Hermitian K-theory, Dedekind zeta-functions, and quadratic forms over rings of integers in number fields

Kylling Jonas Irgens; Roendigs Oliver; Ostvaer Paul Arne

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Hermitian K-theory, Dedekind zeta-functions, and quadratic forms over rings of integers in number fields

机译：Hermitian K-Theory，Defekind Zeta函数和数量字段中整数的圆环的二次形式

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We employ the slice spectral sequence, the motivic Steenrod algebra, and Voevodsky's solutions of the Milnor and Bloch-Kato conjectures to calculate the hermitian K-groups of rings of integers in number fields. Moreover, we relate the orders of these groups to special values of Dedekind zeta-functions for totally real abelian number fields. Our methods apply more readily to the examples of algebraic K-theory and higher Witt-theory, and give a complete set of invariants for quadratic forms over rings of integers in number fields.

机译：我们采用切片光谱序列，动机斯丁乐队代数和Voevodsky的阵线和Bloch-Kato猜想的解决方案，以计算数量字段中整数的封闭k族。此外，我们将这些群体的订单与Teamekind Zeta函数的特殊价值联系起来，以获得完全真实的abelian数字段。我们的方法更容易应用于代数K-理论和更高的WITT理论的例子，并为数字段中整数环的二次形式提供一组完整的不变性。

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来源
《Cambridge Journal of Mathematics》 |2020年第3期|共103页
作者
Kylling Jonas Irgens; Roendigs Oliver; Ostvaer Paul Arne;
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作者单位

Univ Oslo Dept Math Oslo Norway;

Univ Osnabruck Math Inst Osnabruck Germany;

Univ Oslo Dept Math Oslo Norway;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
Motivic homotopy theory; slice filtration; motivic cohomology; algebraic K-theory; Hermitian K-theory; higher Witt-theory; quadratic forms over rings of integers; special values of Dedekind zeta-functions of number fields;

机译：激活同型理论;切片过滤;动力协调;代数K-理论;赫米特·k理论;更高的WITT-理论;二次形式的整数环;Dedekind Zeta函数的特殊值;

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1. Hermitian K-theory, Dedekind zeta-functions, and quadratic forms over rings of integers in number fields [J] . Kylling Jonas Irgens, Roendigs Oliver, Ostvaer Paul Arne Cambridge Journal of Mathematics . 2020,第3期

机译：Hermitian K-Theory，Defekind Zeta函数和数量字段中整数的圆环的二次形式
2. ON SIMPLE ZEROS OF THE DEDEKIND ZETA-FUNCTION OF A QUADRATIC NUMBER FIELD [J] . Wu Xiaosheng, Zhao Lilu Mathematika: A Journal of Pure and Applied Mathematics . 2019,第4期

机译：在二次数字段的Dedekind Zeta函数的简单零
3. Slices of hermitian K-theory and Milnor's conjecture on quadratic forms [J] . Rondigs Oliver, Ostvaer Paul Arne Geometry & Topology . 2016,第2期

机译：二次形式的埃尔米特K-理论和米尔诺猜想的切片
4. Error-correcting codes for QAM from integer rings of an Euclideancomplex quadratic field [C] . Rifa J., Villannueva M. Information Theory, 1998. Proceedings. 1998 IEEE International Symposium on . -1

机译：来自欧几里得整数环的QAM的纠错码复二次场
5. ON K(,2) OF RINGS OF INTEGERS OF TOTALLY REAL NUMBER FIELDS (BIRCH-TATE, STEINBERG, CLASS NUMBER, SYMBOL, ZETA-FUNCTION) [D] . HETTLING, KARL FRIEDRICH. 1985

机译：关于实数总数字段（伯特，施泰因贝格，类数，符号，ZETA函数）的整数的环K（，2）
6. On Representation of Integers by Quadratic Forms [O] . Arnold E. Ross 1932

机译：关于整数的二次形式表示
7. Hermitian $K$-theory, Dedekind $zeta$-functions, and quadratic forms over rings of integers in number fields [O] . Jonas Irgens Kylling, Röndigs Oliver, Paul Arne Østvær 2020

机译：Hermitian $ k $ -theory，dedekind $ zeta $ -functions和数字字段中整数的圆环的二次形式
8. Real Zeros of the Dedekind zeta Function of an Imaginary Quadratic Field [R] . Low, M. E. 1965

机译：虚二次域Dedekind zeta函数的实零点

Hermitian K-theory, Dedekind zeta-functions, and quadratic forms over rings of integers in number fields

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