English

The pion-three-nucleon problem with two-cluster connected-kernel equations

Nuclear Theory 2008-11-26 v1

Abstract

It is found that the coupled piNNN-NNN system breaks into fragments in a nontrivial way. Assuming the particles as distinguishable, there are indeed four modes of fragmentation into two clusters, while in the standard three-body problem there are three possible two-cluster partitions and conversely the four-body problem has seven different possibilities. It is shown how to formulate the pion-three-nucleon collision problem through the integral-equation approach by taking into account the proper fragmentation of the system. The final result does not depend on the assumption of separability of the two-body t-matrices. Then, the quasiparticle method a' la Grassberger-Sandhas is applied and effective two-cluster connected-kernel equations are obtained. The corresponding bound-state problem is also formulated, and the resulting homogeneous equation provides a new approach which generalizes the commonly used techniques to describe the three-nucleon bound-state problem, where the meson degrees of freedom are usually suppressed.

Keywords

Cite

@article{arxiv.nucl-th/9806061,
  title  = {The pion-three-nucleon problem with two-cluster connected-kernel equations},
  author = {L. Canton},
  journal= {arXiv preprint arXiv:nucl-th/9806061},
  year   = {2008}
}

Comments

20 pages, REVTeX, with 3 COLOR figures (PostScript)