Introduction to moduli problems and orbit spaces
著者
書誌事項
Introduction to moduli problems and orbit spaces
(Tata Institute of Fundamental Research lectures on mathematics, 51)
Tata Institute of Fundamental Research , Narosa Publishing House, 2012, c1978
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注記
"International distribution by American Mathematical Society" -- T.p
"Copyright c1978, Tata Institute of Fundamental Research, reprint 2012" -- T.p. verso
Series title from publisher's listing
Includes bibliographical references and index
内容説明・目次
内容説明
Geometric Invariant Theory (GIT), developed in the 1960s by David Mumford, is the theory of quotients by group actions in Algebraic Geometry. Its principal application is to the construction of various moduli spaces. Peter Newstead gave a series of lectures in 1975 at the Tata Institute of Fundamental Research, Mumbai on GIT and its application to the moduli of vector bundles on curves. It was a masterful yet easy to follow exposition of important material, with clear proofs and many examples. The notes, published as a volume in the TIFR lecture notes series, became a classic, and generations of algebraic geometers working in these subjects got their basic introduction to this area through these lecture notes. Though continuously in demand, these lecture notes have been out of print for many years. The Tata Institute is happy to re-issue these notes in a new print.
目次
Preliminaries / The Concept of Moduli: Families / Moduli Spaces / Remarks / Endomorphisms of Vector Spaces: Families of Endomorphisms / Semi-Simple Endomorphisms / Cyclic Endomorphisms / Moduli and Quotients / Quotients: Actions of Algebraic Groups / Proof of Theorem / Affine Quotients / Linearisation / Historical Note / Examples: Elementary Examples / A Criterion for Stability / Binary Forms / Plane Cubics / N Ordered Points on a Line / Sequences of Linear Subspaces / Vector Bundles Over a Curve: Generalities and Historical Remarks / Coherent Sheaves Over X / Locally Universal Families for Semi-stable Bundles / Construction of the Quotient / Existence of a Fine Moduli Space / Proof of Theorem / Bundles Over a Singular Curve / Bibliography / List of Symbols / Index.
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