Hilbert schemes of zero-dimensional subschemes of smooth varieties / Lothar Göttsche.

Author
Göttsche, Lothar, 1961- [Browse]
Format
Book
Language
English
Published/​Created
Berlin ; New York : Springer-Verlag, 1994.
Description
viii, 196 pages : illustrations ; 24 cm.

Availability

Copies in the Library

Location Call Number Status Location Service Notes
Lewis Library - Stacks QA3 .L28 no.1572 Browse related items Request

    Details

    Subject(s)
    Series
    • Lecture notes in mathematics (Springer-Verlag) ; 1572. [More in this series]
    • Lecture notes in mathematics ; 1572
    Bibliographic references
    Includes bibliographical references and index.
    Contents
    • 1. Fundamental facts. 1.1. The Hilbert scheme. 1.2. The Weil conjectures. 1.3. The punctual Hilbert scheme
    • 2. Computation of the Betti numbers of Hilbert schemes. 2.1. The local structure of [actual symbol not reproducible]. 2.2. A cell decomposition of [actual symbol not reproducible]. 2.3. Computation of the Betti numbers of S[superscript [n]] for a smooth surface S. 2.4. The Betti numbers of higher order Kummer varieties. 2.5. The Betti numbers of varieties of triangles
    • 3. The varieties of second and higher order data. 3.1. The varieties of second order data. 3.2. Varieties of higher order data and applications. 3.3. Semple bundles and the formula for contacts with lines
    • 4. The Chow ring of relative Hilbert schemes of projective bundles. 4.1. n-very ampleness, embeddings of the Hilbert scheme and the structure of Al[superscript n](P(E)). 4.2. Computation of the Chow ring of [actual symbol not reproducible]. 4.3. The Chow ring of [actual symbol not reproducible].
    Other format(s)
    Also available in an electronic version.
    ISBN
    • 3540578145 ((Berlin ; : acid-free paper))
    • 9783540578147 ((Berlin ; : acid-free paper))
    • 0387578145 ((New York ; : acid-free paper))
    • 9780387578149 ((New York ; : acid-free paper))
    LCCN
    94003189
    OCLC
    29843508
    Statement on language in description
    Princeton University Library aims to describe library materials in a manner that is respectful to the individuals and communities who create, use, and are represented in the collections we manage. Read more...
    Other views
    Staff view