抽象二次型理论中的 K 理论和自由归纳分级环

arXiv - MATH - K-Theory and Homology Pub Date : 2024-04-04 DOI:arxiv-2404.05750

Kaique Matias de Andrade Roberto, Hugo Luiz mariano

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引用次数: 0

摘要

我们在先前关于多重irings的工作（\cite{roberto2021quadratic}）基础上，将现有的抽象二次型理论（特殊群和实半群）推广到多重irings的语境中（\cite{marshall2006real}, \cite{ribeiro2016functorial}）。在此，我们将这一泛化提升了一步，引入了前特殊超场的概念，并将二次型理论中的一个基本工具扩展到了更一般的多值环境中：K理论。我们引入并发展了双曲超场的K理论，它同时概括了米尔诺的K理论（\cite{milnor1970algebraick}）和迪克曼-米拉利亚（Dickmann-Miraglia）发展的特殊群K理论（\cite{dickmann2006algebraic}）。我们发展了这个广义 K 理论的一些性质，它可以被看作是一个自由归纳分级环，这个概念是在《迪克曼 1998 四元组》中引入的，目的是为马歇尔签名猜想提供一个解决方案。

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K-theories and Free Inductive Graded Rings in Abstract Quadratic Forms Theories

We build on previous work on multirings (\cite{roberto2021quadratic}) that provides generalizations of the available abstract quadratic forms theories (special groups and real semigroups) to the context of multirings (\cite{marshall2006real}, \cite{ribeiro2016functorial}). Here we raise one step in this generalization, introducing the concept of pre-special hyperfields and expand a fundamental tool in quadratic forms theory to the more general multivalued setting: the K-theory. We introduce and develop the K-theory of hyperbolic hyperfields that generalize simultaneously Milnor's K-theory (\cite{milnor1970algebraick}) and Special Groups K-theory, developed by Dickmann-Miraglia (\cite{dickmann2006algebraic}). We develop some properties of this generalized K-theory, that can be seen as a free inductive graded ring, a concept introduced in \cite{dickmann1998quadratic} in order to provide a solution of Marshall's Signature Conjecture.

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arXiv - MATH - K-Theory and Homology

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