H
Herman Feshbach
Researcher at Massachusetts Institute of Technology
Publications - 131
Citations - 12267
Herman Feshbach is an academic researcher from Massachusetts Institute of Technology. The author has contributed to research in topics: Scattering & Elastic scattering. The author has an hindex of 36, co-authored 131 publications receiving 11837 citations. Previous affiliations of Herman Feshbach include Istituto Nazionale di Fisica Nucleare & Los Alamos National Laboratory.
Papers
More filters
Journal ArticleDOI
Unified theory of nuclear reactions
TL;DR: In this article, a new formulation of the theory of nuclear reactions based on the properties of a generalized "optical" potential is presented, where the real and imaginary part of this potential satisfy a dispersion type relation while its poles give rise to resonances in nuclear reactions.
Journal ArticleDOI
A Unified Theory of Nuclear Reactions, II
TL;DR: In this paper, the effective Hamiltonian method for nuclear reactions described in an earlier paper with the same title, part I, is generalized so as to include all possible reaction types, as well as the effects arising from the identity of particles.
Journal ArticleDOI
The Inelastic Scattering of Neutrons
Walter Hauser,Herman Feshbach +1 more
TL;DR: The total cross section and differential cross section for the inelastic scattering of neutrons are considered in this article, where it is assumed that the compound nucleus is sufficiently excited so that the statistical model may be applied.
Journal ArticleDOI
Pions and Nuclei
TL;DR: The pion has emerged as the main feature of nuclear structure beyond the traditional description in terms of neutrons and protons and it manifests itself in a number of areas which are normally only loosely interlinked, but intimately related to the pion-nucleon and pion nuclear interactions.
Journal ArticleDOI
The Coulomb Scattering of Relativistic Electrons by Nuclei
TL;DR: In this article, the Coulomb scattering of relativistic electrons by atomic nuclei has been evaluated and the exact results obtained by Mott have been expanded in a power series.