{"title":"Self-dual codes and invariant theory","authors":"G. Nebe","doi":"10.3233/978-1-60750-019-3-23","DOIUrl":null,"url":null,"abstract":"A formal notion of a Typ T of a self-dual linear code over a nite left R- module V is introduced which allows to give explicit generators of a nite complex matrix group, the associated Clifford-Weil group C.T / • GLjVj.C/, such that the complete weight enumerators of self-dual isotropic codes of Type T span the ring of invariants of C.T /. This generalizes Gleason's 1970 theorem to a very wide class of rings and also includes multiple weight enumerators (see Section 2.7), as these are the complete weight enumerators cwem.C/ D cwe.Rm › C/ of Rm£m -linear self-dual codes Rm›C • .V m/N of Type T m with associated Clifford-Weil group Cm.T / D C.T m /. The nite Siegel 8-operator mapping cwem.C/ to cwemi1.C/ hence denes a ring epimorphism 8m V Inv.Cm.T // ! Inv.Cmi1.T // between invariant rings of complex matrix groups of different degrees. If R D V is a - nite eld, then the structure of Cm.T / allows to dene a commutative algebra of Cm.T / double cosets, called a Hecke algebra in analogy to the one in the theory of lattices and modular forms. This algebra consists of self-adjoint linear operators on Inv.Cm.T // commuting with 8m . The Hecke-eigenspaces yield explicit linear relations among the cwem of self-dual codes CV N.","PeriodicalId":185285,"journal":{"name":"Algebraic Aspects of Digital Communications","volume":"34 3 1","pages":"0"},"PeriodicalIF":0.0000,"publicationDate":"1900-01-01","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"177","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Algebraic Aspects of Digital Communications","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.3233/978-1-60750-019-3-23","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
引用次数: 177
Abstract
A formal notion of a Typ T of a self-dual linear code over a nite left R- module V is introduced which allows to give explicit generators of a nite complex matrix group, the associated Clifford-Weil group C.T / • GLjVj.C/, such that the complete weight enumerators of self-dual isotropic codes of Type T span the ring of invariants of C.T /. This generalizes Gleason's 1970 theorem to a very wide class of rings and also includes multiple weight enumerators (see Section 2.7), as these are the complete weight enumerators cwem.C/ D cwe.Rm › C/ of Rm£m -linear self-dual codes Rm›C • .V m/N of Type T m with associated Clifford-Weil group Cm.T / D C.T m /. The nite Siegel 8-operator mapping cwem.C/ to cwemi1.C/ hence denes a ring epimorphism 8m V Inv.Cm.T // ! Inv.Cmi1.T // between invariant rings of complex matrix groups of different degrees. If R D V is a - nite eld, then the structure of Cm.T / allows to dene a commutative algebra of Cm.T / double cosets, called a Hecke algebra in analogy to the one in the theory of lattices and modular forms. This algebra consists of self-adjoint linear operators on Inv.Cm.T // commuting with 8m . The Hecke-eigenspaces yield explicit linear relations among the cwem of self-dual codes CV N.
本文引入了一个关于nite左R模V上的自对偶线性码的T型的形式化概念,它允许给出一个nite复矩阵群的显式生成器,即相关的Clifford-Weil群C.T /•GLjVj.C/,使得T型自对偶各向同性码的完全权枚举子跨出C.T /的不变量环。这将Gleason 1970年的定理推广到一个非常广泛的环类,并且还包括多个权重枚举数(参见第2.7节),因为这些是完整的权重枚举数。Rm›C / of Rm£m -线性自对偶代码Rm›C••v m/N of T型m与相关的Clifford-Weil组Cm。T / D / c / T / m /。新Siegel 8-算子映射cvem . c /到cvem . c /,因此得到了一个环上射。Inv.Cmi1。T //在不同程度的复矩阵群的不变环之间。如果rdvv是一个- nite场,则Cm的结构。T /允许求Cm的交换代数。T /双辅助集,称为赫克代数,类似于格和模形式理论中的赫克代数。这个代数由v. cm . t //与8m可交换上的自伴随线性算子组成。hecke -特征空间给出了自对偶码cvn的向量之间的显式线性关系。
京公网安备 11010802042870号
京ICP备2023020795号-1
分享
求助内容:
应助结果提醒方式:
扫码关注我们
