Lipman, Joseph.

Topological invariants of quasi-ordinary singularities / [electronic resource] Joseph Lipman. Embedded topological classification of quasi-ordinary singularities / Yih-Nan Gau ; with an appendix by Joseph Lipman. - Providence, R.I., USA : American Mathematical Society, c1988. - 1 online resource (iv, 129 p.) - Memoirs of the American Mathematical Society, v. 388 0065-9266 (print); 1947-6221 (online); . - Memoirs of the American Mathematical Society ; no. 388. .

"Volume 74, number 388."

Includes bibliographies.

Topological invariants of quasi-ordinary singularities (by Joseph Lipman) Introduction Part I. Rational equivalence and local homology in codimension one 1. Local fundamental class map 2. Codimension one cycles at quotient singularities 3. Quasi-ordinary singularities 4. Presentation of the group $A_ \cong H_$ Part II. The hypersurface case 5. Characteristics monomials of quasi-ordinary parametrizations 6. Topological invariance of the reduced branching sequence 7. Appendix: The singular locus Embedded topological classification of quasi-ordinary singularities (by Yih-Nan Gau) Introduction 1. Statement of main results 2. Some plane sections of $X$ and two key lemmas 3. Topological invariants 4. Proof of the main theorem Appendix (by J. Lipman)

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Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012


Mode of access : World Wide Web

9781470408084 (online)


Singularities (Mathematics)
Analytic spaces.
Knot theory.

QA3 QA614.58 / .A57 no. 388

510 s 514/.224
The Institute of Mathematical Sciences, Chennai, India

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