| 嵌入定理与代数数域上的大筛法 |
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| 引用本文: | 丁夏畦. 嵌入定理与代数数域上的大筛法[J]. 数学学报, 1979, 22(4): 448-458. DOI: cnki:ISSN:0583-1431.0.1979-04-004 |
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| 作者姓名: | 丁夏畦 |
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| 作者单位: | 中国科学院数学研究所 |
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| 摘 要: | <正> 本文把数理方程研究中常用的嵌入定理稍作推广,应用到代数数域上来,并把[4]中第四章的定理4.2和[1,5]中的均值定理推广到代数数域上. 为此,先介绍一些符号与约定,基本上采自[2]. 设K为-n次代数数域,按通常的记号,记作n=r_1+2r_2.以Z_k表K中的整数环. 1.设为一理想,如α,β∈Z_k,|(α-β),则记α≡β(mod ).按此可把K中的整数分类,其类数为N.Z_k中与互素的整数在上述分类中占住类数为
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| 收稿时间: | 1977-07-09 |
IMBEDDING THEOREMS AND THE LARGE SIEVE METHOD IN ALGEBRAIC NUMBER FIELDS |
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| Affiliation: | Ding Xiaxi(Institute of Mathematics, Academia Sinica) |
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| Abstract: | In this paper we give a slight generalization of the imbedding theorem proved in [3]. And then we apply it to algebraic number fields, we obtaining a large sieve inequality. Finally we generalize to algebraic number fields the mean value theorem in [1] where with it we proved the Chen's theorem on Goldbaeh problem. |
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