Full Read and Download Reference eBook
A Compactification Over The Module Space Of Stable Curves Of The Universal Moduli Space Of Slope Semester Bundles Book in PDF, ePub and Kindle version is available to download in english. Read online anytime anywhere directly from your device. Click on the download button below to get a free pdf file of A Compactification Over The Module Space Of Stable Curves Of The Universal Moduli Space Of Slope Semester Bundles book. This book definitely worth reading, it is an incredibly well-written.
Author : Rahul Vijay Pandharipande
Publisher :
Page : 130 pages
File Size : 38,60 MB
Release : 1994
Category : Compactifications
ISBN :
Author : Paul Hacking
Publisher : Birkhäuser
Page : 141 pages
File Size : 46,95 MB
Release : 2016-02-04
Category : Mathematics
ISBN : 3034809212
This book focusses on a large class of objects in moduli theory and provides different perspectives from which compactifications of moduli spaces may be investigated. Three contributions give an insight on particular aspects of moduli problems. In the first of them, various ways to construct and compactify moduli spaces are presented. In the second, some questions on the boundary of moduli spaces of surfaces are addressed. Finally, the theory of stable quotients is explained, which yields meaningful compactifications of moduli spaces of maps. Both advanced graduate students and researchers in algebraic geometry will find this book a valuable read.
Author : Valery Alexeev
Publisher : American Mathematical Soc.
Page : 264 pages
File Size : 26,94 MB
Release : 2012
Category : Mathematics
ISBN : 0821868993
This book contains the proceedings of the conference on Compact Moduli and Vector Bundles, held from October 21-24, 2010, at the University of Georgia. This book is a mix of survey papers and original research articles on two related subjects: Compact Moduli spaces of algebraic varieties, including of higher-dimensional stable varieties and pairs, and Vector Bundles on such compact moduli spaces, including the conformal block bundles. These bundles originated in the 1970s in physics; the celebrated Verlinde formula computes their ranks. Among the surveys are those that examine compact moduli spaces of surfaces of general type and others that concern the GIT constructions of log canonical models of moduli of stable curves. The original research articles include, among others, papers on a formula for the Chern classes of conformal classes of conformal block bundles on the moduli spaces of stable curves, on Looijenga's conjectures, on algebraic and tropical Brill-Noether theory, on Green's conjecture, on rigid curves on moduli of curves, and on Steiner surfaces.
Author : Thomas Lehmkuhl
Publisher : American Mathematical Soc.
Page : 113 pages
File Size : 46,48 MB
Release : 2009-01-21
Category : Science
ISBN : 0821842447
In this article the author describes in detail a compactification of the moduli schemes representing Drinfeld modules of rank 2 endowed with some level structure. The boundary is a union of copies of moduli schemes for Drinfeld modules of rank 1, and its points are interpreted as Tate data. The author also studies infinitesimal deformations of Drinfeld modules with level structure.
Author : Owen Biesel
Publisher : American Mathematical Society
Page : 104 pages
File Size : 19,78 MB
Release : 2023-05-23
Category : Mathematics
ISBN : 1470463105
View the abstract.
Author : Francesco Scattone
Publisher : American Mathematical Soc.
Page : 101 pages
File Size : 46,23 MB
Release : 1987
Category : Mathematics
ISBN : 0821824376
This paper is concerned with the problem of describing compact moduli spaces for algebraic [italic]K3 surfaces of given degree 2[italic]k.
Author : Mattia Francesco Galeotti
Publisher :
Page : 0 pages
File Size : 15,68 MB
Release : 2017
Category :
ISBN :
The moduli space Mgbar of genus g stable curves is a central object in algebraic geometry. From the point of view of birational geometry, it is natural to ask if Mgbar is of general type. Harris-Mumford and Eisenbud-Harris found that Mgbar is of general type for genus g>=24 and g=22. The case g=23 keep being mysterious. In the last decade, in an attempt to clarify this, a new approach emerged: the idea is to consider finite covers of Mgbar that are moduli spaces of stable curves equipped with additional structure as l-covers (l-th roots of the trivial bundle) or l-spin bundles (l-th roots of the canonical bundle). These spaces have the property that the transition to general type happens to a lower genus. In this work we intend to generalize this approach in two ways: - a study of moduli space of curves with any root of any power of the canonical bundle; - a study of the moduli space of curves with G-covers for any finite group G. In order to define these moduli spaces we use the notion of twisted curve (see Abramovich-Corti-Vistoli). The fundamental result obtained is that it is possible to describe the singular locus of these moduli spaces via the notion of dual graph of a curve. Thanks to this analysis, we are able to develop calculations on the tautological rings of the spaces, and in particular we conjecture that the moduli space of curves with S3-covers is of general type for odd genus g>=13.
