Combinatorial proofs for Jacobi’s triple product identity and Euler's pentagonal number theorem

Konferenz: CAIBDA 2022 - 2nd International Conference on Artificial Intelligence, Big Data and Algorithms
17.06.2022 - 19.06.2022 in Nanjing, China

Tagungsband: CAIBDA 2022

Seiten: 8Sprache: EnglischTyp: PDF

Autoren:
Yeung, Shok Fei (BA Mathematics, University of British Columbia, Vancouver, British Columbia, Canada)
Zhang, Yang (Mathematics, University of Malaya, Kuala Lumpur, Malaysia)
Zhou, Qiujun (School of Mathematical Sciences, Chongqing Normal University, Chongqing, China)

Inhalt:
This paper is about Jacobi’s triple product identity and Euler’s pentagonal number theorem. To be specific, it gives the proofs of Jacobi’s triple product identity via Gaussian polynomials and the q-binomial theorem, functional equation, and number theory. From this, Euler's pentagonal number theorem is derived. After that, it proves Euler's pentagonal number theorem via bijection. In addition, the paper also makes some promotions through them. For example, Jacobi's quintuple product identity is deduced from the method of Jacobi's triple product identity. The relationship between the Euler's function and the partition of integers in combinatorics. Some applications of these two formulas are also given. In particular, this paper points out their applications in physics, biology, and other fields of science, combining different branches of science closely.