Face numbers of sequentially Cohen–Macaulay complexes and Betti numbers of componentwise linear ideals

Karim Adiprasito; Anders Björner; Afshin Goodarzi

doi:10.4171/jems/755

Componentwise linear ideals with minimal or maximal Betti numbers

Arkiv för matematik ◽

10.1007/s11512-007-0046-9 ◽

2008 ◽

Vol 46 (1) ◽

pp. 69-75 ◽

Cited By ~ 3

Author(s):

Jürgen Herzog ◽

Takayuki Hibi ◽

Satoshi Murai ◽

Yukihide Takayama

Keyword(s):

Betti Numbers ◽

Componentwise Linear Ideals

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Componentwise linear ideals

Nagoya Mathematical Journal ◽

10.1017/s0027763000006930 ◽

1999 ◽

Vol 153 ◽

pp. 141-153 ◽

Cited By ~ 78

Author(s):

Jürgen Herzog ◽

Takayuki Hibi

Keyword(s):

Simplicial Complex ◽

Polynomial Ring ◽

Betti Numbers ◽

Monomial Ideals ◽

Homogeneous Polynomials ◽

Graded Betti Numbers ◽

Linear Resolution ◽

Alexander Dual ◽

Componentwise Linear Ideals ◽

The Ideal

AbstractA componentwise linear ideal is a graded ideal I of a polynomial ring such that, for each degree q, the ideal generated by all homogeneous polynomials of degree q belonging to I has a linear resolution. Examples of componentwise linear ideals include stable monomial ideals and Gotzmann ideals. The graded Betti numbers of a componentwise linear ideal can be determined by the graded Betti numbers of its components. Combinatorics on squarefree componentwise linear ideals will be especially studied. It turns out that the Stanley-Reisner ideal IΔ arising from a simplicial complex Δ is componentwise linear if and only if the Alexander dual of Δ is sequentially Cohen-Macaulay. This result generalizes the theorem by Eagon and Reiner which says that the Stanley-Reisner ideal of a simplicial complex has a linear resolution if and only if its Alexander dual is Cohen-Macaulay.

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Some Families of Componentwise Linear Monomial Ideals

Nagoya Mathematical Journal ◽

10.1017/s0027763000025873 ◽

2007 ◽

Vol 187 ◽

pp. 115-156 ◽

Cited By ~ 6

Author(s):

Christopher A. Francisco ◽

Adam Van Tuyl

Keyword(s):

Polynomial Ring ◽

Betti Numbers ◽

Monomial Ideals ◽

Fat Points ◽

Graded Betti Numbers ◽

Alexander Duality ◽

Componentwise Linear Ideals ◽

Positive Integers ◽

The Ideal

AbstractLet R = k[x1,…,xn] be a polynomial ring over a field k. Let J = {j1,…,jt} be a subset of {1,…, n}, and let mJ ⊂ R denote the ideal (xj1,…,xjt). Given subsets J1,…,Js of {1,…, n} and positive integers a1,…,as, we study ideals of the form These ideals arise naturally, for example, in the study of fat points, tetrahedral curves, and Alexander duality of squarefree monomial ideals. Our main focus is determining when ideals of this form are componentwise linear. Using polymatroidality, we prove that I is always componentwise linear when s ≤ 3 or when Ji ∪ Jj = [n] for all i ≠ j. When s ≥ 4, we give examples to show that I may or may not be componentwise linear. We apply these results to ideals of small sets of general fat points in multiprojective space, and we extend work of Fatabbi, Lorenzini, Valla, and the first author by computing the graded Betti numbers in the s = 2 case. Since componentwise linear ideals satisfy the Multiplicity Conjecture of Herzog, Huneke, and Srinivasan when char(k) = 0, our work also yields new cases in which this conjecture holds.

