Deformation theory is closely related to moduli problem, that is the problem of classi-fying geometric objects. LetM be a class of geometric objects, for example, let M = {isomorphism classes of complex manifolds}, the moduli problem for this class is that of describingM, investigating ifM has som
Moduli spaces of geometric objects (e.g., vector bundles, algebraic curves, etc.) have played centra...
ABSTRACT: Roughly speaking, the moduli space of higher spin curves parametrizes equivalence classes ...
After establishing a correspondence between a smooth moduli space of vector bundles on a curve and a...
The first instances of deformation theory were given by Kodaira and Spencer for complex structures a...
Moduli problems in algebraic geometry date back to Riemann's famous count of the 3g-3 parameters nee...
1. GENERALITIES- Deformation theory is closely related to the problem of classification in algebraic...
This book aims to study several aspects of moduli theory from a complex analytic point of view. Chap...
Abstract. These are the lecture notes to the author’s course “A relative version of Geometric Invari...
summary:First three sections of this overview paper cover classical topics of deformation theory of ...
Color poster with text, images, and formulas.Associative algebras arise both in physics and mathemat...
These lectures review some aspects of the theory of moduli spaces which have recently become importa...
Softcover, 208 S.: 24,00 €Softcover, 17x24Moduli Theory is one of those areas of Mathematics that ha...
Intersection theory on moduli spaces has lead to immense progress in certain areas of enumerative ge...
A comprehensive treaty devoted to the foundations of the theory of moduli of algebraic curves. The m...
We classify principal bundles on a compact Riemann surface. A moduli space for semistable principal ...
Moduli spaces of geometric objects (e.g., vector bundles, algebraic curves, etc.) have played centra...
ABSTRACT: Roughly speaking, the moduli space of higher spin curves parametrizes equivalence classes ...
After establishing a correspondence between a smooth moduli space of vector bundles on a curve and a...
The first instances of deformation theory were given by Kodaira and Spencer for complex structures a...
Moduli problems in algebraic geometry date back to Riemann's famous count of the 3g-3 parameters nee...
1. GENERALITIES- Deformation theory is closely related to the problem of classification in algebraic...
This book aims to study several aspects of moduli theory from a complex analytic point of view. Chap...
Abstract. These are the lecture notes to the author’s course “A relative version of Geometric Invari...
summary:First three sections of this overview paper cover classical topics of deformation theory of ...
Color poster with text, images, and formulas.Associative algebras arise both in physics and mathemat...
These lectures review some aspects of the theory of moduli spaces which have recently become importa...
Softcover, 208 S.: 24,00 €Softcover, 17x24Moduli Theory is one of those areas of Mathematics that ha...
Intersection theory on moduli spaces has lead to immense progress in certain areas of enumerative ge...
A comprehensive treaty devoted to the foundations of the theory of moduli of algebraic curves. The m...
We classify principal bundles on a compact Riemann surface. A moduli space for semistable principal ...
Moduli spaces of geometric objects (e.g., vector bundles, algebraic curves, etc.) have played centra...
ABSTRACT: Roughly speaking, the moduli space of higher spin curves parametrizes equivalence classes ...
After establishing a correspondence between a smooth moduli space of vector bundles on a curve and a...