The paper is concerned with some properties of linear series on smooth plane curves; in fact, we study mainly the case of cubic curves. The main result describes the growth of the dimension of non complete linear series, generalizing to cubics a well known result of Gieseker, about linear series on the projective lines
ABSTRACT. For a smooth projective curve, the cycles of e-secant k-planes are among the most studied ...
We study linear series on curves inducing injective morphisms to projective space, using zero-dimens...
A conic section is a plane quadratic curve, that is, the graph of an equation of the form ax² + bxy ...
The paper is concerned with some properties of linear series on smooth plane curves; in fact, we stu...
We first prove a generalized Brill-Noether theorem for linear series with prescribed multiv...
A linear series g^N on a curve C in P3 is primary when it does not contain the series cut by plane...
In this paper we relate primitive linear series on a smooth plane curve C with the following propert...
Using tools from Tropical and Non-Archimedean Geometry, we show that there is a tight relationship b...
Our central objects of study are nonsingular curves, which were classically stud-ied via linear seri...
A degeneration of curves gives rise to an interesting relation between linear systems on curves and ...
Abstract. The classical Castelnuovo numbers count linear series of minimal degree and fixed di-mensi...
We develop a new technique for studying ranks of multiplication maps for linear series via limit lin...
We introduce a notion of limit linear series for nodal curves which are not of compact type...
Abstract. We discuss linear series on tropical curves and their relation to classical algebraic geom...
We show how the postulation of the nodel of a plane curve C determines the Geometry of some special ...
ABSTRACT. For a smooth projective curve, the cycles of e-secant k-planes are among the most studied ...
We study linear series on curves inducing injective morphisms to projective space, using zero-dimens...
A conic section is a plane quadratic curve, that is, the graph of an equation of the form ax² + bxy ...
The paper is concerned with some properties of linear series on smooth plane curves; in fact, we stu...
We first prove a generalized Brill-Noether theorem for linear series with prescribed multiv...
A linear series g^N on a curve C in P3 is primary when it does not contain the series cut by plane...
In this paper we relate primitive linear series on a smooth plane curve C with the following propert...
Using tools from Tropical and Non-Archimedean Geometry, we show that there is a tight relationship b...
Our central objects of study are nonsingular curves, which were classically stud-ied via linear seri...
A degeneration of curves gives rise to an interesting relation between linear systems on curves and ...
Abstract. The classical Castelnuovo numbers count linear series of minimal degree and fixed di-mensi...
We develop a new technique for studying ranks of multiplication maps for linear series via limit lin...
We introduce a notion of limit linear series for nodal curves which are not of compact type...
Abstract. We discuss linear series on tropical curves and their relation to classical algebraic geom...
We show how the postulation of the nodel of a plane curve C determines the Geometry of some special ...
ABSTRACT. For a smooth projective curve, the cycles of e-secant k-planes are among the most studied ...
We study linear series on curves inducing injective morphisms to projective space, using zero-dimens...
A conic section is a plane quadratic curve, that is, the graph of an equation of the form ax² + bxy ...
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