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Extremal Betti numbers of graded ideals

Results in Mathematics ◽

10.1007/bf03322739 ◽

2003 ◽

Vol 43 (3-4) ◽

pp. 235-244 ◽

Cited By ~ 8

Author(s):

Marilena Crupi ◽

Rosanna Utano

Keyword(s):

Betti Numbers

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Betti numbers and pseudoeffective cones in 2-Fano varieties

Advances in Geometry ◽

10.1515/advgeom-2021-0004 ◽

2021 ◽

Vol 0 (0) ◽

Author(s):

Giosuè Emanuele Muratore

Keyword(s):

Large Class ◽

Betti Numbers ◽

Fano Varieties ◽

Higher Dimensional ◽

Special Case ◽

Answering Questions

Abstract The 2-Fano varieties, defined by De Jong and Starr, satisfy some higher-dimensional analogous properties of Fano varieties. We consider (weak) k-Fano varieties and conjecture the polyhedrality of the cone of pseudoeffective k-cycles for those varieties, in analogy with the case k = 1. Then we calculate some Betti numbers of a large class of k-Fano varieties to prove some special case of the conjecture. In particular, the conjecture is true for all 2-Fano varieties of index at least n − 2, and we complete the classification of weak 2-Fano varieties answering Questions 39 and 41 in [2].

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Topology of Subvarieties of Complex Semi-abelian Varieties

International Mathematics Research Notices ◽

10.1093/imrn/rnaa242 ◽

2020 ◽

Author(s):

Yongqiang Liu ◽

Laurentiu Maxim ◽

Botong Wang

Keyword(s):

Euler Characteristic ◽

Morse Theory ◽

Characteristic Property ◽

Abelian Varieties ◽

Betti Numbers ◽

Local Systems ◽

Affine Manifolds ◽

Cyclic Covers ◽

Rank One ◽

Generic Vanishing

Abstract We use the non-proper Morse theory of Palais–Smale to investigate the topology of smooth closed subvarieties of complex semi-abelian varieties and that of their infinite cyclic covers. As main applications, we obtain the finite generation (except in the middle degree) of the corresponding integral Alexander modules as well as the signed Euler characteristic property and generic vanishing for rank-one local systems on such subvarieties. Furthermore, we give a more conceptual (topological) interpretation of the signed Euler characteristic property in terms of vanishing of Novikov homology. As a byproduct, we prove a generic vanishing result for the $L^2$-Betti numbers of very affine manifolds. Our methods also recast June Huh’s extension of Varchenko’s conjecture to very affine manifolds and provide a generalization of this result in the context of smooth closed sub-varieties of semi-abelian varieties.

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L2-BETTI NUMBERS OF DISCRETE MEASURED GROUPOIDS

International Journal of Algebra and Computation ◽

10.1142/s0218196705002748 ◽

2005 ◽

Vol 15 (05n06) ◽

pp. 1169-1188 ◽

Cited By ~ 9

Author(s):

ROMAN SAUER

Keyword(s):

Probability Space ◽

Betti Numbers ◽

Free Action ◽

Countable Group ◽

Equivalence Relations ◽

Dimension Theory ◽

Discrete Groups ◽

Type Ii ◽

Orbit Equivalent ◽

Definition Of

There are notions of L2-Betti numbers for discrete groups (Cheeger–Gromov, Lück), for type II1-factors (recent work of Connes-Shlyakhtenko) and for countable standard equivalence relations (Gaboriau). Whereas the first two are algebraically defined using Lück's dimension theory, Gaboriau's definition of the latter is inspired by the work of Cheeger and Gromov. In this work we give a definition of L2-Betti numbers of discrete measured groupoids that is based on Lück's dimension theory, thereby encompassing the cases of groups, equivalence relations and holonomy groupoids with an invariant measure for a complete transversal. We show that with our definition, like with Gaboriau's, the L2-Betti numbers [Formula: see text] of a countable group G coincide with the L2-Betti numbers [Formula: see text] of the orbit equivalence relation [Formula: see text] of a free action of G on a probability space. This yields a new proof of the fact the L2-Betti numbers of groups with orbit equivalent actions coincide.

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