An arithmetic count of the lines on a smooth cubic surface

Kass, Jesse Leo; Wickelgren, Kirsten

doi:10.1112/s0010437x20007691

Cited by 14 publications

(38 citation statements)

References 30 publications

(19 reference statements)

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“…(c.f. [OT14], [KW21], [Mor12, §4.3]) Suppose E → X is a vector bundle of rank n over a smooth, projective n-scheme over a field k. Then we say E is relatively oriented over X if there is an isomorphism…”

Section: 4mentioning

confidence: 99%

An enriched degree of the Wronski

Brazelton¹

2022

Preprint

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Given mp different p-planes in general position in (m + p)-dimensional space, a classical problem is to ask how many p-planes intersect all of them. For example when m = p = 2, this is precisely the question of "lines meeting four lines in 3-space" after projectivizing. The Brouwer degree of the Wronski map provides an answer to this general question, first computed by Schubert over the complex numbers and Eremenko and Gabrielov over the reals. We provide an enriched degree of the Wronski for all m and p even, valued in the Grothendieck-Witt ring of a field, using machinery from A 1 -homotopy theory. We further demonstrate in all parities that the local contribution of an m-plane is a determinantal relationship between certain Plücker coordinates of the p-planes it intersects.

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Section: 4mentioning

confidence: 99%

An enriched degree of the Wronski

Brazelton¹

2022

Preprint

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“…For a relatively oriented vector bundle V equipped with a section with only isolated zeros, an Euler number was defined in [49, Section 4] as a sum of local indices: The index can be computed explicitly with a formula of Scheja and Storch [67] or of Eisenbud and Levine/Khimshiashvili [29] (see §§2.4 and 2.3) and is also a local degree [48] (this is discussed further in §7). For example, when x is a simple zero of with , the index is given by a well-defined Jacobian of , illustrating the relation with the Poincaré–Hopf formula for topological vector bundles.…”

Section: Introductionmentioning

confidence: 99%

“…(For the definition of the Jacobian, see the beginning of §6.2.) In [49, Section 4, Corollary 36], it was shown that when and are in a family over of sections with only isolated zeros, where L is a field extension with odd. We strengthen this result by equating and ; this is the main result of §2.…”

Section: Introductionmentioning

confidence: 99%

“…Theorem 1.1 strengthens [15], removing its hypothesis (2) entirely. It also simplifies the proofs of [49, Theorem 1] and [72, Theorems 1 and 2]: it is no longer necessary to show that the sections of certain vector bundles with nonisolated isolated zeros are of codimension , as in [49, Lemmas 54, 56, and 57] and in [72, Lemma 1], because is independent of .…”

Section: Introductionmentioning

confidence: 99%

“…Note that if is smooth, this just means that the locally constant functions and on X agree, and that we are given an isomorphism . Hence we recover the definition from [49, Definition 17].…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Euler Classes: Six-Functors Formalism, Dualities, Integrality and Linear Subspaces of Complete Intersections

Bachmann

Wickelgren²

2021

J. Inst. Math. Jussieu

Self Cite

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We equate various Euler classes of algebraic vector bundles, including those of [12] and one suggested by M. J. Hopkins, A. Raksit, and J.-P. Serre. We establish integrality results for this Euler class and give formulas for local indices at isolated zeros, both in terms of the six-functors formalism of coherent sheaves and as an explicit recipe in the commutative algebra of Scheja and Storch. As an application, we compute the Euler classes enriched in bilinear forms associated to arithmetic counts of d-planes on complete intersections in $\mathbb P^n$ in terms of topological Euler numbers over $\mathbb {R}$ and $\mathbb {C}$ .

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Arithmetic inflection formulae for linear series on hyperelliptic curves

Cotterill¹,

Darago

Han

2023

Mathematische Nachrichten

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Over the complex numbers, Plücker's formula computes the number of inflection points of a linear series of fixed degree and projective dimension on an algebraic curve of fixed genus. Here, we explore the geometric meaning of a natural analog of Plücker's formula and its constituent local indices in ‐homotopy theory for certain linear series on hyperelliptic curves defined over an arbitrary field.

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An arithmetic count of the lines on a smooth cubic surface

Cited by 14 publications

References 30 publications

An enriched degree of the Wronski

An enriched degree of the Wronski

Euler Classes: Six-Functors Formalism, Dualities, Integrality and Linear Subspaces of Complete Intersections

Arithmetic inflection formulae for linear series on hyperelliptic curves

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