LaTeX, 37 pagesThis paper is a sequel to math.AG/0411110. Let P denote the projective space of degree d forms in n+1 variables. Let e denote an integer < d/2, and consider the subvariety X of forms which factor as L^{d-e} M^e for some linear forms L,M. In the language of our earlier paper, this is the Brill-Gordan locus associated to the partition (d-e,e). In this paper we calculate the Castelnuovo regularity of X precisely, and moreover show that X is r-normal for r at least 3. In the case of binary forms, we give a classical invariant-theoretic description of the defining equations of this locus in terms of covariants of d-ics. Modulo standard cohomological arguments, the proof crucially relies upon showing that certain 3j-symbols from th...
The Castelnuovo-Mumford regularity is one of the most important invariants in studying the minimal f...
We introduce an sl 2 -invariant family of polynomial vector fields with an irreducible nilpotent sin...
The Castelnuovo-Mumford regularity is one of the most important invariants in studying the minimal f...
This is a considerably expanded version of math.AG/0405236Combining a selection of tools from modern...
AbstractThe hypersurfaces of degree d in the projective space Pn correspond to points of PN, where N...
Let $ X$ be a smooth $ n$-dimensional projective subvariety of $ {mathbb{P}^r}(mathbb{C}),(r geq 3)$...
AbstractLet Mg,dr be the sublocus of Mg, whose points correspond to smooth curves possessing gdr. If...
summary:Finding the normal Birkhoff interpolation schemes where the interpolation space and the set ...
AbstractWe show that the ideal of an arrangement of d linear subspaces of projective space is d-regu...
Abstract. In the recent articles [EI] and [AI], it was conjectured that all rational GLn-invariant f...
Coincident root loci are subvarieties of SdC2 — the space of binary forms of degree d — labelled by ...
In this paper we study the topological propertiesof the following set : For a given partition (m1; :...
A form p on Rn (homogeneous n-variate polynomial) is called positive semidefinite (p.s.d.) if it is ...
We provide a bound on the Theta-regularity of an arbitrary reduced and irreducible curve embedded in...
Let (Formula presented.) be the vector space of forms of degree d ≥ 3 on ℂn, with n ≥ 2. The object ...
The Castelnuovo-Mumford regularity is one of the most important invariants in studying the minimal f...
We introduce an sl 2 -invariant family of polynomial vector fields with an irreducible nilpotent sin...
The Castelnuovo-Mumford regularity is one of the most important invariants in studying the minimal f...
This is a considerably expanded version of math.AG/0405236Combining a selection of tools from modern...
AbstractThe hypersurfaces of degree d in the projective space Pn correspond to points of PN, where N...
Let $ X$ be a smooth $ n$-dimensional projective subvariety of $ {mathbb{P}^r}(mathbb{C}),(r geq 3)$...
AbstractLet Mg,dr be the sublocus of Mg, whose points correspond to smooth curves possessing gdr. If...
summary:Finding the normal Birkhoff interpolation schemes where the interpolation space and the set ...
AbstractWe show that the ideal of an arrangement of d linear subspaces of projective space is d-regu...
Abstract. In the recent articles [EI] and [AI], it was conjectured that all rational GLn-invariant f...
Coincident root loci are subvarieties of SdC2 — the space of binary forms of degree d — labelled by ...
In this paper we study the topological propertiesof the following set : For a given partition (m1; :...
A form p on Rn (homogeneous n-variate polynomial) is called positive semidefinite (p.s.d.) if it is ...
We provide a bound on the Theta-regularity of an arbitrary reduced and irreducible curve embedded in...
Let (Formula presented.) be the vector space of forms of degree d ≥ 3 on ℂn, with n ≥ 2. The object ...
The Castelnuovo-Mumford regularity is one of the most important invariants in studying the minimal f...
We introduce an sl 2 -invariant family of polynomial vector fields with an irreducible nilpotent sin...
The Castelnuovo-Mumford regularity is one of the most important invariants in studying the minimal f...
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