A short basis of the Stickelberger ideal of a cyclotomic field

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS

ACS Applied Bio Materials Pub Date : 2023-08-09 DOI:10.1090/mcom/3863

Olivier Bernard, Radan Kučera

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引用次数: 0

Abstract

We exhibit an explicit short basis of the Stickelberger ideal of cyclotomic fields of any conductor m m , i.e., a basis containing only short elements. An element ∑ σ ∈ G m ε σ σ \sum _{\sigma \in G_m} \varepsilon _{\sigma }\sigma of the group ring Z [ G m ] \mathbb {Z}[G_{m}] , where G m G_m is the Galois group of the field, is said to be short if all of its coefficients ε σ \varepsilon _{\sigma } are 0 0 or 1 1 . As a direct practical consequence, we deduce from this short basis an explicit upper bound on the relative class number that is valid for any conductor. This basis also has several concrete applications, in particular for the cryptanalysis of the Shortest Vector Problem on Ideal Lattices.

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一个简单的基础的斯蒂克尔伯格理想的环切场

我们展示了任意导体m m的旋切场的Stickelberger理想的显式短基，即只包含短元素的基。群环Z[G m] \mathbb Z[G＿m]中的一个元素∑σ∈G m ε σ σ \sum{ ＿ }{\sigma}{}{\in} G＿m \varepsilon{ ＿ }{\sigma}\sigma，其中G m G＿m是场的伽罗瓦群，如果它的所有系数ε σ {}{}\varepsilon ＿ {\sigma都是0 0或11，则称其为短。作为一个直接的实际结果，我们从这个短基中推导出对任何导体都有效的相对类数的明确上界。这个基础也有几个具体的应用，特别是对理想格上最短向量问题的密码分析。}

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来源期刊

ACS Applied Bio Materials Chemistry-Chemistry (all)

CiteScore

9.40

自引率

2.10%

发文量

464