Details
Original language | English |
---|---|
Pages (from-to) | 895-905 |
Number of pages | 11 |
Journal | INT J MATH |
Volume | 15 |
Issue number | 9 |
Publication status | Published - Nov 2004 |
Abstract
Keywords
- 1-forms, De Rham complex, Homological index, Index, Isolated singularity, Milnor number, Radial index
ASJC Scopus subject areas
- Mathematics(all)
- General Mathematics
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In: INT J MATH, Vol. 15, No. 9, 11.2004, p. 895-905.
Research output: Contribution to journal › Article › Research › peer review
}
TY - JOUR
T1 - Homological index for 1-forms and a Milnor number for isolated singularities
AU - Ebeling, Wolfgang
AU - Gusein-Zade, Sabir M.
AU - Seade, José
N1 - Funding information: The research was partially supported by the DFG programme “Global methods in complex geometry” (Eb 102/4–2). The second author also was partially supported by the grants RFBR–04–01–00762, INTAS–00–259; the third author had partial support by CONACYT grant G36357/E.
PY - 2004/11
Y1 - 2004/11
N2 - We introduce a notion of a homological index of a holomorphic 1-form on a germ of a complex analytic variety with an isolated singularity, inspired by Gómez-Mont and Greuel. For isolated complete intersection singularities it coincides with the index defined earlier by two of the authors. Subtracting from this index another one, called radial, we get an invariant of the singularity which does not depend on the 1-form. For isolated complete intersection singularities this invariant coincides with the Milnor number. We compute this invariant for arbitrary curve singularities and compare it with the Milnor number introduced by Buchweitz and Greuel for such singularities.
AB - We introduce a notion of a homological index of a holomorphic 1-form on a germ of a complex analytic variety with an isolated singularity, inspired by Gómez-Mont and Greuel. For isolated complete intersection singularities it coincides with the index defined earlier by two of the authors. Subtracting from this index another one, called radial, we get an invariant of the singularity which does not depend on the 1-form. For isolated complete intersection singularities this invariant coincides with the Milnor number. We compute this invariant for arbitrary curve singularities and compare it with the Milnor number introduced by Buchweitz and Greuel for such singularities.
KW - 1-forms
KW - De Rham complex
KW - Homological index
KW - Index
KW - Isolated singularity
KW - Milnor number
KW - Radial index
UR - http://www.scopus.com/inward/record.url?scp=11244354931&partnerID=8YFLogxK
UR - https://arxiv.org/abs/math/0307239
U2 - 10.1142/S0129167X04002624
DO - 10.1142/S0129167X04002624
M3 - Article
AN - SCOPUS:11244354931
VL - 15
SP - 895
EP - 905
JO - INT J MATH
JF - INT J MATH
SN - 0129-167X
IS - 9
ER -