代表全息 K 理论的动机谱

arXiv - MATH - K-Theory and Homology Pub Date : 2024-02-23 DOI:arxiv-2402.15136

Baptiste Calmès, Yonatan Harpaz, Denis Nardin

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引用次数: 0

摘要

我们在不假定 2 在基本方案上是可逆的情况下，建立了关于全息 K 理论的基本动机结果。特别是，我们证明了二次格罗thendieck-维特理论和对称格罗thendieck-维特理论都满足尼斯内维奇后裔，对称格罗thendieck-维特理论在有限克鲁尔维度的正则诺特基上进一步满足d（'evissage）和A^1不变性，以及投影束公式。我们利用这一点证明，在正则诺特基上，对称格罗滕迪克-维特理论是由一个动机E-无限环谱所代表的，然后我们证明了这是一个绝对纯谱，从而回答了D\'eglise的一个问题。与代数K理论一样，我们证明在一般基上，我们也可以构造一个后羿K理论动机谱，这次代表的是格罗登第克-维特理论的一个合适的同调不变和卡鲁比定位版本。

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A motivic spectrum representing hermitian K-theory

We establish fundamental motivic results about hermitian K-theory without assuming that 2 is invertible on the base scheme. In particular, we prove that both quadratic and symmetric Grothendieck-Witt theory satisfy Nisnevich descent, and that symmetric Grothendieck-Witt theory further satisfies d\'evissage and A^1-invariance over a regular Noetherian base of finite Krull dimension, as well as a projective bundle formula. We use this to show that over a regular Noetherian base, symmetric Grothendieck-Witt theory is represented by a motivic E-infinity-ring spectrum, which we then show is an absolutely pure spectrum, answering a question of D\'eglise. As with algebraic K-theory, we show that over a general base, one can also construct a hermitian K-theory motivic spectrum, representing this time a suitable homotopy invariant and Karoubi-localising version of Grothendieck-Witt theory.

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arXiv - MATH - K-Theory and Homology

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