scientific article
From MaRDI portal
Publication:2711350
DOI10.1023/A:1002663915504zbMath1056.14016arXivmath/9902118OpenAlexW2132506848MaRDI QIDQ2711350
Publication date: 2001
Published in: Compositio Mathematica (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/9902118
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Vanishing theorems in algebraic geometry (14F17) Rational and birational maps (14E05) Syzygies, resolutions, complexes and commutative rings (13D02) Projective techniques in algebraic geometry (14N05)
Related Items (23)
A bound on the degree of schemes defined by quadratic equations ⋮ Special linear systems and syzygies ⋮ Cremona transformations and some related algebras ⋮ Asymptotic syzygies of secant varieties of curves ⋮ On special quadratic birational transformations whose base locus has dimension at most three ⋮ Special cubic Cremona transformations of \(\mathbb{P}^{6}\) and \(\mathbb{P}^{7}\) ⋮ On the normality of secant varieties ⋮ Trisecant flops, their associated \(K3\) surfaces and the rationality of some cubic fourfolds ⋮ Singularities and syzygies of secant varieties of nonsingular projective curves ⋮ Duality, Bridgeland wall-crossing and flips of secant varieties ⋮ On varieties of almost minimal degree. III: Tangent spaces and embedding scrolls ⋮ Some loci of rational cubic fourfolds ⋮ Regularity and normality of the secant variety to a projective curve ⋮ On varieties of almost minimal degree. I: Secant loci of rational normal scrolls ⋮ The moduli space of genus four even spin curves is rational ⋮ Graded mapping cone theorem, multisecants and syzygies ⋮ Moduli of reflexive sheaves on smooth projective 3-folds ⋮ On linear projections of quadratic varieties ⋮ Singularities of the secant variety ⋮ Special cubic birational transformations of projective spaces ⋮ On blowup of secant varieties of curves ⋮ Varieties with quadratic entry locus. I ⋮ Equations and syzygies of the first secant variety to a smooth curve
This page was built for publication:
