The Hodge bundle, the universal 0-section, and the log Chow ring of the moduli space of curves

Molcho, Samouil; Pandharipande, Rahul; Schmitt, Johannes

doi:10.48550/arxiv.2101.08824

Cited by 3 publications

(22 citation statements)

References 42 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…The second map fails to be a ring morphism in general. For more details on logarithmic Chow rings and intersection theory see [7,34,47,48].…”

Section: Log Intersection Theorymentioning

confidence: 99%

See 1 more Smart Citation

Logarithmic intersections of double ramification cycles

Holmes¹,

Schwarz²

2022

Alg. Geom.

View full text Add to dashboard Cite

Let A = (a 1 , . . . , a n ) be a vector of integers which sum to k(2g − 2 + n). The double ramification cycle DR g,A ∈ CH g (M g,n ) on the moduli space of curves is the virtual class of an Abel-Jacobi locus of pointed curves (C, x 1 , . . . , x n ) satisfyingThe Abel-Jacobi construction requires log blow-ups of M g,n to resolve the indeterminacies of the Abel-Jacobi map. Holmes [29] has shown that DR g,A admits a canonical lift logDR g,A ∈ logCH g (M g,n ) to the logarithmic Chow ring, which is the limit of the intersection theories of all such blow-ups.The main result of the paper is an explicit formula for logDR g,A which lifts Pixton's formula for DR g,A . The central idea is to study the universal Jacobian over the moduli space of curves (following Caporaso [12], Kass-Pagani [37], and Abreu-Pacini [3]) for certain stability conditions. Using the criterion of Holmes-Schwarz [34], the universal double ramification theory of Bae-Holmes-Pandharipande-Schmitt-Schwarz [5] applied to the universal line bundle determines the logarithmic double ramification cycle. The resulting formula, written in the language of piecewise polynomials, depends upon the stability condition (and admits a wall-crossing study). Several examples are computed.

show abstract

“…The second map fails to be a ring morphism in general. For more details on logarithmic Chow rings and intersection theory see [7,34,47,48].…”

Section: Log Intersection Theorymentioning

confidence: 99%

“…We refer the reader to [5, Section 0], [35, Section 0], and [55, Section 5] for more leisurely introductions to the subject of double ramification cycles. For a sampling of the development and application of the theory in a variety of directions, see [4,5,9,10,11,15,18,19,20,25,30,32,33,35,36,47,48,51,57,58,60].…”

Section: Introduction 1double Ramification Cyclesmentioning

confidence: 99%

Logarithmic intersections of double ramification cycles

Holmes¹,

Schwarz²

2022

Alg. Geom.

View full text Add to dashboard Cite

show abstract

“…The ideas here are closely related to and informed by the strategy followed in [45]. A related direction is work by Pandharipande, Schmitt, and the first author on the top Chern class of the Hodge bundle on blowups of M g,n [40]. Piecewise polynomials appear here, but the strict transform plays no role in this work, and the formula for the top Chern class of the Hodge bundle becomes the object of study.…”

Section: Theorem C the Difference Between The Classes [V]mentioning

confidence: 99%

“…at the ETH Algebraic Geometry and Moduli seminar in 2020 [51]. In the intervening time, piecewise polynomials have appeared in nearby contexts [30,40]. The ring appears to be a natural and interesting invariant of a logarithmic scheme.…”

Section: Theorem C the Difference Between The Classes [V]mentioning

confidence: 99%

“…The expression above is "universal" in a similar sense of Aluffi's formula itself. In this toric setting, the content is that the difference between strict and total transforms can be understood completely in terms of a universal formula, whose input is the pushforward to X of classes of strata of V decorated by Chern classes, also known as normally decorated strata classes [40]. 2.7.…”

Section: Corollary 262 the Difference Of Classesmentioning

confidence: 99%

See 1 more Smart Citation

A case study of intersections on blowups of the moduli of curves

Molcho,

Ranganathan

2021

Preprint

View full text Add to dashboard Cite

We explain how logarithmic structures select natural principal components in an intersection of schemes. These manifest in Chow homology and can be understood using the geometry of strict transforms under logarithmic blowups. Our motivation comes from Gromov-Witten theory. The toric contact cycles in the moduli space of curves parameterize curves that admit a map to a fixed toric variety with prescribed contact orders. We show that they are intersections of virtual strict transforms of double ramification cycles in blowups of the moduli space of curves. We supply a calculation scheme for the virtual strict transforms, and deduce that toric contact cycles lie in the tautological ring of the moduli space of curves. This is a higher dimensional analogue of a result of Faber-Pandharipande. The operational Chow rings of Artin fans play a basic role, and are shown to be isomorphic to rings of piecewise polynomials on associated cone complexes. The ingredients in our analysis are Fulton's blowup formula, Aluffi's formulas for Segre classes of monomial schemes, piecewise polynomials, and degeneration methods. A model calculation in toric intersection theory is treated without logarithmic methods and may be read independently.

show abstract

Logarithmic Gromov–Witten theory with expansions

Ranganathan¹

2022

Alg. Geom.

View full text Add to dashboard Cite

We construct relative Gromov-Witten theory with expanded degenerations in the normal crossings setting and establish a degeneration formula for the resulting invariants. Given a simple normal crossings pair (X, D), we show that there exist proper moduli spaces of curves in X with prescribed boundary conditions along D, equipped with virtual classes. Each point in such a moduli space parameterizes a map from a nodal curve to an expanded degeneration of X that is dimensionally transverse to the strata. In the context of maps to a simple normal crossings degeneration, the virtual fundamental class is known to decompose as a sum over tropical maps. We use the expanded formalism to prove the degeneration formula -we reconstruct the virtual class attached to a tropical map in terms of spaces of maps to expansions attached to the vertices.

show abstract

The Hodge bundle, the universal 0-section, and the log Chow ring of the moduli space of curves

Cited by 3 publications

References 42 publications

Logarithmic intersections of double ramification cycles

Logarithmic intersections of double ramification cycles

A case study of intersections on blowups of the moduli of curves

Logarithmic Gromov–Witten theory with expansions

Contact Info

Product

Resources

About