Poles of degenerate Eisenstein series and Siegel-Weil identities for exceptional split groups
Abstract
Let G be a linear split algebraic group. The degenerate Eisenstein series associated to a maximal parabolic subgroup EP(f0,s,g) with the spherical section f0 is studied in the first part of the thesis. In this part, we study the poles of EP(f0,s,g) in the region Re s >0. We determine when the leading term in the Laurent expansion of EP(f0,s,g) around s=s0 is square integrable. The second part is devoted to finding identities between the leading terms of various Eisenstein series at different points. We present an algorithm to find this data and implement it on SAGE. While both parts can be applied to a general algebraic group, we restrict ourself to the case where G is split exceptional group of type F4,E6,E7, and obtain new results.
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