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A study of singularities on rational curves via Syzygies / David Cox, Andrew R. Kustin, Claudia Polini, Bernd Ulrich.
| Author/creator | Cox, David A. |
| Format | Electronic |
| Publication Info | Providence, Rhode Island : American Mathematical Society, 2013. |
| Description | ix, 116 pages ; 25 cm. |
| Supplemental Content | Full text available from Ebook Central - Academic Complete |
| Supplemental Content | Full text available from Memoirs of the American Mathematical Society |
| Subjects |
| Series | Memoirs of the American Mathematical Society, 0065-9266 ; number 1045 |
| Contents | Introduction, terminology, and preliminary results -- The general lemma -- The triple lemma -- The BiProj lemma -- Singularities of multiplicity equal to degree divided by two -- The space of true triples of forms of degree d : the base point free locus, the birational locus, and the generic Hilbert-Burch matrix -- Decomposition of the space of true triples -- The Jacobian matrix and the ramification locus -- The conductor and the branches of a rational plane curve -- Rational place quartics : a stratification and the correspondence between the Hilbert-Burch matrices and the configuation of singularities. |
| General note | "March 2013, Volume 222, Number 1045 (fourth of 5 numbers)." |
| Bibliography note | Includes bibliographical references (pages 115-116) and index. |
| Access restriction | Available only to authorized users. |
| Technical details | Mode of access: World Wide Web |
| Genre/form | Electronic books. |
| LCCN | 2012043998 |
| ISBN | 9780821887431 (alk. paper) |
| ISBN | 0821887432 (alk. paper) |