arXiv:1005.0980 Abstract | arXiv Analytics

arXiv:1005.0980 [math.AG]Abstract References Reviews Resources

Number of singular points of an annulus in $\mathbb{C}^2$

Published 2010-05-06Version 1

Using Bogomolov-Miyaoka-Yau inequality and a Milnor number bound we prove that any algebraic annulus $\mathbb{C}^*$ in $\mathbb{C}^2$ with no self-intersections can have at most three cuspidal singularities.

Comments: 15 pages, to appear in Ann. Inst. Fourier

Categories: math.AG

Subjects: 14H50, 14R10, 14B05

Keywords: singular points, milnor number bound, bogomolov-miyaoka-yau inequality, algebraic annulus

Related articles: Most relevant | Search more

arXiv:1906.11214 [math.AG] (Published 2019-06-26)

Singular Points of High Multiplicity for Septic Curves

Nicholas J. Willis, David A. Weinberg

arXiv:0908.4500 [math.AG] (Published 2009-08-31)

Number of singular points of a genus $g$ curve with one point at infinity

Maciej Borodzik

arXiv:0707.0241 [math.AG] (Published 2007-07-02)

Singular points of real quartic curves via computer algebra

David A. Weinberg, Nicholas J. Willis

arXiv Analytics

arXiv:1005.0980 [math.AG]Abstract References Reviews Resources

Number of singular points of an annulus in $\mathbb{C}^2$

Links

Toolbox

arXiv:1005.0980 [math.AG]AbstractReferencesReviewsResources

Number of singular points of an annulus in $\mathbb{C}^2$

Links

Toolbox

arXiv:1005.0980 [math.AG]Abstract References Reviews Resources