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Titles & Abstracts

GiUlio
Bresciani

Scuola Normale Superiore, Pisa

The field of moduli of plane curves

It is a classical fact going back to F. Klein that an elliptic curve E over the algebraic closure of Q is defined by a homogeneous polynomial in 3 variables with coefficients in Q(j_E), where j_E is the j-invariant of E, and Q(j_E) is the field of moduli of E. The general definition of field of moduli goes back to T. Matsusaka and G. Shimura: loosely speaking, it is the smallest field where we might hope that the curve is defined.

We prove that every smooth plane curve of degree prime with 6 is defined by a homogeneous polynomial with coefficients in the field of moduli. Furthermore, we show that most curves in arbitrary degree, and more generally most algebraic cycles with finite automorphism group, descend to a Brauer-Severi surface over the field of moduli.

Ugo Bruzzo

Sissa, Trieste

Ricci flat metrics on canonical bundles

Slides

Calabi described all (possibly singular) extremal Kähler metrics on compact surfaces with underlying S^2xS^2 topology. They include a 2-parameter family of singular Kähler-Einstein metrics, which was rediscovered by Gibbons and Pope and further studied by Gauntlett, Martelli, Sparks and Waldram. Abreu gave a neat description of Calabi’s full 4-parameter family using symplectic techniques. In this talk we describe an enhancement of Abreu’s formalism and apply it to study the 2-parameter family of Kähler-Einstein metrics together with their degenerations and special cases, also revisiting Calabi’s trick to construct Ricci-flat metrics on the total spaces of the canonical bundles of (possibily singular) Kähler-Einstein surfaces. The formalism is quite effective and produces explicit formulas.

Gaia Comaschi

Universidade de Campinas

Instanton bundles on contact Fano manifolds

Instanton bundles originally appeared in the context of Yang-Mills gauge theory. In their seminal work Atiyah, Drinfeld, Hitchin and Manin established a correspondence between the (anti)self-dual solutions of the Yang-Mills equations on the four-sphere S^4 of topological charge n and the mathematical instantons on its twistor space IP^3 namely, the rank 2 holomorphic vector bundles E on IP^3 having c_1(E) = 0, c_2(E) = n and such that H^1(E(−2)) = 0. Both twistor geometry and Yang Mills theory can be generalized to a 4n-dimensional Quaternion Kähler manifold M; this allows us to define the notion of instanton bundle on the twistor space Z, a so called contact Fano manifold. In this talk I will recall some features of instantons on contact Fano manifolds and present some properties of these bundles and of their moduli in the case M = G_2/SO(4) and Z = G_2/U (1) · SU (2).

Pedro L. Del Ángel Rodriguez

CIMAT, Guanajuato

BC_n matroids and torus invariant subvarieties of the symplectic Grassmannian of isotropic planes

Slides

Let SpG(2,2n) be the complex symplectic Grassmannian of (affine) isotropic planes in 2n-space. We study the problem of characterizing the set of T-invariant algebraic subvarieties of SpG(2,2n) for the maximal torus T. As a by-product we obtain irreducibility of the thin symplectic Schubert cells as well as some representability criterion for BC_n-matroids.

Peter Dalakov

American University in Bulgaria and Bulgarian Academy of Sciences, Sofia

Seiberg-Witten differentials on the Hitchin base

Slides

In this talk I will report on a recent work with Ugo Bruzzo (SISSA). We describe explicitly, in terms of Lie theory and cameral data, the covariant (Gauss–Manin) derivative of the Seiberg–Witten differential defined on the weight-one variation of Hodge structures that exists on a Zariski open subset of the base of the Hitchin fibration.

Andres J. Fernandez Herrero

Columbia University, New York

Harder-Narasimhan theory for gauged maps

Many objects of interest in algebraic geometry are parametrized by algebraic varieties, called moduli spaces. In this talk I will discuss recent techniques developed to construct moduli spaces of decorated principal bundles on a fixed compact Riemann surface. Using these techniques we construct a Harder-Narasimhan stratification, which can be used to obtain a generalization of the Verlinde formula in the context of decorated principal bundles.

This talk is based on joint work with Daniel Halpern-Leistner.

