Reduction of Faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics method
After reformulating of Faddeev equations and its reducing to the equation with one complete wave function the most complex part of this function is represented in the form of rapidly converging series on K-harmonics. The system of the connected integral equations is constructing for radial functions...
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| Format: | Article |
| Language: | English |
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Institute for Nuclear Research, National Academy of Sciences of Ukraine
2008-12-01
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| Series: | Ядерна фізика та енергетика |
| Online Access: | http://jnpae.kinr.kiev.ua/25(3)/Articles_PDF/jnpae-2008-3(25)-0022-Tartakovsky.pdf |
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| _version_ | 1849467605136441344 |
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| author | V. K. Tartakovsky I. V. Kozlovsky V. I. Kovalchuk |
| author_facet | V. K. Tartakovsky I. V. Kozlovsky V. I. Kovalchuk |
| author_sort | V. K. Tartakovsky |
| collection | DOAJ |
| description | After reformulating of Faddeev equations and its reducing to the equation with one complete wave function the most complex part of this function is represented in the form of rapidly converging series on K-harmonics. The system of the connected integral equations is constructing for radial functions of the collective variable and the procedure of its solution is proposed. |
| format | Article |
| id | doaj-art-e017096e06694bb0b8913768bddcddff |
| institution | Kabale University |
| issn | 1818-331X 2074-0565 |
| language | English |
| publishDate | 2008-12-01 |
| publisher | Institute for Nuclear Research, National Academy of Sciences of Ukraine |
| record_format | Article |
| series | Ядерна фізика та енергетика |
| spelling | doaj-art-e017096e06694bb0b8913768bddcddff2025-08-20T03:26:09ZengInstitute for Nuclear Research, National Academy of Sciences of UkraineЯдерна фізика та енергетика1818-331X2074-05652008-12-0132227Reduction of Faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics methodV. K. Tartakovsky0I. V. Kozlovsky1V. I. Kovalchuk2Institute for Nuclear Research, National Academy of Sciences of Ukraine, Kyiv, UkraineBogolyubov Institute for Theoretical Physics, National Academy of Sciences of Ukraine, Kyiv, UkraineTaras Shevchenko National University, Kyiv, UkraineAfter reformulating of Faddeev equations and its reducing to the equation with one complete wave function the most complex part of this function is represented in the form of rapidly converging series on K-harmonics. The system of the connected integral equations is constructing for radial functions of the collective variable and the procedure of its solution is proposed.http://jnpae.kinr.kiev.ua/25(3)/Articles_PDF/jnpae-2008-3(25)-0022-Tartakovsky.pdf |
| spellingShingle | V. K. Tartakovsky I. V. Kozlovsky V. I. Kovalchuk Reduction of Faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics method Ядерна фізика та енергетика |
| title | Reduction of Faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics method |
| title_full | Reduction of Faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics method |
| title_fullStr | Reduction of Faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics method |
| title_full_unstemmed | Reduction of Faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics method |
| title_short | Reduction of Faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics method |
| title_sort | reduction of faddeev equations to the system of equations for functions of one variable by hyperspherical harmonics method |
| url | http://jnpae.kinr.kiev.ua/25(3)/Articles_PDF/jnpae-2008-3(25)-0022-Tartakovsky.pdf |
| work_keys_str_mv | AT vktartakovsky reductionoffaddeevequationstothesystemofequationsforfunctionsofonevariablebyhypersphericalharmonicsmethod AT ivkozlovsky reductionoffaddeevequationstothesystemofequationsforfunctionsofonevariablebyhypersphericalharmonicsmethod AT vikovalchuk reductionoffaddeevequationstothesystemofequationsforfunctionsofonevariablebyhypersphericalharmonicsmethod |