , 1989 .

[209]  S. Goriely,et al.  First Gogny-Hartree-Fock-Bogoliubov nuclear mass model. , 2009, Physical review letters.

[210]  I. Kadenko,et al.  THE SIMPLIFIED DESCRIPTION OF DIPOLE RADIATIVE STRENGTH FUNCTION , 2008 .

[211]  W. Swiatecki,et al.  Surface-layer corrections to the level-density formula for a diffuse Fermi gas , 1981 .

[212]  T. Tveter,et al.  Angular momentum dependence of the GDR width in Sn nuclei at fixed excitation energy , 1997 .

[213]  G. Burgio,et al.  Nuclear collective motions in a self-consistent Landau-Vlasov approach , 1988 .

[214]  H. Krappe,et al.  Unified nuclear potential for heavy-ion elastic scattering, fusion, fission, and ground-state masses and deformations , 1979 .

[215]  Chrien,et al.  Test of photon strength functions by a method of two-step cascades. , 1992, Physical review. C, Nuclear physics.

[216]  W. Myers,et al.  Thomas-Fermi fission barriers , 1999 .

[217]  S. Goriely,et al.  Skyrme-Hartree-Fock-Bogoliubov nuclear mass formulas: crossing the 0.6 MeV accuracy threshold with microscopically deduced pairing. , 2009, Physical review letters.

[218]  C. Mahaux,et al.  Causality and the threshold anomaly of the nucleus-nucleus potential , 1986 .

[219]  P. Hodgson,et al.  Particle-hole state densities in pre-equilibrium nuclear reaction models , 1998 .

[220]  R. Broglia,et al.  Collisions and mean field fluctuations in the relaxation of giant resonances in hot nuclei , 1989 .

[221]  L. Cooper,et al.  Theory of superconductivity , 1957 .

[222]  Zuker,et al.  Microscopic mass formulas. , 1995, Physical review. C, Nuclear physics.

[223]  E. Migneco,et al.  Resonance grouping structure in neutron induced subthreshold fission of 240Pu , 1968 .

[224]  R. Varner,et al.  A global nucleon optical model potential , 1991 .

[225]  F. Perey,et al.  Compilation of phenomenological optical-model parameters 1954–1975 , 1976 .

[226]  C. L. Dunford,et al.  A dipole–quadrupole interaction term in E1 photon transitions , 2000 .

[227]  B. Back,et al.  Fission of doubly even actinide nuclei induced by direct reactions , 1974 .

[228]  P. Ring,et al.  The decay of hot nuclei , 1993 .

[229]  W. Myers,et al.  Nuclear ground state masses and deformations , 1995 .

[230]  Bonasera,et al.  Damping of giant resonances in hot nuclei. , 1991, Physical review. C, Nuclear physics.

[231]  André Lejeune,et al.  Optical-model potential in nuclear matter from Reid's hard core interaction , 1974 .

[232]  P. Moldauer OPTICAL MODEL OF LOW ENERGY NEUTRON INTERACTIONS WITH SPHERICAL NUCLEI , 1963 .

[233]  M. Herman,et al.  Codes for the combinatorial calculation of few quasiparticle state densities in spherical and deformed nuclei , 1987 .

[234]  Y. Blumenfeld,et al.  Proton scattering from the unstable nuclei 30S and 34Ar: structural evolution along the sulfur and argon isotopic chains , 2001 .

[235]  V. A. Khitrov,et al.  Direct experimental estimate of parameters that determine the cascade gamma decay of compound states of heavy nuclei , 2001 .

[236]  J. M. Quesada,et al.  Analytical expressions for the dispersive contributions to the nucleon-nucleus optical potential , 2003 .

[237]  Combinatorial nuclear level density by a Monte Carlo method. , 1993, Physical review. C, Nuclear physics.

[238]  W. D. Myers,et al.  NUCLEAR MASSES AND DEFORMATIONS , 1966 .

[239]  V. Plujko,et al.  Dependence of E1 Radiative Strength Function on Neutron Excess in Heavy Nuclei , 2005 .

[240]  Arjan J. Koning,et al.  Local and global nucleon optical models from 1 keV to 200 MeV , 2003 .

[241]  P. Tikkanen,et al.  TRANSITION PROBABILITY FROM THE GROUND TO THE FIRST-EXCITED 2+ STATE OF EVEN–EVEN NUCLIDES , 2001 .

[242]  A. Bohr,et al.  Role of symmetry of the nuclear shape in rotational contributions to nuclear level densities , 1974 .

[243]  E. Erba,et al.  Statistical Emission in Nuclear Reactions and nuclear level density , 1961 .

[244]  V. Maslov Pairing effects in239Pu(n, 2n) reaction cross section , 1994 .

[245]  C. Fu Implementation of on Advanced Pairing Correction for Particle-Hole State Densities in Precompound Nuclear Reaction Theory , 1984 .

[246]  P. Ring,et al.  Collectivity of the low-lying dipole strength in relativistic random phase approximation , 2001, nucl-th/0101063.

[247]  V. Avrigeanu,et al.  Complementary optical-potential analysis of α-particle elastic scattering and induced reactions at low energies , 2008, 0808.0566.

[248]  J. J. Malanify,et al.  Total-Reaction-Cross-Section Measurements for 30-60-MeV Protons and the Imaginary Optical Potential , 1971 .

[249]  A. Lane Isobaric spin dependence of the optical potential and quasi-elastic (p, n) reactions , 1962 .

[250]  D. Madland,et al.  Prompt fission neutron spectra and average prompt neutron multiplicities , 1982 .

[251]  S. Goriely,et al.  Hartree-Fock mass formulas and extrapolation to new mass data , 2002 .

