In this paper, we will explain a conceptual reformulation and inductive formula of the Siegel series. Using this, we will explain that both sides of the local intersection multiplicities of Gross and Keating (Invent Math 112(225–245):2051, 1993) and the Siegel series have the same inherent structures, beyond matching values. As an application, we will prove a new identity between the intersection number of two modular correspondences over $$\mathbb {F}_p$$ F p and the sum of the Fourier coefficients of the Siegel-Eisenstein series for $$\mathrm {Sp}_4/\mathbb {Q}$$ Sp 4 / Q of weight 2, which is independent of $$p \left( > 2\right) $$ p > 2 . In addition, we will explain a description of the local intersection multiplicities of the special cycles over $$\mathbb {F}_p$$ F p on the supersingular locus of the ‘special fiber’ of the Shimura varieties for $$\mathrm {GSpin}(n,2), n\le 3$$ GSpin ( n , 2 ) , n ≤ 3 in terms of the Siegel series directly.

中文翻译：

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西格尔级数和交点数的重新表述

在本文中，我们将解释 Siegel 级数的概念重构和归纳公式。使用这个，我们将解释 Gross 和 Keating (Invent Math 112(225–245):2051, 1993) 和 Siegel 级数的局部交叉多重性的两侧具有相同的固有结构，除了匹配值。作为应用，我们将证明 $$\mathbb {F}_p$$ F p 上的两个模对应的交集数与 $$\mathrm { 的 Siegel-Eisenstein 级数的傅立叶系数之和之间的新恒等式Sp}_4/\mathbb {Q}$$ Sp 4 / Q 的权重 2，与 $$p \left( > 2\right) $$ p > 2 无关。此外，