NSR Query Results
Output year order : Descending NSR database version of April 29, 2024. Search: Author = S.N.Mukherjee Found 20 matches. 2001MB02 Pramana 57, 717 (2001) S.Mahapatra, J.Nag, D.P.Sural, S.N.Mukherjee A Simple Coordinate Space Approach to Three-Body Problems - Examples: Halo nucleus and double-λ Hypernucleus NUCLEAR STRUCTURE 11Li, 19B; calculated radii, two-neutron separation energies, effective potentials. 6He; calculated double-Λ hypernucleus binding energy, radius. Coordinate space variational approach.
doi: 10.1007/s12043-001-0022-z
2000CH23 Fizika(Zagreb) B9, 11 (2000) B.Chakrabarti, T.D.Das, S.N.Mukherjee A Simple Variational Calculation for a Three-Body Model of 11Li NUCLEAR STRUCTURE 11Li; calculated halo, core and rms radii, binding energy, halo distribution, single particle radial distributions, one particle density distribution, transverse momentum distribution. Comparison with data and other theoretical approaches.
1994MA01 Phys.Rev. C49, 142 (1994) Signature Inversion and Change in Triaxiality in 159Tm and 159Er NUCLEAR STRUCTURE 159Tm, 159Er; calculated levels, band structure; deduced band signature inversion, triaxiality change features. Triaxial rotor plus one quasiparticle model.
doi: 10.1103/PhysRevC.49.142
1991NA10 Phys.Rev. C44, 1709 (1991) R.Nag, S.N.Mukherjee, S.Sanyal Energy Levels of a Muonic Hydrogen Atom with the Use of a Quark Model NUCLEAR STRUCTURE 1H; calculated charge distribution, form factor; deduced muonic atom level energies. Nonrelativistic quark model.
doi: 10.1103/PhysRevC.44.1709
1990ME02 Phys.Rev. C41, 1031 (1990) V.J.Menon, S.N.Mukherjee, C.S.Shastry, B.Sahu Analytically Soluble Model for Fusion Time NUCLEAR REACTIONS 124Sn(58Ni, X), E=168.25-202.84 MeV; 90Zr(81Br, X), 122Sn(40Ar, X), 64Ni(58Ni, X), E not given; calculated fusion time vs energy. Analytical model.
doi: 10.1103/PhysRevC.41.1031
1990NA07 Prog.Theor.Phys.(Kyoto) 83, 51 (1990) R.Nag, S.Sanyal, S.N.Mukherjee Hyperspherical Harmonics Technique for the Electromagnetic Structure of Nucleon NUCLEAR STRUCTURE 1n, 1H; calculated charge form factor. Single quark potential model.
doi: 10.1143/PTP.83.51
1989NA15 Pramana 32, 761 (1989) R.Nag, S.N.Mukherjee, S.Sanyal Criterion for a Unique Non-Relativistic Quark Model NUCLEAR STRUCTURE 1n, 1H; calculated rms charge radii. Unique nonrelativistic quark potential model.
doi: 10.1007/BF02845997
1987SA23 Phys.Rev. C36, 67 (1987) Inelastic Electron Scattering Charge Form-Factor of 4He NUCLEAR STRUCTURE 4He; calculated binding energy, rms radius. NUCLEAR REACTIONS 4He(e, e'), E not given; calculated charge form factor.
doi: 10.1103/PhysRevC.36.67
1985RA30 Pramana 24, 715 (1985) R-Matrix Plus Potential Analysis of Unbound States of 33S NUCLEAR REACTIONS 32S(n, n), E=20-1060 keV; calculated σ(E); deduced background R-matrix. 33S resonances deduced L, J, π, Γn, Γ, reduced width. DWBA, R-matrix analyses.
doi: 10.1007/BF02846791
1985SA01 Phys.Rev. C31, 33 (1985) Hyperspherical Formalism for the Photoeffect of Alpha Particle NUCLEAR REACTIONS 4He(γ, X), E=20-80 MeV; calculated photoeffect σ(E), moments. Hyperspherical harmonics, coupled equations, adiabatic approximation.
