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The geometry of moduli spaces of sheaves / Daniel Huybrechts and Manfred Lehn.

By: Huybrechts, Daniel.
Contributor(s): Lehn, Manfred.
Material type: TextTextSeries: Cambridge mathematical library: Publisher: Cambridge : Cambridge University Press, c2010Edition: 2nd ed.Description: xviii, 325 p., UKP 31.99 23 cm.ISBN: 9780521134200 (pbk.) :; 052113420X (pbk.) :.Subject(s): Sheaf theory | Moduli theory | Surfaces, AlgebraicDDC classification: 514.224 Summary: "Now back in print, this highly regarded book has been updated to reflect recent advances in the theory of semistable coherent sheaves and their moduli spaces, which include moduli spaces in positive characteristic, moduli spaces of principal bundles and of complexes, Hilbert schemes of points on surfaces, derived categories of coherent sheaves, and moduli spaces of sheaves on Calabi-Yau threefolds. The authors review changes in the field since the publication of the original edition in 1997 and point the reader towards further literature. References have been brought up to date and errors removed. Developed from the authors' lectures, this book is ideal as a text for graduate students as well as a valuable resource for any mathematician with a background in algebraic geometry who wants to learn more about Grothendieck's approach"--Provided by publisher.
Item type Current location Call number Status Date due Barcode Item holds
Book Chennai Mathematical Institute
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514.224 HUY (Browse shelf) Long Overdue (Lost) 8826
Total holds: 0

Formerly CIP. Uk

Includes bibliographical references and index.

"Now back in print, this highly regarded book has been updated to reflect recent advances in the theory of semistable coherent sheaves and their moduli spaces, which include moduli spaces in positive characteristic, moduli spaces of principal bundles and of complexes, Hilbert schemes of points on surfaces, derived categories of coherent sheaves, and moduli spaces of sheaves on Calabi-Yau threefolds. The authors review changes in the field since the publication of the original edition in 1997 and point the reader towards further literature. References have been brought up to date and errors removed. Developed from the authors' lectures, this book is ideal as a text for graduate students as well as a valuable resource for any mathematician with a background in algebraic geometry who wants to learn more about Grothendieck's approach"--Provided by publisher.