Hermitian K-theory for stable $$\infty $$-categories I: Foundations

Calmès, Baptiste; Dotto, Emanuele; Harpaz, Yonatan; Hebestreit, Fabian; Land, Markus; Moi, Kristian; Nardin, Denis; Nikolaus, Thomas; Steimle, Wolfgang

doi:10.1007/s00029-022-00758-2

Cited by 17 publications

(49 citation statements)

References 58 publications

(200 reference statements)

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“…For 𝑛 even there are two classes of even shifted Young diagrams: those whose first row is full and those whose last column is empty. Note that this fact can be viewed as a diagrammatic counterpart to the recursive description given in Formula (7).…”

Section: Proof Of Theorem 11mentioning

confidence: 99%

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Witt groups of Spinor varieties

Hudson

Мартиросян

Xie

2022

Proceedings of London Math Soc

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We show that Witt groups of spinor varieties (aka. maximal isotropic Grassmannians) can be presented by combinatorial objects called ‘even shifted young diagrams’. Our method relies on the Blow‐up setup of Balmer–Calmès, and we investigate the connecting homomorphism of the localization sequence via the projective bundle formula of Walter–Nenashev, the projection formula of Calmès–Hornbostel and the excess intersection formula of Fasel.

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Section: Proof Of Theorem 11mentioning

confidence: 99%

“…There are also recent developments on the Hermitian

K

‐theory when 2 is not invertible in the base, cf. [7] and [31]. Investigating the Hermitian

K

‐theory of schemes in these frameworks seems to be an interesting project.…”

Section: Introductionmentioning

confidence: 99%

Witt groups of Spinor varieties

Hudson

Мартиросян

Xie

2022

Proceedings of London Math Soc

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“…Ranicki's work in this direction was visionary, but his specific technical implementation is not ideal for our purposes (see remark 4.9). Instead, we will use the recent framework of Calmès, Dotto, Harpaz, Hebestreit, Land, Moi, Nardin, Nikolaus and Steimle [10][11][12].…”

Section: Ranickimentioning

confidence: 99%

“…In subsections 4.5-4.8 we will make extensive use of the definitions and constructions of [10][11][12]. We will give references for all results that we use, but the reader will need to be familiar with the general set-up of those papers, which we will not review.…”

Section: Categorical Preliminariesmentioning

confidence: 99%

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The family signature theorem

Randal-Williams¹

2023

Proceedings of the Royal Society of Edinburgh: Section A Mathem

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We discuss several versions of the Family Signature Theorem: in rational cohomology using ideas of Meyer, in $KO[\tfrac {1}{2}]$ -theory using ideas of Sullivan, and finally in symmetric $L$ -theory using ideas of Ranicki. Employing recent developments in Grothendieck–Witt theory, we give a quite complete analysis of the resulting invariants. As an application we prove that the signature is multiplicative modulo 4 for fibrations of oriented Poincaré complexes, generalizing a result of Hambleton, Korzeniewski and Ranicki, and discuss the multiplicativity of the de Rham invariant.

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Two-variable fibrations, factorisation systems and -categories of spans

Haugseng,

Hebestreit,

Linskens

et al. 2023

Forum of Mathematics, Sigma

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We prove a universal property for $\infty $ -categories of spans in the generality of Barwick’s adequate triples, explicitly describe the cocartesian fibration corresponding to the span functor, and show that the latter restricts to a self-equivalence on the class of orthogonal adequate triples, which we introduce for this purpose. As applications of the machinery we develop, we give a quick proof of Barwick’s unfurling theorem, show that an orthogonal factorisation system arises from a cartesian fibration if and only if it forms an adequate triple (generalising work of Lanari), extend the description of dual (co)cartesian fibrations by Barwick, Glasman and Nardin to two-variable fibrations, explicitly describe parametrised adjoints (extending work of Torii), identify the orthofibration classifying the mapping category functor of an $(\infty ,2)$ -category (building on work of Abellán García and Stern), formally identify the unstraightenings of the identity functor on the $\infty $ -category of $\infty $ -categories with the (op)lax under-categories of a point, and deduce a certain naturality property of the Yoneda embedding (answering a question of Clausen).

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Hermitian K-theory for stable $$\infty $$-categories I: Foundations

Cited by 17 publications

References 58 publications

Witt groups of Spinor varieties

Witt groups of Spinor varieties

The family signature theorem

Two-variable fibrations, factorisation systems and -categories of spans

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