讲座预告 | Twisted Siegel-Weil formulas for GL_2 over non-Galois quartic CM fields
Title: Twisted Siegel-Weil formulas for GL_2 over non-Galois quartic CM fields
Time: 3月24日 14:00
Place: 数学楼4108
Abstract:
Siegel-Weil formulas establish a relation between integral of theta functions and Eisenstein series.
In this talk, we will introduce a twisted Siegel-Weil formula over non-Galois quadric CM fields, which shows that the twisted theta integral against a quadratic character is the same as the Doi-Naganuma lift of Hecke's integral.
This implies the base change of Jacquet-Langlands correspondence for certain Hecke characters from Q to real quadratic fields by Doi-Naganuma lift is surjective.
If time permits, we will also introduce its application to calculate the twisted CM values of Borcherds forms.
个人简介:张明宽,Technical University of Darmstadt博士后,于2025年在哈尔滨工业大学获得博士学位,研究方向是Hilbert modular forms, theta lift and CM values of modular functions,成果发表于Journal of number theory,International journal of number theory等期刊。
