顶点算子, 广义辛Schur函数的Littlewood-Richardson规则

doi:10.13371/j.cnki.chin.q.j.m.2022.03.007

数学季刊 ›› 2022, Vol. 37 ›› Issue (3): 301-316.doi: 10.13371/j.cnki.chin.q.j.m.2022.03.007

顶点算子, 广义辛Schur函数的Littlewood-Richardson规则

School of Mathematics and Statistics, Henan University, Kaifeng 475004, China

收稿日期:2022-05-20 出版日期:2022-09-25 发布日期:2022-09-19
通讯作者: HUANG Fang (1984-), female, native of Shangqiu, Henan, lecturer of Henan University, engages in algebra E-mail: huangfang@henu.edu.cn
作者简介:HUANG Fang (1984-), female, native of Shangqiu, Henan, lecturer of Henan University, engages in algebra; CHU Yan-jun (1979-), male, native of Luohe, Henan, associate professor of Henan University, engages in algebra.
基金资助:
Supported by National Natural Science Foundation of China (Grant No. 11226192).

Vertex Operators, Littlewood-Richardson Rule for Generalized Symplectic Schur Functions

School of Mathematics and Statistics, Henan University, Kaifeng 475004, China

Received:2022-05-20 Online:2022-09-25 Published:2022-09-19
Contact: HUANG Fang (1984-), female, native of Shangqiu, Henan, lecturer of Henan University, engages in algebra E-mail: huangfang@henu.edu.cn
About author:HUANG Fang (1984-), female, native of Shangqiu, Henan, lecturer of Henan University, engages in algebra; CHU Yan-jun (1979-), male, native of Luohe, Henan, associate professor of Henan University, engages in algebra.
Supported by:
Supported by National Natural Science Foundation of China (Grant No. 11226192).

摘要/Abstract

摘要： Littlewood-Richardson rule gives the expansion formula for decomposing a
product of two Schur functions as a linear sum of Schur functions, while the decomposition
formula for the multiplication of two symplectic Schur function is also given by the
combinatorial method. In this paper, we will construct the algebraic forms of the
decomposition formula for the product of two symplectic Schur functions by using the
generating functions and vertex operator realizations, and then extend these results to
generalized symplectic Schur functions.

关键词: , Schur functions, Littlewood-Richardson coefficient, Symplectic Schur func-
tions, Vertex operators

Abstract: Littlewood-Richardson rule gives the expansion formula for decomposing a
product of two Schur functions as a linear sum of Schur functions, while the decomposition
formula for the multiplication of two symplectic Schur function is also given by the
combinatorial method. In this paper, we will construct the algebraic forms of the
decomposition formula for the product of two symplectic Schur functions by using the
generating functions and vertex operator realizations, and then extend these results to
generalized symplectic Schur functions.

Key words: , Schur functions, Littlewood-Richardson coefficient, Symplectic Schur func-
tions, Vertex operators

中图分类号:

黄芳, 楚彦军. 顶点算子, 广义辛Schur函数的Littlewood-Richardson规则[J]. 数学季刊, 2022, 37(3): 301-316.

HUANG Fang, CHU Yan-jun. Vertex Operators, Littlewood-Richardson Rule for Generalized Symplectic Schur Functions[J]. Chinese Quarterly Journal of Mathematics, 2022, 37(3): 301-316.

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顶点算子, 广义辛Schur函数的Littlewood-Richardson规则

Vertex Operators, Littlewood-Richardson Rule for Generalized Symplectic Schur Functions

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