Inverse system of a symbolic power. II: The Waring problem for forms
From MaRDI portal
Publication:1895604
DOI10.1006/jabr.1995.1169zbMath0842.11016OpenAlexW2061162799MaRDI QIDQ1895604
Publication date: 25 July 1996
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1006/jabr.1995.1169
Hilbert functionMacaulay inverse systemclassical Waring problem for formsscheme lengthsmoothable length
Forms of degree higher than two (11E76) Waring's problem and variants (11P05) Hilbert-Samuel and Hilbert-Kunz functions; Poincaré series (13D40) Relevant commutative algebra (14A05)
Related Items (19)
New methods for determining speciality of linear systems based at fat points in \(\mathbb P^n\) ⋮ High-rank ternary forms of even degree ⋮ Inverse systems of zero-dimensional schemes in \(\mathbb P^n\) ⋮ On the rank of a symmetric form ⋮ On polynomials with given Hilbert function and applications ⋮ Waring problems and the Lefschetz properties ⋮ Canonical curves with low apolarity ⋮ On the Waring problem for polynomial rings ⋮ Fat points of \({\mathbb{P}}^n\) whose support is contained in a linear proper subspace. ⋮ On a decomposition of polynomials in several variables ⋮ On the postulation of \(s^d\) fat points in \(\mathbb P^d\) ⋮ Base loci of linear systems and the Waring problem ⋮ Canonical curves and varieties of sums of powers of cubic polynomials. ⋮ Partially Symmetric Variants of Comon's Problem Via Simultaneous Rank ⋮ Géométrie des points épais ⋮ Higher infinitesimal neighbourhoods ⋮ All secant varieties of the Chow variety are nondefective for cubics and quaternary forms ⋮ Singularities of linear systems and the Waring problem ⋮ Waring and cactus ranks and strong Lefschetz property for annihilators of symmetric forms
This page was built for publication: Inverse system of a symbolic power. II: The Waring problem for forms
