Almost Canonical Polynomials of Algebraic Surfaces

Tyurin, Andrej N.

doi:10.1007/978-3-322-99342-7_18

Almost Canonical Polynomials of Algebraic Surfaces

Andrej N. Tyurin

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Part of the book series: Aspects of Mathematics ((ASMA,volume 25))

Abstract

Let S be a smooth simple connected algebraic surface over ℂ, Pic (S) be the group of classes of divisors,

$$L \subset \;Pic\;(S) \otimes \mathbb{R}$$

((0.1))

be the light cone,

$${L^ + } = \;light\;cone/{\mathbb{R}^ + }$$

((0.2))

be the Lobachevski space and

$${C^ + } = \;Cs/{\mathbb{R}^ + }$$

((0.3))

be closed subset of L ⁺ of rays of polarizations.

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Andrej N. Tyurin
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Editors and Affiliations

Department of Mathematics, State Pedagogical Institute, Respublikanskayastr. 108, Yaroslavl’, 150000, Russia
Alexander Tikhomirov
Steklov Mathematical Institute, Vavilova 42, Moscow, 117966, Russia
Andrej Tyurin

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Tyurin, A.N. (1994). Almost Canonical Polynomials of Algebraic Surfaces. In: Tikhomirov, A., Tyurin, A. (eds) Algebraic Geometry and its Applications. Aspects of Mathematics, vol 25. Vieweg+Teubner Verlag, Wiesbaden. https://doi.org/10.1007/978-3-322-99342-7_18

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DOI: https://doi.org/10.1007/978-3-322-99342-7_18
Publisher Name: Vieweg+Teubner Verlag, Wiesbaden
Print ISBN: 978-3-322-99344-1
Online ISBN: 978-3-322-99342-7
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