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On the birational geometry of spaces of complete forms II: Skew-forms

Author: Massarenti A.
Publication venue
Publication date: 01/01/2020
Field of study

Moduli spaces of complete skew-forms are compactifications of spaces of skew-symmetric linear maps of maximal rank on a fixed vector space, where the added boundary divisor is simple normal crossing. In this paper we compute their effective, nef and movable cones, the generators of their Cox rings, and for those spaces having Picard rank two we give an explicit presentation of the Cox ring. Furthermore, we give a complete description of both the Mori chamber and stable base locus decompositions of the effective cone of some spaces of complete skew-forms having Picard rank at most four

Archivio istituzionale della ricerca - Università di Ferrara

On the birational geometry of spaces of complete forms I: Collineations and quadrics

Author: Massarenti A.
Publication venue
Publication date: 01/01/2020
Field of study

Moduli spaces of complete collineations are wonderful compactifications of spaces of linear maps of maximal rank between two fixed vector spaces. We investigate the birational geometry of moduli spaces of complete collineations and quadrics from the point of view of Mori theory. We compute their effective, nef and movable cones, the generators of their Cox rings, and their groups of pseudo-automorphisms. Furthermore, we give a complete description of both the Mori chamber and stable base locus decompositions of the effective cone of the space of complete collineations of the three-dimensional projective space

Archivio istituzionale della ricerca - Università di Ferrara

Birational geometry of moduli spaces of configurations of points on the line

Author: Massarenti A.
Bolognesi M.
Publication venue
Publication date: 01/01/2021
Field of study

In this paper, we study the geometry of GIT configurations of n ordered points on P1 both from the birational and the biregular viewpoint. In particular, we prove that any extremal ray of the Mori cone of effective curves of the quotient.P1/n== PGL.2/, taken with the symmetric polarization, is generated by a one dimensional boundary stratum of the moduli space. Furthermore, we develop some technical machinery that we use to compute the canonical divisor and the Hilbert polynomial of.P1/n== PGL.2/ in its natural embedding, and its automorphism group

Archivio istituzionale della ricerca - Università di Ferrara

On the unirationality of quadric bundles

Author: Massarenti Alex
Massarenti A.
Publication venue
Publication date: 19/12/2022
Field of study

We prove that a general

n

-fold quadric bundle

\mathcal{Q}^{n-1}\rightarrow\mathbb{P}^{1}

, over a number field, with

(-K_{\mathcal{Q}^{n-1}})^n > 0

and discriminant of odd degree

\delta_{\mathcal{Q}^{n-1}}

is unirational, and that the same holds for quadric bundles over an arbitrary infinite field provided that

\mathcal{Q}^{n-1}

has a point, is otherwise general and

n\leq 5

. As a consequence we get the unirationality of a general

n

-fold quadric bundle

\mathcal{Q}^{h}\rightarrow\mathbb{P}^{n-h}

with discriminant of odd degree

\delta_{\mathcal{Q}^{h}}\leq 3h+4

, and of any smooth

4

-fold quadric bundle

\mathcal{Q}^{2}\rightarrow\mathbb{P}^{2}

, over an algebraically closed field, with

\delta_{\mathcal{Q}^{2}}\leq 12

.Comment: 13 page

arXiv.org e-Print Archive

Archivio istituzionale della ricerca - Università di Ferrara

Quartic and Quintic Hypersurfaces with Dense Rational Points

Author: Alex Massarenti
Massarenti A.
Publication venue
Publication date: 01/01/2023
Field of study

Let

X_4\subset \mathbb {P}^{n+1}

be a quartic hypersurface of dimension

n\geq 4

over an infinite field k. We show that if either

X_4

contains a linear subspace

\Lambda

of dimension

h\geq \max \{2,\dim (\Lambda \cap \operatorname {\mathrm {Sing}}(X_4))+2\}

or has double points along a linear subspace of dimension

h\geq 3

, a smooth k-rational point and is otherwise general, then

X_4

is unirational over k. This improves previous results by A. Predonzan and J. Harris, B. Mazur and R. Pandharipande for quartics. We also provide a density result for the k-rational points of quartic

3

-folds with a double plane over a number field, and several unirationality results for quintic hypersurfaces over a

C_r

field

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Archivio istituzionale della ricerca - Università di Ferrara

Non-secant defectivity via osculating projections

Author: Rischter R.
Massarenti A.
Publication venue
Publication date: 01/01/2019
Field of study

We introduce a method to produce bounds for the non secant defectivity of an arbitrary irreducible projective variety, once we know how its osculating spaces behave in families and when the linear projections from them are generically finite. Then we analyze the relative dimension of osculating projections of Grassmannians, and as an application of our techniques we prove that asymptotically the Grassmannian G(r, n), parametrizing r -planes in Pn, is not h-defective for h ≤ ( n+1/r+1 )[log2(r )]. This bound improves the previous one h ≤ n-r/3 + 1, due to H. Abo, G. Ottaviani and C. Peterson, for any r ≥ 4

Archivio istituzionale della ricerca - Università di Ferrara

Ample bodies and Terracini loci of projective varieties

Author: Laface A.
Massarenti A.
Publication venue
Publication date: 01/01/2024
Field of study

We introduce the notion of ample body of a projective variety and use it to prove emptiness results for Terracini loci and specific identifiability results for toric and homogeneous varieties

Archivio istituzionale della ricerca - Università di Ferrara

Complete symplectic quadrics and Kontsevich spaces of conics in Lagrangian Grassmannians

Author: Corniani E.
Massarenti A.
Publication venue
Publication date: 01/01/2022
Field of study

A wonderful compactification of an orbit under the action of a semi-simple and simply connected group is a smooth projective variety containing the orbit as a dense open subset, and where the added boundary divisor is simple normal crossing. We construct the wonderful compactification of the space of symmetric and symplectic matrices, and investigate its geometry. As an application, we describe the birational geometry of the Kontsevich spaces parametrizing conics in Lagrangian Grassmannians

Archivio istituzionale della ricerca - Università di Ferrara

Bronowski’s conjecture and the identifiability of projective varieties

Author: Mella M.
Massarenti A.
Publication venue
Publication date: 01/01/2024
Field of study

Let X ⊂ Phn+h-1 be an irreducible and nondegenerate variety of dimension n. Bronowski's conjecture predicts that X is h-identifiable if and only if the general h-1/-tangential projection τX h-1 W X -→ Pn is birational. In this paper we provide counterexamples to this conjecture. Building on the ideas that led to the counterexamples we manage to prove an amended version of the Bronowski's conjecture for a wide class of varieties and to reduce the identifiability problem for projective varieties to their secant defectiveness

Archivio istituzionale della ricerca - Università di Ferrara

On the weak lefschetz principle in birational geometry

Author: Lozano Huerta C.
Massarenti A.
Publication venue
Publication date: 01/01/2021
Field of study

No abstract availabl

Archivio istituzionale della ricerca - Università di Ferrara