Ordinary Singularities of Algebraic Curves
- 1 December 1981
- journal article
- Published by Canadian Mathematical Society in Canadian Mathematical Bulletin
- Vol. 24 (4) , 423-431
- https://doi.org/10.4153/cmb-1981-065-6
Abstract
Let A be the local ring at a singular point p of an algebraic reduced curve. Let M (resp. Ml,..., Mh) be the maximal ideal of A (resp. of Ā). In this paper we want to classify ordinary singularities p with reduced tangent cone: Spec(G(A)). We prove that G(A) is reduced if and only if: p is an ordinary singularity, and the vector spaces span the vector space . If the points of the projectivized tangent cone Proj(G(A)) are in generic position then p is an ordinary singularity if and only if G(A) is reduced. We give an example which shows that the preceding equivalence is not true in general.Keywords
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