Abstract
Product identities in two variables x, q expand infinite products as infinite sums, which are linear combinations of theta functions; famous examples include Jacobi’s triple product identity, Watson’s quintuple identity, and Hirschhorn’s septuple identity. We view these series expansions as representations in canonical bases of certain vector spaces of quasiperiodic meromorphic functions (related to sections of line and vector bundles), and find new identities for two nonuple products, an undecuple product, and several two-variable Rogers–Ramanujan type sums. Our main theorem explains a correspondence between the septuple product identity and the two original Rogers–Ramanujan identities; this amounts to an unexpected proportionality of canonical basis vectors, two of which can be viewed as two-variable analogues of fifth-order mock theta functions. We also prove a similar correspondence between an octuple product identity of Ewell and two simpler variations of the Rogers–Ramanujan identities, related to third-order mock theta functions, and conjecture other occurrences of this phenomenon. As applications, we specialize our results to obtain identities for quotients of generalized eta functions and mock theta functions.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Adiga, C., Berndt, B.C., Bhargava, S., Watson, G.N.: Chapter 16 of Ramanujan’s Second Notebook: Theta-Functions and \(q\)-Series, vol. 315. American Mathematical Society, Providence (1985)
Adiga, C., Bulkhali, N.: Identities for certain products of theta functions with applications to modular relations. J. Anal. Number Theory 2(1), 1–15 (2014)
Andersen, N.: Vector-valued modular forms and the mock theta conjectures. Res. Number Theory 2(1), 32 (2016)
Andrews, G., Schilling, A., Warnaar, S.O.: An \(A_2\) Bailey lemma and Rogers-Ramanujan-type identities. J. Am. Math. Soc. 12(3), 677–702 (1999)
Andrews, G.E.: Applications of basic hypergeometric functions. SIAM Rev. 16(4), 441–484 (1974)
Andrews, G.E.: The fifth and seventh order mock theta functions. Trans. Am. Math. Soc. 293(1), 113–134 (1986)
Andrews, G.E.: The Theory of Partitions. Cambridge University Press, Cambridge (1998)
Andrews, G.E., Berndt, B.C., Chan, S.H., Kim, S., Malik, A.: Four identities for third order mock theta functions. Nagoya Math. J. 239, 1–32 (2018)
Andrews, G.E., Garvan, F.: Ramanujan’s ‘lost’ notebook VI: the mock theta conjectures. Adv. Math. 73(2), 242–255 (1989)
Beauville, A.: Theta functions, old and new. Open Probl. Surv. Contemp. Math. 6, 99–131 (2013)
Berkovich, A., Paule, P.: Variants of the Andrews-Gordon identities. Ramanujan J. 5(4), 391–404 (2001)
Berndt, B.C.: Generalized Dedekind eta-functions and generalized Dedekind sums. Trans. Am. Math. Soc. 178, 495–508 (1973)
Berndt, B.C.: Number Theory in the Spirit of Ramanujan, vol. 34. American Mathematical Society, Providence (2006)
Bressoud, D.M.: An easy proof of the Rogers-Ramanujan identities. J. Number Theory 16(2), 235–241 (1983)
Bringmann, K., Folsom, A., Ono, K., Rolen, L.: Harmonic Maass Forms and Mock Modular Forms: Theory and Applications, vol. 64. American Mathematical Society, Providence (2017)
Bringmann, K., Ono, K.: Dyson’s ranks and Maass forms. Ann. Math. 171(1), 419–449 (2010)
Cao, Z.: On applications of roots of unity to product identities. In: Partitions, q-Series, and Modular Forms, pp. 47–52. Springer (2012)
Cauchy, A.: Second mémoire sur les fonctions dont plusieurs valeurs sont liées entre par une équation linéaire. Oeuvres Ire Ser. 8, 50–55 (1893)
Chen, W.Y., Ji, K.Q., Liu, E.H.: Partition identities for Ramanujan’s third-order mock theta functions. Q. J. Math. 63(2), 353–365 (2012)
Chu, W., Yan, Q.: Unification of the quintuple and septuple product identities. Electron. J. Comb. 14, N7 (2007)
Corteel, S., Welsh, T.: The \(A_2\) Rogers–Ramanujan identities revisited. Ann. Comb. 23(3), 683–694 (2019)
Dyson, F.J.: Some guesses in the theory of partitions. Eureka (Cambridge) 8(10), 10–15 (1944)
Ewell, J.A.: On an octuple-product identity. Rocky Mt. J. Math. 12(2), 279–282 (1982)
Foata, D., Han, G.N.: The triple, quintuple and septuple product identities revisited. In: Foata, D., Han, G.N. (eds.) The Andrews Festschrift, pp. 323–334. Springer, Berlin (2001)
