Hodge bundle

In mathematics, the Hodge bundle, named after W. V. D. Hodge, appears in the study of families of curves, where it provides an invariant in the moduli theory of algebraic curves. Furthermore, it has applications to the theory of modular forms on reductive algebraic groups^[1] and string theory.^[2]

Definitions

Let ${\mathcal {M}}_{g}$ be the moduli space of algebraic curves of genus g curves over some scheme. The Hodge bundle Λ_g is a vector bundle on ${\mathcal {M}}_{g}$ whose fiber at a point C in ${\mathcal {M}}_{g}$ is the space of holomorphic differentials on the curve C. To define the Hodge bundle, let $\pi :{\mathcal {C}}_{g}\rightarrow {\mathcal {M}}_{g}$ be the universal algebraic curve of genus g and let ω_g be its relative dualizing sheaf. The Hodge bundle is the pushforward of this sheaf, i.e.^[3]

\Lambda _{g}=\pi _{*}\omega _{g}.\,

Notes

References

van der Geer, Gerard (2008), "Siegel modular forms and their applications", in Ranestad, Kristian, The 1-2-3 of modular forms, Universitext, Berlin: Springer-Verlag, pp. 181–245, doi:10.1007/978-3-540-74119-0, ISBN 978-3-540-74117-6, MR 2409679
Harris, Joe; Morrison, Ian (1998), Moduli of curves, Graduate Texts in Mathematics, 187, Springer-Verlag, ISBN 978-0-387-98429-2, MR 1631825
Liu, Kefeng (2006), "Localization and conjectures from string duality", in Ge, Mo-Lin; Zhang, Weiping, Differential geometry and physics, Nankai Tracts in Mathematics, 10, World Scientific, pp. 63–105, ISBN 978-981-270-377-4, MR 2322389

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[1] van der Geer 2008, §13

[2] Liu 2006, §5

[3] Harris & Morrison 1998, p. 155

Hodge bundle

Definitions

See also

Notes

References