Add to ORKGABSTRACT. Wc compute te global multiplicity of a 1-dimensional foliation along an integral curve iii projective spaces. Wc give a bound in the way of Poin-caré problem for complete intersection curves. In te projective plane, this bound give us a bound of te degree of non irreductible integral Curves in function of te degree of the foliation. O
The present work discusses a study of extactic curves in the projective plane, providing a method th...
Given a foliation F in an algebraic surface having a rational first integral a genus formula for the...
Fix integers $r,d,s,\pi$ with $r\geq 4$, $d\gg s$, $r-1\leq s \leq 2r-4$, and $\pi\geq 0$. Refining...
We give a characterization theorem for non-degenerate plane foliations of degree different from 1 ha...
AbstractWe give an algorithm to decide whether an algebraic plane foliation F has a rational first i...
none3siUsing the Stückrad-Vogel self-intersection cycle of an irreducible and reduced curve in proje...
International audienceWe develop a study on local polar invariants of planar complex analytic foliat...
We consider the question of relating extrinsic geometric characters of a smooth irreducible complex ...
Let ${\mathcal F}$ be a germ of holomorphic foliation defined in a neighborhood of the origin of ${\...
We solve the Poincaré problem for plane foliations with only one dicritical divisor. Moreover, in th...
Given any s points P1,\u2026, Ps in the projective plane and s positive integers m1,\u2026, ms, let ...
The present work discusses a study of extactic curves in the projective plane, providing a method t...
textThis work is composed of two independent parts, both addressing problems related to algebraic c...
Let &$F{M) c 0>(.R + —0) denote the projectivized space of measured foliations on a compact s...
AbstractGiven any s points P1,…, Ps in P2 and s positive integers m1,…, ms, let Sn be the linear sys...
The present work discusses a study of extactic curves in the projective plane, providing a method th...
Given a foliation F in an algebraic surface having a rational first integral a genus formula for the...
Fix integers $r,d,s,\pi$ with $r\geq 4$, $d\gg s$, $r-1\leq s \leq 2r-4$, and $\pi\geq 0$. Refining...
We give a characterization theorem for non-degenerate plane foliations of degree different from 1 ha...
AbstractWe give an algorithm to decide whether an algebraic plane foliation F has a rational first i...
none3siUsing the Stückrad-Vogel self-intersection cycle of an irreducible and reduced curve in proje...
International audienceWe develop a study on local polar invariants of planar complex analytic foliat...
We consider the question of relating extrinsic geometric characters of a smooth irreducible complex ...
Let ${\mathcal F}$ be a germ of holomorphic foliation defined in a neighborhood of the origin of ${\...
We solve the Poincaré problem for plane foliations with only one dicritical divisor. Moreover, in th...
Given any s points P1,\u2026, Ps in the projective plane and s positive integers m1,\u2026, ms, let ...
The present work discusses a study of extactic curves in the projective plane, providing a method t...
textThis work is composed of two independent parts, both addressing problems related to algebraic c...
Let &$F{M) c 0>(.R + —0) denote the projectivized space of measured foliations on a compact s...
AbstractGiven any s points P1,…, Ps in P2 and s positive integers m1,…, ms, let Sn be the linear sys...
The present work discusses a study of extactic curves in the projective plane, providing a method th...
Given a foliation F in an algebraic surface having a rational first integral a genus formula for the...
Fix integers $r,d,s,\pi$ with $r\geq 4$, $d\gg s$, $r-1\leq s \leq 2r-4$, and $\pi\geq 0$. Refining...