Quintuple product identity

Template:Short description In mathematics the Watson quintuple product identity is an infinite product identity introduced by Template:Harvs and rediscovered by Template:Harvtxt and Template:Harvtxt. It is analogous to the Jacobi triple product identity, and is the Macdonald identity for a certain non-reduced affine root system. It is related to Euler's pentagonal number theorem.

${\displaystyle \prod _{n\ge 1}(1-s^n)(1-s^{n}t)(1-s^{n-1}{t}^{-1})(1-s^{2n-1}{t}^2)(1-s^{2n-1}{t}^{-2})=\sum _{n\in 𝐙}{s}^{(3n^2+n)/2}(t^{3n}-t^{-3n-1})}$

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• Foata, D., & Han, G. N. (2001). The triple, quintuple and septuple product identities revisited. In The Andrews Festschrift (pp. 323–334). Springer, Berlin, Heidelberg.
• Cooper, S. (2006). The quintuple product identity. International Journal of Number Theory, 2(01), 115-161.

• Hirschhorn–Farkas–Kra septagonal numbers identity

• Subbarao, M. V., & Vidyasagar, M. (1970). On Watson’s quintuple product identity. Proceedings of the American Mathematical Society, 26(1), 23-27.
• Hirschhorn, M. D. (1988). A generalisation of the quintuple product identity. Journal of the Australian Mathematical Society, 44(1), 42-45.
• Alladi, K. (1996). The quintuple product identity and shifted partition functions. Journal of Computational and Applied Mathematics, 68(1-2), 3-13.
• Farkas, H., & Kra, I. (1999). On the quintuple product identity. Proceedings of the American Mathematical Society, 127(3), 771-778.
• Chen, W. Y., Chu, W., & Gu, N. S. (2005). Finite form of the quintuple product identity. arXiv preprint math/0504277.