Add to ORKGInterpolation is a property of vector bundles on curves closely related to slope stability. The notion is motivated by the deformation theory of curves in projective space incident to given fixed subvarieties. If the normal bundle of a projective curve satisfies interpolation, then curves in the same component of the Hilbert scheme exhibit normal behavior with respect to incident problems. We demonstrate how to use degeneration arguments to deduce interpolation. In particular, we show that a general connected space curve of degree d and genus g satisfies interpolation for d >= g+3 unless d = 5 and g = 2. As a second application, we show that a general elliptic curve of degree d in P^n satisfies a slightly weaker notion when d >= 7, d >= n+...
Interpolation is an ubiquitous technique arising in Mathematics, specially in Numerical Analysis. Th...
We discuss possible algorithms for interpolating data given in a set of curves and/or points in a su...
We discuss possible algorithms for interpolating data given in a set of curves and/or points in a su...
On a general hypersurface of degree $d\leq n$ in $\mathbb P^n$ or $\mathbb P^n$ itself, we prove the...
summary:This paper deals with the constructions of interpolation curves which pass through given sup...
summary:This paper deals with the constructions of interpolation curves which pass through given sup...
1. GENERALITIES- Deformation theory is closely related to the problem of classification in algebraic...
Let Y be a smooth projective curve degenerating to a reducible curve X with two components meeting t...
: Five points in general position in IR 2 always lie on a unique conic, and three points plus two ...
We show that on a generic curve, a bundle obtained by successive extensions is stable. We compute th...
Moduli stacks of vector bundles on curves and the King–Schofield rationality proof.Let C be a connec...
Department Head: Gerhard Dangelmayr.2010 Spring.Includes bibliographical references (pages 67-68).Th...
interpolants to plane and space curves can be of degree up to 5, depending on the situation. We give...
Hermite interpolation by bivariate algebraic polynomials and its applications to some problems of th...
In this paper we determine the number of general points through which a Brill--Noether curve of fixe...
Interpolation is an ubiquitous technique arising in Mathematics, specially in Numerical Analysis. Th...
We discuss possible algorithms for interpolating data given in a set of curves and/or points in a su...
We discuss possible algorithms for interpolating data given in a set of curves and/or points in a su...
On a general hypersurface of degree $d\leq n$ in $\mathbb P^n$ or $\mathbb P^n$ itself, we prove the...
summary:This paper deals with the constructions of interpolation curves which pass through given sup...
summary:This paper deals with the constructions of interpolation curves which pass through given sup...
1. GENERALITIES- Deformation theory is closely related to the problem of classification in algebraic...
Let Y be a smooth projective curve degenerating to a reducible curve X with two components meeting t...
: Five points in general position in IR 2 always lie on a unique conic, and three points plus two ...
We show that on a generic curve, a bundle obtained by successive extensions is stable. We compute th...
Moduli stacks of vector bundles on curves and the King–Schofield rationality proof.Let C be a connec...
Department Head: Gerhard Dangelmayr.2010 Spring.Includes bibliographical references (pages 67-68).Th...
interpolants to plane and space curves can be of degree up to 5, depending on the situation. We give...
Hermite interpolation by bivariate algebraic polynomials and its applications to some problems of th...
In this paper we determine the number of general points through which a Brill--Noether curve of fixe...
Interpolation is an ubiquitous technique arising in Mathematics, specially in Numerical Analysis. Th...
We discuss possible algorithms for interpolating data given in a set of curves and/or points in a su...
We discuss possible algorithms for interpolating data given in a set of curves and/or points in a su...