000 | a | ||
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999 |
_c31778 _d31778 |
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008 | 230416b xxu||||| |||| 00| 0 eng d | ||
020 | _a9781498745253 | ||
082 |
_a512.73 _bSIL |
||
100 | _aSills, Andrew V. | ||
245 | _aInvitation to the Rogers-Ramanujan identities | ||
260 |
_bCRC Press, _c2018 _aBoca Raton : |
||
300 |
_axx, 233 p.; _bill., _c25 cm |
||
365 |
_b99.99 _cGBP _d104.20 |
||
504 | _aIncludes bibliographical references and index. | ||
520 | _aThe Rogers-Ramanujan identities are a pair of infinite series--infinite product identities that were first discovered in 1894. Over the past several decades, these identities, and identities of similar type, have found applications in number theory, combinatorics, Lie algebra and vertex operator algebra theory, physics (especially statistical mechanics), and computer science (especially algorithmic proof theory). Presented clearly and coherently, An Invitation to the Rogers-Ramanujan Identities is the first book entirely devoted to the Rogers-Ramanujan identities and includes related historical material that is unavailable elsewhere. | ||
650 | _aInfinite Products | ||
650 | _aInfinite Series | ||
650 | _aRogers-Ramanujan identities | ||
650 | _aCombinatonics | ||
650 | _aNumber theory | ||
650 | _aAndrews,George | ||
650 | _a Bailey pair | ||
650 | _aBinomial theorem | ||
650 | _aDyson mod | ||
650 | _aEuler's partition theorem | ||
650 | _aFalse theta function | ||
650 | _aGauss'hexagonal numbers theoem | ||
650 | _aHypergeometric series | ||
650 | _aJacobi symbol | ||
650 | _aParrtition function | ||
650 | _aSchur'smod | ||
942 |
_2ddc _cBK |