J. Óscar González-Cervantes

Instituto Politécnico Nacional, Ciudad México

On slice regular Bergman space and fiber bundle theory

Slides

Recently, the theory of fiber bundles has been used to explain several phenomena in the theory of slice regular functions, e.g., the slice regular functions is the base space of a fiber bundle, the slice regular functions are defined on the total space of some sphere bundle and finally the theory of slice regular functions in several quaternionic variables is well-defined using the theory of fiber bundles.

The purpose of this talk is to explain some properties of the Bergman space of slice regular functions in terms of fiber bundle theory.

Cesare Goretti

Freie Universität Berlin

A Kobayashi-Hitchin correspondence for ρ-coherent systems

ρ-coherent systems arise as a natural generalization of coherent systems, which had been deeply studied in the early 2000s. Using the techniques developed by Bradlow, García-Prada and Mundet i Riera for principal pairs we are going to prove a Kobayashi-Hitchin correspondence for ρ-coherent systems, with that is meant that there is a link between existence of solutions to a set of differential equations and stability of the ρ-coherent system. Furthermore, we are going to show that this notion of stability is equivalent to the one that arises from GIT, which has been defined recently by Schmitt.

Christer O. Kiselman

Uppsala Universitet

Complex convexity

Slides
Picture

Complex convexity is a variant of the more well-known concept of real convexity. I will present complex convexity, in particular lineal convexity, which I learnt about from André Martineau (1930-1972). There are no less than eleven variants of lineal convexity, all different. A lineally convex set can be the union of an increasing family of lineally convex sets with smooth boundary, while others are not of that kind. It is of interest to find sufficient conditions for this to happen, and also to find necessary conditions-ideally a condition which is both necessary and sufficient.

Alessia Mandini

Universidade Fluminense, Niterói

New results on hyperpolygons and moduli space of parabolic Higgs bundles

Hyperpolygons spaces are a family of hyperkähler quiver varieties that can be obtained by hyperkähler reduction of a finite number of SU(2)-coadjoint orbits. Jointly with L. Godinho, we showed that these spaces are isomorphic to moduli spaces of rank 2, holomorphically trivial parabolic Higgs bundles over IP^1, with fixed determinant and trace-free Higgs field, when a suitable condition between the parabolic weights and the spectra of the coadjoint orbits is satisfied.

In this talk I will describe some recent works, including on-going work, that generalize this construction in several ways.

The talk is based on joint works with L.Godinho, and with I. Biswas and C. Florentino and L.Godinho.

Ángel L. Muñoz Castañeda

Universidad de Salamanca

Degenerations of moduli spaces of principal bundles over projective curves

Slides

The study of degenerations of moduli spaces of bundles over projective curves goes back to Igusa and has encountered applications in theoretical physics, like in F-Theory (Witten, Friedman and Morgan) and in the theory of conformal blocks (Tsuchiya, Ueno and Yamada).

The approach to the degeneration of moduli spaces of bundles on projective curves, Bun(X), can be presented in three different ways. 1) Given a flat family of stable curves of genus g, C, over a DVR, A, whose generic fiber X is smooth, find a flat algebraic variety \overline{Bun}(C) over A whose generic fiber is Bun(X). 2) Given g > 2, find an algebraic variety \overline{Bun}_g proper and flat over Mg whose fibers on smooth curves X coincide with Bun(X). 3) If a compactification \overline{Bun}(X) of Bun(X) is known for any stable curve X, find an algebraic variety \overline{Bun}_g over Mg whose fibers over smooth curves X coincide with Bun(X) and whose fibers on singular curves X coincide with \overline{Bun}(X).

Although much is known in the case of vector bundles, little were known for principal G-bundles (G being an arbitrary semisimple algebraic group) until very recently. The first two problems have been tackled by Balaji and Wilson respectively, while the third has been addressed by the speaker and Schmitt on the basis of the theory of singular principal bundles. In this talk, I will expose the results concerning this last problem and, if time permits, raise some questions regarding this topic. Chern-Weil theory and describe associated characteristic classes.

References

[1] Balaji, V. “Torsors on semistable curves and degenerations”. Proceedings - Mathematical Sciences 132 (2022).

[2] Muñoz Castañeda, A.L. “On the moduli spaces of singular principal bundles on stable curves”. Advances in Geometry 20, pp. 573-584 (2020).

[3] Muñoz Castañeda, A.L., and Schmitt, A.H.W. “Singular principal bundles on reducible nodal curves”. Transactions of the American Mathematical Society 374, pp. 8639-8660 (2021).

