Cristiano Bocci scite author profile

Abstract. We develop tools to study the problem of containment of symbolic powers I (m) in powers I r for a homogeneous ideal I in a polynomial ring k[P N ] in N + 1 variables over an arbitrary algebraically closed field k. We obtain results on the structure of the set of pairs (r, m) such that I (m) ⊆ I r . As corollaries, we show that I 2 contains I (3) whenever S is a finite generic set of points in P 2 (thereby giving a partial answer to a question of Huneke), and we show that the containment theorems of [ELS] and [HH1] are optimal for every fixed dimension and codimension.

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The resurgence of ideals of points and the containment problem

Bocci

Harbourne

2009

Proc. Amer. Math. Soc.

131

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Abstract. We relate properties of linear systems on X to the question of when I r contains I (m) in the case that I is the homogeneous ideal of a finite set of distinct points p 1 , . . . , p n ∈ P 2 , where X is the surface obtained by blowing up the points. We obtain complete answers for when I r contains I (m) when the points p i lie on a smooth conic or when the points are general and n ≤ 9.

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Refined methods for the identifiability of tensors

Bocci

Chiantini

Ottaviani

2013

Annali di Matematica

101

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Hadamard products of linear spaces

2016

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Containment results for ideals of various configurations of points in

Bocci

Cooper

Harbourne

2014

Journal of Pure and Applied Algebra

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Guided by evidence coming from a few key examples and attempting to unify previous work of Chudnovsky, Esnault-Viehweg, Eisenbud-Mazur, Ein-Lazarsfeld-Smith, Hochster-Huneke and Bocci-Harbourne, Harbourne and Huneke recently formulated a series of conjectures that relate symbolic and regular powers of ideals of fat points in P N . In this paper we propose another conjecture along the same lines (Conjecture 3.9), and we verify it and the conjectures of Harbourne and Huneke for a variety of configurations of points.

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Cristiano Bocci

Comparing powers and symbolic powers of ideals

The resurgence of ideals of points and the containment problem

Refined methods for the identifiability of tensors

Hadamard products of linear spaces

Containment results for ideals of various configurations of points in

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