A Poincar\'e invariant treatment of the three-nucleon problem

W. Polyzou; M. Tucker; S. Veerasamy; Ch. Elster; T. Lin; W. Gl\"ockle,; H. Wita{\l}a; J. Golak; R. Skibi\'nski; H. Kamada; B. Keister

arXiv:0812.2204·nucl-th·February 19, 2009

A Poincar\'e invariant treatment of the three-nucleon problem

W. Polyzou, M. Tucker, S. Veerasamy, Ch. Elster, T. Lin, W. Gl\"ockle,, H. Wita{\l}a, J. Golak, R. Skibi\'nski, H. Kamada, B. Keister

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TL;DR

This paper reviews recent advances in applying Poincaré invariant methods to solve the three-nucleon problem at intermediate energies, improving the understanding of relativistic effects in nuclear interactions.

Contribution

It introduces a Poincaré invariant framework for the three-nucleon problem, enhancing the accuracy of nuclear interaction models at intermediate energies.

Findings

01

Improved relativistic three-nucleon models

02

Enhanced understanding of intermediate-energy nuclear interactions

03

Progress in Poincaré invariant computational techniques

Abstract

I summarize recent progress in the treatment of the Poincar\'e three-nucleon problem at intermediate energies

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Taxonomy

TopicsQuantum Chromodynamics and Particle Interactions · Nuclear physics research studies · Particle physics theoretical and experimental studies