[252]  F. C. Williams An iterative method for the calculation of nuclear level densities , 1969 .

[253]  T. Egidy,et al.  Nuclear level densities and level spacing distributions: Part II , 1988 .

[254]  R. Broglia,et al.  The giant dipole resonance in hot nuclei , 1992 .

[255]  W. Haeberli,et al.  Elastic scattering of 9–13 MeV vector polarized deuterons , 1974 .

[256]  Warner,et al.  Effect of the neutron skin on collective states of nuclei. , 1992, Physical review. C, Nuclear physics.

[257]  G. R. Satchler,et al.  Optical-model analysis of the scattering of 24.7 MeV alpha particles , 1966 .

[258]  S. Schadmand,et al.  Giant monopole resonances in the statistical model , 1991 .

[259]  L. Moretto Thermodynamical properties of a paired nucleus with a fixed number of quasi-particles☆ , 1975 .

[260]  P. Hodgson,et al.  The calculation of neutron cross-sections from optical potentials , 1964 .

[261]  S. Hilaire,et al.  Large-scale mean-field calculations from proton to neutron drip lines using the D1S Gogny force , 2007 .

[262]  T. Egidy,et al.  Nuclear level densities and level spacing distributions , 1986 .

[263]  J. L. Norton,et al.  New Calculation of Fission Barriers for Heavy and Superheavy Nuclei , 1972 .

[264]  Herman,et al.  Effect of nuclear deformation on few-quasiparticle state densities. , 1988, Physical review. C, Nuclear physics.

[265]  Axel,et al.  ELECTRIC DIPOLE GROUND STATE TRANSITION WIDTH STRENGTH FUNCTION AND 7 MEV PHOTON INTERACTIONS. Technical Report No. 30 , 1962 .

[266]  Raman,et al.  Density of discrete levels in 116Sn. , 1993, Physical review. C, Nuclear physics.

[267]  Wierzbicki,et al.  Phenomenological analysis of dispersion corrections for neutron and proton scattering from 208Pb. , 1989, Physical review. C, Nuclear physics.

[268]  H. Ngô,et al.  Effective masses, occupation probabilities and quasiparticle strengths in 208Pb , 1984 .

[269]  Yutaka Nakajima,et al.  Fermi-Gas Model Parametrization of Nuclear Level Density. , 1994 .

[270]  W. Rapp,et al.  Astrophysical S factor for α-capture on Sn112 in the p-process energy range , 2007 .

[271]  W. Tornow,et al.  Dispersion relation approach to the coulomb correction term of the proton-nucleus optical model potential , 1988 .

[272]  W. Loveland,et al.  Elements beyond uranium , 1990 .

[273]  C. Engelbrecht,et al.  Nonlocal potentials and the energy dependence of the optical model for neutrons , 1967 .

[274]  J. Sida,et al.  The Giant Dipole Resonance in hot Sn nuclei , 1996 .

[275]  K. Schilling,et al.  Systematics of magnetic dipole strength in the stable even-mass Mo isotopes , 2006 .

[276]  A. Junghans,et al.  Pair breaking and even–odd structure in fission-fragment yields , 2000 .

[277]  S. Fallieros,et al.  Energy Displacement of Dipole Isodoublets , 1971 .

[278]  M. W. Herman,et al.  EMPIRE: Nuclear Reaction Model Code System for Data Evaluation , 2007 .

[279]  C. Coceva Radiative transitions from neutron capture in53Cr resonances , 1994 .

[280]  S. Goriely,et al.  Large-scale QRPA calculation of E1-strength and its impact on the neutron capture cross section , 2002, nucl-th/0203074.

[281]  Hans A. Bethe,et al.  Nuclear Physics B. Nuclear Dynamics, Theoretical , 1937 .

[282]  S. G. Thompson,et al.  The New Elements Einsteinium and Fermium, Atomic Numbers 99 and 100 , 1955 .

[283]  F. G. Perey,et al.  Optical-Model Analysis of Proton Elastic Scattering in the Range of 9 to 22 MeV , 1963 .

[284]  F. Perey,et al.  Compilation of phenomenological optical-model parameters 1969–1972 , 1974 .

[285]  M. A. Lone Photon Strength Functions , 1979 .

[286]  Chrien,et al.  Radiative strength in the compound nucleus 157Gd. , 1993, Physical review. C, Nuclear physics.

[287]  C. M. McCullagh,et al.  Dipole radiative strength functions from resonance neutron capture , 1981 .

[288]  F. Thielemann,et al.  Average Radiation Widths and the Giant Dipole Resonance Width , 1983 .

[289]  E. Bauge,et al.  Semimicroscopic nucleon-nucleus spherical optical model for nuclei with A>=40 at energies up to 200 MeV , 1998 .

[290]  A. Jensen,et al.  Energy dependence of the rotational enhancement factor in the level density , 1983 .

[291]  Canada,et al.  Fission barriers of neutron-rich and superheavy nuclei calculated with the ETFSI method , 2000 .

[292]  C. Stoyanov,et al.  Nuclear properties in the lead region within the quasiparticle-phonon nuclear model , 1983 .

[293]  B. Goulard,et al.  Isovector excitations in nuclei , 1970 .

[294]  Bhandari Test of the adequacy of using smoothly joined parabolic segments to parametrize the multihumped fission barriers in actinides. , 1990, Physical review. C, Nuclear physics.

[295]  S. Goriely Nuclear inputs for astrophysics applications , 2001 .

[296]  H. Beil,et al.  A semi-phenomenological description of the giant dipole resonance width , 1974 .

[297]  M. Herman,et al.  Semi-empirical determination of the shell correction temperature and spin dependence by means of nuclear fission , 1994 .