Ugo Bruzzo
Moduli of symplectic instanton vector bundles of higher rank on projective space $\mathbb{P}^3$.
Tue, 09/13/2011 - 15:01 — SomNambulAuthors: Ugo Bruzzo, D. Markushevich, A. S. Tikhomirov
Subjects: Algebraic Geometry
AbstractSymplectic instanton vector bundles on the projective space $\mathbb{P}^3$
constitute a natural generalization of mathematical instantons of rank 2. We
study the moduli space $I_{n,r}$ of rank-$2r$ symplectic instanton vector
bundles on $\mathbb{P}^3$ with $r\ge2$ and second Chern class $n\ge r,\ n\equiv
r({\rm mod}2)$. We give an explicit construction of an irreducible component
$I^*_{n,r}$ of this space for each such value of $n$ and show that $I^*_{n,r}$
has the expected dimension $4n(r+1)-r(2r+1)$.Uhlenbeck-Donaldson compactification for framed sheaves on projective surfaces.
Tue, 09/07/2010 - 15:02 — SomNambulAuthors: Ugo Bruzzo, Alexander Tikhomirov, Dimitri Markushevich
Subjects: Algebraic Geometry
AbstractWe construct a compactification $M^{\mu ss}$ of the Uhlenbeck-Donaldson type
for the moduli space of slope stable framed bundles. This is a kind of a moduli
space of slope semistable framed sheaves. We show that there exists a
projective morphism $\gamma \colon M^s \to M^{\mu ss}$, where $M^s$ is the
moduli space of S-equivalence classes of Gieseker-semistable framed sheaves.
The space $M^{\mu ss}$ has a natural set-theoretic stratification which allows
one, via a Hitchin-Kobayashi correspondence, to compare it with the moduli
spaces of framed ideal instantons.Holomorphic equivariant cohomology of Atiyah algebroids and localization.
Tue, 10/13/2009 - 18:46 — SomNambulAuthors: Ugo Bruzzo, Vladimir Rubtsov
Subjects: Complex Variables
AbstractWe prove a localization formula for a "holomorphic equivariant cohomology"
attached to the Atiyah algebroid of an equivariant holomorphic vector bundle.
This generalizes Carrell-Lieberman and K. Liu's localization formulas.On semistable principal bundles over a complex projective manifold, II.
Tue, 09/29/2009 - 15:21 — SomNambulAuthors: Indranil Biswas, Ugo Bruzzo
Subjects: Algebraic Geometry
AbstractLet (X, \omega) be a compact connected Kaehler manifold of complex dimension
d and E_G a holomorphic principal G-bundle on X, where G is a connected
reductive linear algebraic group defined over C. Let Z (G) denote the center of
G.Poincare polynomial of moduli spaces of framed sheaves on (stacky) Hirzebruch surfaces.
Wed, 09/09/2009 - 22:08 — SomNambulAuthors: Ugo Bruzzo, Rubik Poghossian, Alessandro Tanzini
Subjects: Algebraic Geometry
AbstractWe perform a study of the moduli space of framed torsion-free sheaves on
Hirzebruch surfaces by using localization techniques. We discuss some general
properties of this moduli space by studying it in the framework of
Huybrechts-Lehn theory of framed modules. We classify the fixed points under a
toric action on the moduli space, and use this to compute the Poincare
polynomial of the latter. This will imply that the moduli spaces we are
considering are irreducible.Poincare polynomial of moduli spaces of framed sheaves on (stacky) Hirzebruch surfaces.
Wed, 09/09/2009 - 22:08 — SomNambulAuthors: Ugo Bruzzo, Rubik Poghossian, Alessandro Tanzini
Subjects: Algebraic Geometry
AbstractWe perform a study of the moduli space of framed torsion-free sheaves on
Hirzebruch surfaces by using localization techniques. We discuss some general
properties of this moduli space by studying it in the framework of
Huybrechts-Lehn theory of framed modules. We classify the fixed points under a
toric action on the moduli space, and use this to compute the Poincare
polynomial of the latter. This will imply that the moduli spaces we are
considering are irreducible.
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