NOTES ON TORIC VARIETIES FROM MORI THEORETIC VIEWPOINT, II

Nagoya Mathematical Journal ◽

10.1017/nmj.2018.27 ◽

2018 ◽

Vol 239 ◽

pp. 42-75

Author(s):

OSAMU FUJINO ◽

HIROSHI SATO

Keyword(s):

Toric Varieties ◽

Very Ampleness

We give new estimates of lengths of extremal rays of birational type for toric varieties. We can see that our new estimates are the best by constructing some examples explicitly. As applications, we discuss the nefness and pseudo-effectivity of adjoint bundles of projective toric varieties. We also treat some generalizations of Fujita’s freeness and very ampleness for toric varieties.

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Fujita's very ampleness conjecture for singular toric varieties

Tohoku Mathematical Journal ◽

10.2748/tmj/1163775140 ◽

2006 ◽

Vol 58 (3) ◽

pp. 447-459 ◽

Cited By ~ 2

Author(s):

Sam Payne

Keyword(s):

Toric Varieties ◽

Very Ampleness

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Numerical Criteria for Very Ampleness of Divisors on Projective Bundles Over an Elliptic Curve

Canadian Journal of Mathematics ◽

10.4153/cjm-1996-058-1 ◽

1996 ◽

Vol 48 (6) ◽

pp. 1121-1137 ◽

Cited By ~ 1

Author(s):

Alberto Alzati ◽

Marina Bertolini ◽

Gian Mario Besana

Keyword(s):

Elliptic Curve ◽

Numerical Characterization ◽

Projective Bundles ◽

Very Ampleness

AbstractLet D be a divisor on a projectivized bundle over an elliptic curve. Numerical conditions for the very ampleness of D are proved. In some cases a complete numerical characterization is found.

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Codimension bounds for the Noether–Lefschetz components for toric varieties

European Journal of Mathematics ◽

10.1007/s40879-021-00461-0 ◽

2021 ◽

Author(s):

Ugo Bruzzo ◽

William D. Montoya

Keyword(s):

Irreducible Component ◽

Toric Variety ◽

Toric Varieties ◽

Ample Divisor ◽

Smooth Hypersurface

AbstractFor a quasi-smooth hypersurface X in a projective simplicial toric variety $$\mathbb {P}_{\Sigma }$$ P Σ , the morphism $$i^*:H^p(\mathbb {P}_{\Sigma })\rightarrow H^p(X)$$ i ∗ : H p ( P Σ ) → H p ( X ) induced by the inclusion is injective for $$p=\dim X$$ p = dim X and an isomorphism for $$p<\dim X-1$$ p < dim X - 1 . This allows one to define the Noether–Lefschetz locus $$\mathrm{NL}_{\beta }$$ NL β as the locus of quasi-smooth hypersurfaces of degree $$\beta $$ β such that $$i^*$$ i ∗ acting on the middle algebraic cohomology is not an isomorphism. We prove that, under some assumptions, if $$\dim \mathbb {P}_{\Sigma }=2k+1$$ dim P Σ = 2 k + 1 and $$k\beta -\beta _0=n\eta $$ k β - β 0 = n η , $$n\in \mathbb {N}$$ n ∈ N , where $$\eta $$ η is the class of a 0-regular ample divisor, and $$\beta _0$$ β 0 is the anticanonical class, every irreducible component V of the Noether–Lefschetz locus quasi-smooth hypersurfaces of degree $$\beta $$ β satisfies the bounds $$n+1\leqslant \mathrm{codim}\,Z \leqslant h^{k-1,\,k+1}(X)$$ n + 1 ⩽ codim Z ⩽ h k - 1 , k + 1 ( X ) .

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On the Hodge conjecture for quasi-smooth intersections in toric varieties

São Paulo Journal of Mathematical Sciences ◽

10.1007/s40863-021-00247-y ◽

2021 ◽

Author(s):

Ugo Bruzzo ◽

William Montoya

Keyword(s):

Complete Intersection ◽

Toric Variety ◽

Toric Varieties ◽

Picard Group ◽

Hodge Conjecture ◽

Smooth Hypersurface ◽

Suitable Notion

AbstractWe establish the Hodge conjecture for some subvarieties of a class of toric varieties. First we study quasi-smooth intersections in a projective simplicial toric variety, which is a suitable notion to generalize smooth complete intersection subvarieties in the toric environment, and in particular quasi-smooth hypersurfaces. We show that under appropriate conditions, the Hodge conjecture holds for a very general quasi-smooth intersection subvariety, generalizing the work on quasi-smooth hypersurfaces of the first author and Grassi in Bruzzo and Grassi (Commun Anal Geom 28: 1773–1786, 2020). We also show that the Hodge Conjecture holds asymptotically for suitable quasi-smooth hypersurface in the Noether–Lefschetz locus, where “asymptotically” means that the degree of the hypersurface is big enough, under the assumption that the ambient variety $${{\mathbb {P}}}_\Sigma ^{2k+1}$$ P Σ 2 k + 1 has Picard group $${\mathbb {Z}}$$ Z . This extends to a class of toric varieties Otwinowska’s result in Otwinowska (J Alg Geom 12: 307–320, 2003).

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Embedding the Picard group inside the class group: the case of $$\mathbb {Q}$$-factorial complete toric varieties

Journal of Algebraic Combinatorics ◽

10.1007/s10801-021-01025-x ◽

2021 ◽

Author(s):

Michele Rossi ◽

Lea Terracini

Keyword(s):

Free Group ◽

Toric Variety ◽

Class Group ◽

Abelian Groups ◽

Toric Varieties ◽

Picard Group ◽

Closed Field ◽

Finitely Generated ◽

Free Part ◽

Canonical Injection

AbstractLet X be a $$\mathbb {Q}$$ Q -factorial complete toric variety over an algebraic closed field of characteristic 0. There is a canonical injection of the Picard group $$\mathrm{Pic}(X)$$ Pic ( X ) in the group $$\mathrm{Cl}(X)$$ Cl ( X ) of classes of Weil divisors. These two groups are finitely generated abelian groups; while the first one is a free group, the second one may have torsion. We investigate algebraic and geometrical conditions under which the image of $$\mathrm{Pic}(X)$$ Pic ( X ) in $$\mathrm{Cl}(X)$$ Cl ( X ) is contained in a free part of the latter group.

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