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DC Field | Value | Language |
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dc.contributor.author | Boij, Mats | - |
dc.contributor.author | Migliore, Juan C. (Juan Carlos), 1956- | - |
dc.contributor.author | Miró-Roig, Rosa M. (Rosa Maria) | - |
dc.contributor.author | Nagel, Uwe | - |
dc.contributor.author | Zanello, Fabrizio | - |
dc.date.accessioned | 2016-03-16T17:09:48Z | - |
dc.date.available | 2016-03-16T17:09:48Z | - |
dc.date.issued | 2012 | - |
dc.identifier.issn | 0065-9266 | - |
dc.identifier.uri | http://hdl.handle.net/2445/96559 | - |
dc.description.abstract | A monomial order ideal is a finite collection $ X$ of (monic) monomials such that, whenever $ M\in X$ and $ N$ divides $ M$, then $ N\in X$. Hence $ X$ is a poset, where the partial order is given by divisibility. If all, say $ t$, maximal monomials of $ X$ have the same degree, then $ X$ is pure (of type $ t$). A pure $ O$-sequence is the vector, $ \underline {h}=(h_0=1,h_1,...,h_e)$, counting the monomials of $ X$ in each degree. Equivalently, pure $ O$-sequences can be characterized as the $ f$-vectors of pure multicomplexes, or, in the language of commutative algebra, as the $ h$-vectors of monomial Artinian level algebras. Pure $ O$-sequences had their origin in one of the early works of Stanley's in this area, and have since played a significant role in at least three different disciplines: the study of simplicial complexes and their $ f$-vectors, the theory of level algebras, and the theory of matroids. This monograph is intended to be the first systematic study of the theory of pure $ O$-sequences. Our work, which makes an extensive use of both algebraic and combinatorial techniques, in particular includes: (i) A characterization of the first half of a pure $ O$-sequence, which yields the exact converse to a $ g$-theorem of Hausel; (ii) A study of (the failing of) the unimodality property; (iii) The problem of enumerating pure $ O$-sequences, including a proof that almost all $ O$-sequences are pure, a natural bijection between integer partitions and type 1 pure $ O$-sequences, and the asymptotic enumeration of socle degree 3 pure $ O$-sequences of type $ t$; (iv) A study of the Interval Conjecture for Pure $ O$-sequences (ICP), which represents perhaps the strongest possible structural result short of an (impossible?) full characterization; (v) A pithy connection of the ICP with Stanley's conjecture on the $ h$-vectors of matroid complexes; (vi) A more specific study of pure $ O$-sequences of type 2, including a proof of the Weak Lefschetz Property in codimension 3 over a field of characteristic zero. As an immediate corollary, pure $ O$-sequences of codimension 3 and type 2 are unimodal (over an arbitrary field). (vii) An analysis, from a commutative algebra viewpoint, of the extent to which the Weak and Strong Lefschetz Properties can fail for monomial algebras. (viii) Some observations about pure $ f$-vectors, an important special case of pure $ O$-sequences. | - |
dc.format.extent | 86 p. | - |
dc.format.mimetype | application/pdf | - |
dc.language.iso | eng | - |
dc.publisher | American Mathematical Society (AMS) | - |
dc.relation.isformatof | Reproducció del document publicat a: http://dx.doi.org/10.1090/S0065-9266-2011-00647-7 | - |
dc.relation.ispartof | Memoirs of the American Mathematical Society, 2012, vol. 218, num. 1024 | - |
dc.relation.uri | http://dx.doi.org/10.1090/S0065-9266-2011-00647-7 | - |
dc.rights | (c) American Mathematical Society (AMS), 2012 | - |
dc.source | Articles publicats en revistes (Matemàtiques i Informàtica) | - |
dc.subject.classification | Àlgebra commutativa | - |
dc.subject.classification | Àlgebra vectorial | - |
dc.subject.other | Commutative algebra | - |
dc.subject.other | Vector algebra | - |
dc.title | On the shape of a pure O-sequence | - |
dc.type | info:eu-repo/semantics/article | - |
dc.type | info:eu-repo/semantics/publishedVersion | - |
dc.identifier.idgrec | 589163 | - |
dc.date.updated | 2016-03-16T17:09:53Z | - |
dc.rights.accessRights | info:eu-repo/semantics/openAccess | - |
Appears in Collections: | Articles publicats en revistes (Matemàtiques i Informàtica) |
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589163.pdf | 778.32 kB | Adobe PDF | View/Open |
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