05-26【王好武】五教5106 吴文俊重点实验室代数学系列报告之249

发布者:唐慧发布时间:2024-05-21浏览次数:10

题目: Sums of four polygonal numbers: precise formulas 


报告人:王好武,武汉大学


时间:5月26日(星期日)10:30


地点:五教5106


摘要: In this talk we give unified formulas for the numbers of representations of positive integers as sums of four generalized m-gonal numbers, and as restricted sums of four squares under a linear condition, respectively. The formulas are given as Z-linear combinations of Hurwitz class numbers. As applications, we prove several Zhi-Wei Sun's conjectures. As by-products, we obtain formulas for expressing the Fourier coefficients of $\vartheta(\tau,z)^4$, $\eta(\tau)^{12}$, $\eta(\tau)^4$ and $\eta(\tau)^8\eta(2\tau)^8$ in terms of the Hurwitz class numbers, respectively. The proof is based on the theory of Jacobi forms.