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Lê Cycles and Milnor Classes of Compact Hypersurfaces
(2012)
We determine the relation amongst the global Lê cycles and the Milnor classes of analytic hypersurfaces defined by a section of a very ample line bundle over a compact complex manifold. The key point is finding appropriate ...
Lê cycles and Milnor classes
(2013-01-18)
The purpose of this work is to establish a link between the theory of Chern classes for singular varieties and the geometry of the varieties in question. Namely, we show that if Z is a hypersurface in a compact complex ...
Lê cycles and Milnor classes
(2013-01-18)
The purpose of this work is to establish a link between the theory of Chern classes for singular varieties and the geometry of the varieties in question. Namely, we show that if Z is a hypersurface in a compact complex ...
On the Milnor fibre and L numbers of semi-weighted homogeneous arrangements
(Springer, 2012-12-01)
Inthispaperwestudygermsofpolynomialsformedbytheproductofsemi-weighted homogeneous polynomials of the same type, which we call semi-weighted homogeneous arrangements. It is shown how the L numbers of such polynomials are ...
A formula relating inflections, bitangencies and the Milnor number of a plane curve
(American Mathematical Society - AMSProvidence, 2014-07)
In this article we obtain a formula relating inflections, bitangencies and the Milnor number of a plane curve germ. Moreover, we present an extension of the formula obtained by the first author and Luis Fernando Mello for ...
Lê cycles and Milnor classes
(2014)
On the Milnor fibre and L numbers of semi-weighted homogeneous arrangements
(SPRINGERNEW YORK, 2012)
Inthispaperwestudygermsofpolynomialsformedbytheproductofsemi-weighted homogeneous polynomials of the same type, which we call semi-weighted homogeneous arrangements. It is shown how the L numbers of such polynomials are ...
On the Milnor fibre and L numbers of semi-weighted homogeneous arrangements
(Springer, 2012-12-01)
Inthispaperwestudygermsofpolynomialsformedbytheproductofsemi-weighted homogeneous polynomials of the same type, which we call semi-weighted homogeneous arrangements. It is shown how the L numbers of such polynomials are ...