[4] Muñoz Castañeda, A.L. “A compactification of the universal moduli space of principal G-bundles”. Mediterranean Jornal of Mathematics 19 (2022).

[5] Muñoz Castañeda, A. L. “Generalized parabolic structures over smooth curves with many components and principal bundles over reducible nodal curves”. Annali di Matematica Pura ed Applicata (1923 -) 202, pp. 1469-1500 (2023)

[6] A. Wilson. “Compactifications of moduli of G-bundles and conformal blocks”. arXiv:2104.07549v3 (2022).

Frank Neumann

Università degli Studi di Pavia

Atiyah sequences, connections and Chern-Weil theory for principal bundles over smooth stacks

Slides

We present a theory of general and integrable connections on smooth stacks, as well as on principal bundles over them using Atiyah exact sequences of vector bundles associated to transversal tangential distributions. Finally, we develop the corresponding Chern-Weil theory and describe associated characteristic classes.

Joint work with I. Biswas (TIFR Mumbai), S. Chatterjee (IISER Kerala) and P. Koushik (IISER Pune).

J. Martín Perez Bernal

Freie Universität Berlin

A Donaldson-Uhlenbeck type compactification of the moduli space for singular principal G-bundles

Slides

In this talk, we will discuss our work on the construction and projectivity of the Donaldson-Uhlenbeck moduli space for singular principal G-bundles. We will adapt Langton's argument to the setting of singular principal G-bundles to prove its projectivity. Additionally, we will explore the technical difficulties concerning the Quot-Chow morphism. More precisely, the non-connectednes of the fibres of this morphism is the biggest obstacle for defining the classical Donaldson-Uhlenbeck moduli space.

Francisco J. Plaza Martín

Universidad de Salamanca

Finiteness properties of the subalgebra of invariant elements

Slides

Hilbert's 14th problem is concerned with the properties of the sub algebra of invariant elements A^G of a k-algebra acted on by an algebraic group G.

This is a crucial problem in classical invariant theory that has been studied by several authors (e.g. Schur, Weil, Nagata, Seshadri, etc.) and that, thanks to Nagata's result, has unveiled the relevance of reductive groups and its role in geometric invariant theory. In this paper, we study this problem in a relative and non-noetherian context. Let us be more precise. Let R denote an algebra over a ring k, T an R-algebra, M a finitely generated projective R-module and N a T-module. Let G be a linearly reductive group scheme over k together with a representation \rho: G_R -> Aut(M) (meaning a natural transformation between the group-functors). Finally, consider the graded T-algebra

A := (Sym_T^\bullet (M^{\vee} \otimes_R N))^G

where M^\vee denotes the dual of M, Hom_R(M,R). Then, we focus on two issues: first, determine under which conditions the graded T-algebra A is finitely generated, finitely presented or flat; and second, determine under which conditions there exists a closed embedding of Proj(A) into a projective space.

Joint work with J. Martin Ovejero and A.L. Muñoz Castañeda.

Sebastián Reyes Carocca

Universidad de Chile, Santiago de Chile

On group actions on Riemann surfaces and Weierstrass points

Slides

In this talk, we will address the general problem of finding compact Riemann surfaces with automorphism group acting transitively on the set of Weierstrass points. We will discuss known results and open problems, and some recent progress (joint work with Pietro Speziali).

Anita M. Rojas Rodriguez

Universidad de Chile, Santiago de Chile

Some results about the moduli space Mg and Ag

Slides

Moduli spaces of Riemann surfaces Mg and of abelian varieties Ag are central objects of research in Complex Geometry. Since they are related by the Torelli map, it is natural to search for results about Ag using what is known for Mg. This approach is particularly fruitful when considering group actions. There are famous bounds for several concepts regarding the geometry of group actions on compact Riemann surfaces of genus g ≥ 2: The well known Hurwitz bound 84(g − 1), which is attained for infinite genera, and also in infinitely many others not. Another remarkable bounds are Wiman’s bound 4g + 2, which is attained for every g [7], and the Accola-Maclachlan bound 8g + 8 [1, 4]. Following Accola-Maclachlan idea, other geometrically meaningful bounds are obtained; such as 4g + 1 [2] and 4g − 4 [5]. In this talk we will explain the question that motivates the search of these bounds and discuss extensions of these ideas.

