dorsal/arxiv
View SchemaCovariant three-body equations in phi^3 field theory
| Authors | A. N. Kvinikhidze, B. Blankleider |
|---|---|
| Categories | |
| ArXiv ID | nucl-th/9402010 |
| URL | https://arxiv.org/abs/nucl-th/9402010 |
| DOI | 10.1016/0375-9474(94)90959-8 |
| Journal | Nucl.Phys. A574 (1994) 788-818 |
Abstract
We derive four-dimensional relativistic three-body equations for the case of a field theory with a three-point interaction vertex. These equations describe the coupled 2->2, 2->3, and 3->3 processes, and provide the means of calculating the kernel of the 2->2 Bethe-Salpeter equation. Our equations differ from all previous formulations in two essential ways. Firstly, we have overcome the overcounting problems inherent in earlier works. Secondly, we have retained all possible two-body forces when one particle is a spectator. In this respect, we show how it is necessary to also retain certain three-body forces as these can give rise to (previously overlooked) two-body forces when used in a 2->3 process. The revealing of such hidden two-body forces gives rise to a further novel feature of our equations, namely, to the appearance of a number of subtraction terms. In the case of the piNN system, for example, the NN potential involves a subtraction term where two pions, exchanged between the nucleons, interact with each other through the pi-pi t-matrix. The necessity of an input pi-pi interaction is surprising and contrasts markedly with the corresponding three-dimensional description of the piNN system where no such interaction explicitly appears. This illustrates the somewhat unexpected result that the four-dimensional equations differ from the three-dimensional ones even at the operator level.
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"abstract": "We derive four-dimensional relativistic three-body equations for the case of\na field theory with a three-point interaction vertex. These equations describe\nthe coupled 2-\u003e2, 2-\u003e3, and 3-\u003e3 processes, and provide the means of\ncalculating the kernel of the 2-\u003e2 Bethe-Salpeter equation. Our equations\ndiffer from all previous formulations in two essential ways. Firstly, we have\novercome the overcounting problems inherent in earlier works. Secondly, we have\nretained all possible two-body forces when one particle is a spectator. In this\nrespect, we show how it is necessary to also retain certain three-body forces\nas these can give rise to (previously overlooked) two-body forces when used in\na 2-\u003e3 process. The revealing of such hidden two-body forces gives rise to a\nfurther novel feature of our equations, namely, to the appearance of a number\nof subtraction terms. In the case of the piNN system, for example, the NN\npotential involves a subtraction term where two pions, exchanged between the\nnucleons, interact with each other through the pi-pi t-matrix. The necessity of\nan input pi-pi interaction is surprising and contrasts markedly with the\ncorresponding three-dimensional description of the piNN system where no such\ninteraction explicitly appears. This illustrates the somewhat unexpected result\nthat the four-dimensional equations differ from the three-dimensional ones even\nat the operator level.",
"arxiv_id": "nucl-th/9402010",
"authors": [
"A. N. Kvinikhidze",
"B. Blankleider"
],
"categories": [
"nucl-th",
"hep-th"
],
"doi": "10.1016/0375-9474(94)90959-8",
"journal_ref": "Nucl.Phys. A574 (1994) 788-818",
"title": "Covariant three-body equations in phi^3 field theory",
"url": "https://arxiv.org/abs/nucl-th/9402010"
},
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