Cubic theta functions

  • Authors:

  • Shaun Cooper

  • Affiliations:

  • Institute of Information and Mathematical Sciences, Massey University, Albany, Private Bag 102904, North Shore Mail Centre, Auckland, New Zealand

  • Venue:
  • Journal of Computational and Applied Mathematics - Special issue: Proceedings of the international conference on special functions and their applications
  • Year:
  • 2003

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Abstract

Some new identities for the four cubic theta functions a'(q,z), a(q,z), b(q,z) and c(q,z) are given. For example, we show that a'(q,z)3 = b(q,z)3 + c(q)2c(q,z).This is a counterpart of the identity a(q,z)3 = b(q)2b(q,z3) + c(q,z)3, which was found by Hirschhorn et al.The Laurent series expansions of the four cubic theta functions are given. Their transformation properties are established using an elementary approach due to K. Venkatachaliengar. By applying the modular transformation to the identities given by Hirschhorn et al., several new identities in which a'(q,z) plays the role of a(q,z) are obtained.