Author : Jens Thomas Alexander Lang
Publisher : Herbert Utz Verlag
Page : 152 pages
File Size : 29,37 MB
Release : 2001
Category :
ISBN : 9783896758941
Author : Pablo Solis
Publisher :
Page : 80 pages
File Size : 33,86 MB
Release : 2014
Category :
ISBN :
Moduli problems have become a central area of interest in a wide range of mathematical fields such as representation theory and topology but particularly in the geometries (differential, complex, symplectic, algebraic). In addition, studying moduli problems often requires utilizing tools from other mathematical fields and creates unexpected bridges within mathematics and between mathematics and other fields. A notable example came in 1991 when the mathematical physicists Edward Witten made a conjecture connecting the partition function for quantum gravity in two dimensions with numbers associated to the cohomology of the moduli space of stable curves, a space that was already of independent interest to algebraic geometers. We study a related moduli problem MG of principal G-bundle on stable curves for G a simple algebraic group. A defect of MG over singular curves is that it is not compact and thus more difficult to study. We focus specifically on nodal singularities and examine how to compactify MG over nodal curves. The approach we present relies on two main mathematical objects: the loop group and the wonderful compactification of a semisimple adjoint group. For an algebraic group G the loop group LG is the group of maps Dx → G where x is a punctured formal disk, see 2.2 for a precise definition. The connection between LG and MG is that G-bundles can be described by transition functions and roughly speaking any such transition function comes from an element of LG. The wonderful compactification is a particularly nice way of comapactifying a semi simple group. Then in a sentence, the aim this dissertation is to (1) extend the construction of the wonderful compactification for semi simple group to LG and (2) use this compactification to compactify MG over nodal curves. We give a brief introduction in Chapter 1. Chapter 2 addresses (1) and Chapter 3 addresses (2). We begin in Chapter 2 with a discussion of the classical wonderful compactification of an adjoint group given by De Concini and Procesi in [DCP83]. Because the group LG is infinite dimensional many of the elements in De Concini and Procesi's construction do not immediately extend or have more than one possible generalization. The technical heart of the paper is developing the appropriate analogs of all the elements needed to make the construction possible for LG. Also building on work of Brion and Kumar we give an enhancement of the compactificaiton from schemes to stacks that we utilize in Chapter 3. Chapter 3 returns to the problem of compactifying MG over nodal curves. We begin by carefully studying the points in the boundary of the compactification of LG and relating them to moduli problems over nodal curves. The moduli problems that appear in this way are closely related to flag varieties for the loop group and can be identified as moduli of torsors for a particular group scheme determined by parabolic subgroups of the loop group. We go on to show that the moduli problem of torsors on nodal curves is isomorphic to a moduli problem of G-bundles on twisted nodal curve; these are orbifolds that are isomorphic to the original nodal curve on the smooth locus. Finally, building on related work of Kausz [Kau00,Kau05a] and Thaddeus and Martens [MaT] and the results of Chapter 2 we introduce a larger moduli problem XG of G bundles on twisted curves which compactifies MG.
Author : Jan Arthur Christophersen
Publisher : Springer
Page : 326 pages
File Size : 19,93 MB
Release : 2018-11-24
Category : Mathematics
ISBN : 3319948814
The proceedings from the Abel Symposium on Geometry of Moduli, held at Svinøya Rorbuer, Svolvær in Lofoten, in August 2017, present both survey and research articles on the recent surge of developments in understanding moduli problems in algebraic geometry. Written by many of the main contributors to this evolving subject, the book provides a comprehensive collection of new methods and the various directions in which moduli theory is advancing. These include the geometry of moduli spaces, non-reductive geometric invariant theory, birational geometry, enumerative geometry, hyper-kähler geometry, syzygies of curves and Brill-Noether theory and stability conditions. Moduli theory is ubiquitous in algebraic geometry, and this is reflected in the list of moduli spaces addressed in this volume: sheaves on varieties, symmetric tensors, abelian differentials, (log) Calabi-Yau varieties, points on schemes, rational varieties, curves, abelian varieties and hyper-Kähler manifolds.