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Let $(𝒪, \sum, F_{\infty})$ be an arithmetic ring of Krull dimension at most $1, S = Spec (𝒪)$ and $(𝒳 \to S; σ_{1}, ..., σ_{n})$ a pointed stable curve. Write $𝒰 = 𝒳 ∖ \cup_{j} σ_{j} (S)$ . For every integer $k > 0$ , the invertible sheaf $ω_{𝒳 / S}^{k + 1} (k σ_{1} + ... + k σ_{n})$ inherits a singular hermitian structure from the hyperbolic metric on the Riemann surface $𝒰_{\infty}$ . In this article we define a Quillen type metric ${∥\cdot∥}_{Q}$ on the determinant line $λ_{k + 1} = λ ω_{𝒳 / S}^{k + 1}$ $(k ...$

An Equivariant Lefschetz Formula for Finite Reductive Groups.

G. Ellingsrud, K. Lonsted (1980) Mathematische Annalen

Apolarity and its applications.

N.I. Shepherd-Barron (1989) Inventiones mathematicae

Appendix to "Plücker conditions on plane rational curves": Families of rational plane curves.

Stein Arild Stromme (1984) Mathematica Scandinavica

Are rational curves determined by tangent vectors?

Stefan Kebekus, Sándor J. Kovács (2004) Annales de l’institut Fourier

Let

X

be a projective variety which is covered by rational curves, for instance a Fano manifold over the complex numbers. In this paper, we give sufficient conditions which guarantee that every tangent vector at a general point of

X

is contained in at most one rational curve of minimal degree. As an immediate application, we obtain irreducibility criteria for the space of minimal rational curves.

Arithmetic of Weil Curves.

B. Mazur, P. Swinnerton-Dyer (1974)

Inventiones mathematicae

Arithmetic variation of fibers in families of curves. Part I: Hurwitz monodromy criteria for rational points on all members of the familiy.

Pierre Debes, Mike Fried (1990)

Journal für die reine und angewandte Mathematik

Automorphismen und Modularraum Galoisscher dreiblättriger Überlagerungen.

Andrei Duma, Wolfgang Radtke (1985)

Manuscripta mathematica

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