An algorithm is described which gives a base of the kernel of the Kodaira-Spencer map of the versal μ-constant deformation of certain plane curve singularities. This is useful for computing the moduli of such singularities
This dissertation considers the geometry of the locus of constant class in the deformation spaces of...
We describe the singular locus of the compactification of the moduli space Rg,` of curves of genus g...
The paper describes several invariants of plane curve singularities in terms of the data of associat...
An algorithm is described which gives a base of the kernel of the Kodaira-Spencer map of the versal ...
In this article we study infinitesimal deformations of toric hypersurfaces which arise if we vary $f...
We compute the singular points of a plane rational curve, parametrically given, using the implicitiz...
AbstractWe compute the singular points of a plane rational curve, parametrically given, using the im...
AbstractIn this article, an algorithm for explicit computation of moduli spaces for semiquasihomogen...
Moduli problems in algebraic geometry date back to Riemann's famous count of the 3g-3 parameters nee...
International audienceThe kernel method is an essential tool for the study of generating series of w...
AbstractWe present an algorithm which, given a deformation with section of a reduced plane curve sin...
We consider the parameter space ${\cal U}_d$ of smooth plane curves of degree $d$. The universal smo...
Given a singularity and a versal deformation of it, an arbitrary deformation can be induced from the...
Hauser’s algorithm provides an alternative approach to the computation of versaldeformations, not ba...
Hauser’s algorithm provides an alternative approach to the computation of versal deformations, not b...
This dissertation considers the geometry of the locus of constant class in the deformation spaces of...
We describe the singular locus of the compactification of the moduli space Rg,` of curves of genus g...
The paper describes several invariants of plane curve singularities in terms of the data of associat...
An algorithm is described which gives a base of the kernel of the Kodaira-Spencer map of the versal ...
In this article we study infinitesimal deformations of toric hypersurfaces which arise if we vary $f...
We compute the singular points of a plane rational curve, parametrically given, using the implicitiz...
AbstractWe compute the singular points of a plane rational curve, parametrically given, using the im...
AbstractIn this article, an algorithm for explicit computation of moduli spaces for semiquasihomogen...
Moduli problems in algebraic geometry date back to Riemann's famous count of the 3g-3 parameters nee...
International audienceThe kernel method is an essential tool for the study of generating series of w...
AbstractWe present an algorithm which, given a deformation with section of a reduced plane curve sin...
We consider the parameter space ${\cal U}_d$ of smooth plane curves of degree $d$. The universal smo...
Given a singularity and a versal deformation of it, an arbitrary deformation can be induced from the...
Hauser’s algorithm provides an alternative approach to the computation of versaldeformations, not ba...
Hauser’s algorithm provides an alternative approach to the computation of versal deformations, not b...
This dissertation considers the geometry of the locus of constant class in the deformation spaces of...
We describe the singular locus of the compactification of the moduli space Rg,` of curves of genus g...
The paper describes several invariants of plane curve singularities in terms of the data of associat...