On the Colength of Fractional Ideals
E. M. N. de Guzmán and A. Hefez
Journal of Singularities
volume 21 (2020), 119-131
Received: 25 April 2018. Received in revised form: 13 March 2019.
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Abstract:
The main goal of this paper is to give a recursive formula for the colength of a fractional ideal in terms of some maximal points of its value set and of its projections. The fractional ideals are relative to a class of rings called admissible, a more general class of one dimensional local rings that contains those of algebroid curves. For fractional ideals of such rings with two or three minimal primes, a closed formula for the colength is provided.
2010 Mathematical Subject Classification:
13H10, 14H20
Key words and phrases:
Admissible rings, Algebroid curves, Fractional ideals, Value sets of ideals, Colength of ideals
Author(s) information:
| E. M. N. de Guzmán | A. Hefez |
| Departamento de Matemática Aplicada | Departamento de Matemática Aplicada |
| Universidade Federal Fluminense | Universidade Federal Fluminense |
| Brazil | Brazil |
| email: e.marcavillaca@gmail.com | email: ahefez@id.uff.br |
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