## Proceedings of the International School of Physics "Enrico Fermi.", Volume 23N. Zanichelli, 1963 - Nuclear physics |

### From inside the book

Results 1-3 of 12

Page 145

... + rg°(E) , where the first part, -J''J'f'(E), is slowly varying with JSand represents

the elastic or D.I. part of the matrix element, and where the second part is the

?

... + rg°(E) , where the first part, -J''J'f'(E), is slowly varying with JSand represents

the elastic or D.I. part of the matrix element, and where the second part is the

**resonant**C.N. part with intermediate**resonant**states i of complex energy Ei= Re 2?

Page 146

In such a situation there is no particular reason to believe the

have neither a particularly good, nor a particularly bad, overlap in <0|,7"j|i>. It is

convenient to look at.^i|0> as a vector in a Hilbert space. This vector is projected

...

In such a situation there is no particular reason to believe the

**resonant**state i tohave neither a particularly good, nor a particularly bad, overlap in <0|,7"j|i>. It is

convenient to look at.^i|0> as a vector in a Hilbert space. This vector is projected

...

Page 178

The ; first diagram is Hartree-Fock. o) (w=(glr.+(y,., a sum of

onant terms. This relation will have a definite meaning in terms of its matrix

elements computed in the chosen configuration. Another way of saying this is that

the ...

The ; first diagram is Hartree-Fock. o) (w=(glr.+(y,., a sum of

**resonant**and nonres-onant terms. This relation will have a definite meaning in terms of its matrix

elements computed in the chosen configuration. Another way of saying this is that

the ...

### What people are saying - Write a review

We haven't found any reviews in the usual places.

### Contents

Lectures | 1 |

G E Brown Collective motion and the application of manybody | 99 |

T Ep icson The compound nucleus and the random phase approximation | 142 |

Copyright | |

1 other sections not shown

### Other editions - View all

### Common terms and phrases

amplitude approximation assume calculated closed shells coefficients commutation compound configuration consider corresponding coupling cross-section define deformed describe determined diagonal dipole dipole strength discuss eigenfunctions eigenstate eigenvalues electron equation excitation energy expectation value experimental factor force gives Green's function ground Hamiltonian harmonic oscillator Hartree-Fock hermitian adjoint hole hyperfine-structure intrinsic irreducible representation isobaric spin isospin isotope shift large number lecture levels linear magnetic matrix elements Ml transitions Mottelson multipole neutron nuclear charge distribution nucleon nucleus number of particles obtained one-particle operator operator F optical potential orbitals orthogonal pair parameters particle-hole interaction perturbation theory Phys physical problem proton quadrupole qualitative quantum number quasi-particle random relation residual interaction resonant rotation rotation group scattering self-consistent shell-model shown single-particle solution spectrum spherical symmetry time-dependent tion total angular momentum two-body two-particle unperturbed variation vector vibrations wave function wave-functions width y-ray zero