Folsom, A.: A short proof of the mock theta conjectures using Maass forms. Proc. Am. Math. Soc. 136(12), 4143–4149 (2008)
Garrett, K., Ismail, M.E., Stanton, D.: Variants of the Rogers–Ramanujan identities. Adv. Appl. Math. 23(3), 274–299 (1999)
Garvan, F.G.: A generalization of the Hirschhorn–Farkas–Kra septagonal numbers identity. Discrete Math. 232(1), 113–118 (2001)
Gasper, G., Rahman, M.: Basic Hypergeometric Series, vol. 96. Cambridge University Press, Cambridge (2004)
Gordon, B., Hughes, K.: Multiplicative properties of eta-products II. Contemp. Math. 143, 415 (1993)
Gordon, B., McIntosh, R.J.: A survey of classical mock theta functions. In: Alladi, K., Garvan, F. (eds.) Partitions, q-Series, and Modular Forms, pp. 95–144. Springer, New York (2012)
Gunning, R.C.: On generalized theta functions. Am. J. Math. 104(1), 183–208 (1982)
Hardy, G.H., Wright, E.M., et al.: An Introduction to the Theory of Numbers. Oxford University Press, Oxford (1979)
Hickerson, D.: A proof of the mock theta conjectures. Invent. Math. 94(3), 639–660 (1988a)
Hickerson, D.: On the seventh order mock theta functions. Invent. Math. 94(3), 661–677 (1988)
Hirschhorn, M.: A simple proof of an identity of Ramanujan. J. Aust. Math. Soc. 34(1), 31–35 (1983)
Jacobi, C.G.J.: Fundamenta nova theoriae functionum ellipticarum. Auctore D. Carolo Gustavo Iacobo Iacobi... sumtibus fratrum Borntræger (1829)
Martin, Y., Ono, K.: Eta-quotients and elliptic curves. Proc. Am. Math. Soc. 125(11), 3169–3176 (1997)
Ramanujan, S.: The lost notebook and other unpublished papers. Bull. Am. Math. Soc. 19, 558–560 (1988)
Ramanujan, S., Aiyangar, S.R., Berndt, B.C., Rankin, R.A.: Ramanujan: Letters and Commentary, vol. 9. American Mathematical Society, Providence (1995)
Rogers, L.J.: Second memoir on the expansion of certain infinite products. Proc. Lond. Math. Soc. 1(1), 318–343 (1893)
Sills, A.V.: Finite Rogers–Ramanujan type identities. Electron. J. Comb. 10(R13), 122 (2003)
Sills, A.V.: Identities of the Rogers–Ramanujan–Slater type. Int. J. Number Theory 3(02), 293–323 (2007)
Slater, L.J.: Further identities of the Rogers–Ramanujan type. Proc. Lond. Math. Soc. 2(1), 147–167 (1952)
Tannery, J., Molk, J.: Éléments de la théorie des fonctions elliptiques, vol. 3. Gauthier-Villars, Paris (1898)
Warnaar, O.: Ramanujan’s 1psi1 summation. Not. Am. Math. Soc. 60, 10–22 (2013)
Warnaar, S.O.: Hall–Littlewood functions and the \(A_2\) Rogers–Ramanujan identities. Adv. Math. 200(2), 403–434 (2006)
Watson, G.: Ramanujans Vermutung über Zerfällungszahlen. Journal für die reine und angewandte Mathematik 1938(179), 97–128 (1938)
Watson, G.N.: The mock theta functions (2). Proc. Lond. Math. Soc. 2(1), 274–304 (1937)
Whittaker, E.T., Watson, G.N.: A Course of Modern Analysis. Dover Publications, New York (2020)
Yan, Q.: Several identities for certain products of theta functions. Ramanujan J. 19(1), 79–94 (2009)
Yang, Y.: Transformation formulas for generalized Dedekind eta functions. Bull. Lond. Math. Soc. 36(5), 671–682 (2004)
Zagier, D.: Ramanujan’s mock theta functions and their applications [d’après Zwegers and Ono-Bringmann]. Asterisque 143–164 (2009)
Zhu, J.M.: A sextuple product identity with applications. Math. Probl. Eng. 2011, 1–11. https://doi.org/10.1155/2011/462507 (2011)
Acknowledgements
The author wishes to thank Professor Terence Tao for his helpful guidance, suggestions and support for this project. The author is also deeply grateful to Professors S. Ole Warnaar and William Duke for insightful discussions and feedback.
Author information
Authors and Affiliations
Corresponding author
Ethics declarations
Conflict of interest
See conflict of interest statement before reference list; otherwise not applicable.
Additional information
Publisher's Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
About this article
Cite this article
Pascadi, A. Several new product identities in relation to Rogers–Ramanujan type sums and mock theta functions. Res Math Sci 8, 16 (2021). https://doi.org/10.1007/s40687-021-00245-8
Received:
Accepted:
Published:
DOI: https://doi.org/10.1007/s40687-021-00245-8