Specifically, we consider a compact Riemann surface X of genus g ≥ 2 and T ∈ Aut(X) an automorphism of large primer order q > g. It is known that either q = 2g + 1, and this gives Lefschetz surfaces, or q = g + 1. We [6] are interested in the understanding of Riemann surfaces, and in their corresponding Jacobian varieties, in this second case. That is to provide a classification of those Riemann surfaces and some descriptions of the corresponding Jacobian varieties, in terms of decompositions and other properties. In particular, we compute the Riemann matrix of the Accola-Maclachlan curve [1, 4] of genus 4.

Part of this work is in collaboration with Sebastián Reyes-Carocca, from Universidad de Chile.

References

[1] R. Accola, On the number of automorphisms of a closed Riemann surface, Trans. Am. Math. Soc. 131 (1968), 398–408.

[2] A. F. Costa and M. Izquierdo, One-dimensional families of Riemann surfaces of genus g with 4g + 4 automorphisms, Rev. R. Acad. Cienc. Exactas Fís. Nat. Ser. A Mat. RACSAM 112 (2018), no. 3, 623–631.

[3] M. Izquierdo, M., S. Reyes-Carocca, A.M. Rojas, On families of Riemann surfaces with automorphisms, Journal of Pure and Applied Algebra 225, in press, pp.1-21. https://doi.org/10.1016/j.jpaa.2021.106704

[4] C. Maclachlan, A bound for the number of automorphisms of a compact Riemann surface, J. London Math. Soc. 44 (1969), 265–272.

[5] S. Reyes-Carocca, On compact Riemann surfaces of genus g with 4g − 4 automorphisms, Israel J. Math. 237 (2020), 415–436.

[6] S. Reyes-Carocca and A. M. Rojas., On large prime actions on Riemann surfaces, J. Group Theory 25 (2022), 887–940, DOI 10.1515/jgth-2020-0140.

[7] A. Wiman, Ueber die hyperelliptischen Curven und diejenigen von Geschlechte p = 3, welche eindeutige Transformationen in sich zulassen, Bihang till K. Svenska Vet.-Akad. Handlingar, Stockholm 21 (1895-6), 1–28.

Avery Wilson

Kenyon College, Ohio

G-bundles on singular curves and conformal blocks

I will talk about the problem of compactifying spaces of G-bundles on a projective nodal curve. The stack of G-bundles on a singular curve is not "complete," and it is unclear what types of objects should be used to fill out the boundary. I will discuss one approach to compactification using conformal blocks, which are representation theoretic objects arising from infinite dimensional Lie algebras. In recent work I showed that, when G is a type A or C simple Lie group, the Proj of the conformal blocks algebra is a projective variety closely related to Schmitt and Muñoz Castañeda's moduli space of singular G-bundles.

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Titles & Abstracts

GiUlio Bresciani

The field of moduli of plane curves

Ugo Bruzzo

Ricci flat metrics on canonical bundles

Gaia Comaschi

Instanton bundles on contact Fano manifolds

Pedro L. Del Ángel Rodriguez

BC_n matroids and torus invariant subvarieties of the symplectic Grassmannian of isotropic planes

Peter Dalakov

Seiberg-Witten differentials on the Hitchin base

Andres J. Fernandez Herrero

Harder-Narasimhan theory for gauged maps

J. Óscar González-Cervantes

On slice regular Bergman space and fiber bundle theory

Cesare Goretti

A Kobayashi-Hitchin correspondence for ρ-coherent systems

Christer O. Kiselman

Complex convexity

Alessia Mandini

New results on hyperpolygons and moduli space of parabolic Higgs bundles

Ángel L. Muñoz Castañeda

Degenerations of moduli spaces of principal bundles over projective curves

Frank Neumann

Atiyah sequences, connections and Chern-Weil theory for principal bundles over smooth stacks

J. Martín Perez Bernal

A Donaldson-Uhlenbeck type compactification of the moduli space for singular principal G-bundles

Francisco J. Plaza Martín

Finiteness properties of the subalgebra of invariant elements

Sebastián Reyes Carocca

On group actions on Riemann surfaces and Weierstrass points

Anita M. Rojas Rodriguez

Some results about the moduli space Mg and Ag

Avery Wilson

G-bundles on singular curves and conformal blocks

GiUlio
Bresciani