doi: 10.1103/PhysRevC.31.33
1984MU06 Phys.Rev. C29, 1095 (1984) S.N.Mukherjee, L.N.Pandey, D.K.Srivastava, N.K.Ganguly Deuteron Breakup in the Field of a Heavy Target NUCLEAR REACTIONS 208Pb(d, d), E=79.4 MeV; calculated σ(θ); deduced deuteron breakup role. Coupled equations model.
doi: 10.1103/PhysRevC.29.1095
1984PA05 Phys.Rev. C29, 1326 (1984) Radius Anomaly in the Diffraction Model for Heavy-Ion Elastic Scattering NUCLEAR REACTIONS 208Pb(20Ne, 20Ne), E=161.2 MeV; 235U(20Ne, 20Ne), E=175 MeV; 208Pb, 232Th(84Kr, 84Kr), E=500 MeV; analyzed σ(θ); deduced nuclear deformation, radius anomaly connection. Diffraction model.
doi: 10.1103/PhysRevC.29.1326
1983MU16 Phys.Rev. C28, 1104 (1983) Quantal Dynamics of Dissipation in Heavy Ion Nuclear Fission NUCLEAR REACTIONS 232Th(40Ar, X), (40Ar, F), E=250 MeV; calculated energy dissipation during fission, energy loss vs fissioning system shape. One dimensional quanitized frictional motion, time dependent Schrodinger equation.
doi: 10.1103/PhysRevC.28.1104
1980RA09 Nucl.Phys. A342, 90 (1980) Second-Order Breakup Corrections to Elastic Deuteron-Nickel Scattering between 13 and 80 MeV NUCLEAR REACTIONS 58Ni(d, d), E=13-80 MeV; 58Ni(polarized d, d), E=80 MeV; calculated σ(θ), vector, tensor analyzing power vs θ. DWBA, second-order breakup corrections.
doi: 10.1016/0375-9474(80)90508-4
1978MU12 Phys.Rev. C18, 1110 (1978) S.N.Mukherjee, R.Shyam, S.Pal, N.K.Ganguly Slowly Converging Integrals in the Analysis of Deuteron Stripping to Decaying States NUCLEAR REACTIONS 32S(d, p), E=12 MeV; calculated σ(Ep, θ). Method of handling divergent integrals discussed.
doi: 10.1103/PhysRevC.18.1110
1977MU04 Phys.Rev. C15, 1238 (1977) S.N.Mukherjee, R.Shyam, S.Pal, N.K.Ganguly Distorted Wave Analysis of (d, p) Reactions to Decaying States NUCLEAR REACTIONS 32S, 16O(d, p), E=12-13.3 MeV; calculated σ(E). DWBA analysis.
doi: 10.1103/PhysRevC.15.1238
1976MU06 Phys.Rev. C13, 1849 (1976) S.N.Mukherjee, S.Pal, D.K.Srivastava, N.K.Ganguly Stripping Channel Contribution to the Nonlocality of the Deuteron Optical Potential NUCLEAR REACTIONS 48Ca(d, d), E=4.0-16.0 MeV; calculated σ(E, θ); deduced energy dependent d-48Ca optical potential.
doi: 10.1103/PhysRevC.13.1849
1975SH27 Progr.Theor.Phys. 53, 1846 (1975) Sum Rules for γ(d, n)p Reaction NUCLEAR REACTIONS 2H(γ, p); calculated σ.
doi: 10.1143/PTP.53.1846
1971RA39 Ann.Phys.(New York) 68, 57 (1971) Spin Dependent Deuteron-Nucleus Interaction Caused by the Coupling to Stripping Channels NUCLEAR REACTIONS 40Ca(d, d), (d, p), E=11 MeV; calculated deuteron vector polarization, σ(θ). Spin-dependent interaction.
doi: 10.1016/0003-4916(71)90241-7
1968RU05 Nucl.Phys. A117, 321 (1968) M.L.Rustgi, J.G.Lucas, S.N.Mukherjee Application of Intermediate-Coupling Unified Nuclear Model to Odd-Mass Iodine Isotopes
doi: 10.1016/0375-9474(68)90846-4
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