Truncation of the Rogers–Ramanujan Theta Series

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Previous article Next article Truncation of the Rogers–Ramanujan Theta SeriesG. E. AndrewsG. E. Andrewshttps://doi.org/10.1137/1025082PDFBibTexSections ToolsAdd to favoritesExport CitationTrack CitationsEmail SectionsAbout"Truncation of the Rogers–Ramanujan Theta Series." SIAM Review, 25(3), p. 402[1] R. E. Andrews, Problem 74-12, this review, 16 (1974), 390– AbstractGoogle Scholar[2] D. M. Bressoud, Some identities for terminating q-series, Math. Proc. Cambridge Philos. Soc., 89 (1981), 211–223 82d:05019 0454.33003 CrossrefISIGoogle Scholar[3] Daniel Shanks, A short proof of an identity of Euler, Proc. Amer. Math. Soc., 2 (1951), 747–749 13,321h 0044.28403 CrossrefISIGoogle Scholar[4] G. Szegö, Ein Beitrag zur Theorie der Thetafunktionen, Sitz. Ber. Preuss. Akad. Wiss. Phys.-Math. Kl., (), 242–252, (also in G. Szegö, Collected Papers, Vol. 1, R. Askey, ed., Birkhäuser, Boston, 1982, pp. 795–805) Google Scholar Previous article Next article FiguresRelatedReferencesCited byDetails Some finite generalizations of Gauss's square exponent identityRocky Mountain Journal of Mathematics, Vol. 47, No. 8 Cross Ref Two truncated identities of GaussJournal of Combinatorial Theory, Series A, Vol. 120, No. 3 Cross Ref Partial-Sum Analogues of the Rogers–Ramanujan IdentitiesJournal of Combinatorial Theory, Series A, Vol. 99, No. 1 Cross Ref q -Newton Binomial: From Euler To Gauss21 January 2013 | Journal of Nonlinear Mathematical Physics, Vol. 7, No. 2 Cross Ref On the Proofs of the Rogers-Ramanujan Identities Cross Ref Volume 25, Issue 3| 1983SIAM Review History Published online:02 August 2006 InformationCopyright © 1983 © Society for Industrial and Applied MathematicsPDF Download Article & Publication DataArticle DOI:10.1137/1025082Article page range:pp. 402-402ISSN (print):0036-1445ISSN (online):1095-7200Publisher:Society for Industrial and Applied Mathematics