dorsal/arxiv
View SchemaA New Renormalization Group for Hamiltonian Field Theory
| Authors | Robert J. Perry, Sergio Szpigel |
|---|---|
| Categories | |
| ArXiv ID | nucl-th/9901079 |
| URL | https://arxiv.org/abs/nucl-th/9901079 |
Abstract
The Schrodinger equation with a two-dimensional delta-function potential is a simple example of an asymptotically free theory that undergoes dimensional transmutation. Renormalization requires the introduction of a mass scale, which can be lowered perturbatively until an infrared cutoff produced by non-perturbative effects such as bound state formation is encountered. We outline the effective field theory and similarity renormalization group techniques for producing renormalized cutoff hamiltonians, and illustrate the control of logarithmic and inverse-power-law errors both techniques provide.
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"abstract": "The Schrodinger equation with a two-dimensional delta-function potential is a\nsimple example of an asymptotically free theory that undergoes dimensional\ntransmutation. Renormalization requires the introduction of a mass scale, which\ncan be lowered perturbatively until an infrared cutoff produced by\nnon-perturbative effects such as bound state formation is encountered. We\noutline the effective field theory and similarity renormalization group\ntechniques for producing renormalized cutoff hamiltonians, and illustrate the\ncontrol of logarithmic and inverse-power-law errors both techniques provide.",
"arxiv_id": "nucl-th/9901079",
"authors": [
"Robert J. Perry",
"Sergio Szpigel"
],
"categories": [
"nucl-th",
"hep-ph",
"hep-th"
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"title": "A New Renormalization Group for Hamiltonian Field Theory",
"url": "https://arxiv.org/abs/nucl-th/9901079"
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