Your search keyword '"13D02, 05E99"' showing total 8 results

1. Towards Boij-S\'oderberg theory for Grassmannians: the case of square matrices

Author

Ford, Nicolas, Levinson, Jake, and Sam, Steven V

Subjects

Mathematics - Commutative Algebra, Mathematics - Algebraic Geometry, 13D02, 05E99

Abstract

We characterize the cone of GL-equivariant Betti tables of Cohen-Macaulay modules of codimension 1, up to rational multiple, over the coordinate ring of square matrices. This result serves as the base case for `Boij-S\"oderberg theory for Grassmannians', with the goal of characterizing the cones of GL_k-equivariant Betti tables of modules over the coordinate ring of k x n matrices, and, dually, cohomology tables of vector bundles on the Grassmannian Gr(k, C^n). The proof uses Hall's Theorem on perfect matchings in bipartite graphs to compute the extremal rays of the cone, and constructs the corresponding equivariant free resolutions by applying Weyman's geometric technique to certain graded pure complexes of Eisenbud-Fl{\o}ystad-Weyman., Comment: 17 pages, v2: Section 4 rewritten

Published

2016

2. Betti numbers of monomial ideals and shifted skew shapes

Author

Nagel, Uwe and Reiner, Victor

Subjects

Mathematics - Commutative Algebra, Mathematics - Combinatorics, 13D02, 05E99

Abstract

We present two new problems on lower bounds for resolution Betti numbers of monomial ideals generated in a fixed degree. The first concerns any such ideal and bounds the total Betti numbers, while the second concerns ideals that are quadratic and bihomogeneous with respect to two variable sets, but gives a more finely graded lower bound. These problems are solved for certain classes of ideals that generalize (in two different directions) the edge ideals of threshold graphs and Ferrers graphs. In the process, we produce particularly simple cellular linear resolutions for strongly stable and squarefree strongly stable ideals generated in a fixed degree, and combinatorial interpretations for the Betti numbers of other classes of ideals, all of which are independent of the coefficient field.

Published

2007

3. Cellular resolutions of Cohen-Macaulay monomial quotient rings

Author

Floystad, Gunnar

Subjects

Mathematics - Commutative Algebra, Mathematics - Combinatorics, 13D02, 05E99

Abstract

We investigate monomial labellings on cell complexes, giving a minimal cellular resolution of the ideal generated by these monomials, and such that the associated quotient ring is Cohen-Macaulay. We introduce a notion of such a labelling being maximal. There is only a finite number of maximal labellings for each cell complex, and we classify these for trees, partly for subdivisions of polygons, and for some classes of selfdual polytopes., Comment: Updated version, 26 pages

Published

2007

4. The Multiplicity Conjecture for Barycentric Subdivisions

Author

Kubitzke, Martina and Welker, Volkmar

Subjects

Mathematics - Commutative Algebra, Mathematics - Combinatorics, 13D02, 05E99

Abstract

For a simplicial complex $\Delta$ we study the effect of barycentric subdivision on ring theoretic invariants of its Stanley-Reisner ring. In particular, for Stanley-Reisner rings of barycentric subdivisions we verify a conjecture by Huneke and Herzog & Srinivasan, that relates the multiplicity of a standard graded $k$-algebra to the product of the maximal and minimal shifts in its minimal free resolution up to the height. On the way to proving the conjecture we develop new and list well known results on behavior of dimension, Hilbert series, multiplicity, local cohomology, depth and regularity when passing from the Stanley-Reisner ring of $\Delta$ to the one of its barycentric subdivision., Comment: 28, pages, lower bound and equality cases added

Published

2006

5. On the multigraded Hilbert and Poincar\'e-Betti series and the Golod property of monomial rings

Author

Joellenbeck, Michael

Subjects

Mathematics - Combinatorics, Mathematics - Commutative Algebra, 13D02, 05E99

Abstract

We study the multigraded Poincar\'e-Betti series of $A=S/\aaf$, where $S$ is the ring of polynomials in $n$ indeterminates divided by the monomial ideal $\aaf$. There is a conjecture about the multigraded Poincar\'e-Betti series by Charalambous and Reeves which they proved in the case, where the Taylor resolution is minimal. We introduce a conjecture about the minimal $A$-free resolution of the residue class field and show that this conjecture implies the conjecture of Charalambous and Reeves. We prove our conjecture for several classes of algebras. The conjecture implies that $A$ is Golod if and only if the product (i.e. the first Massey operation) on the Koszul homology is trivial. Under the assumption of the conjecture we finally prove that a very simple purely combinatorial condition on the minimal monomial generating system of $\aaf$ implies Golodness for $A$.

Published

2005

6. Resolution of the residue class field via algebraic discrete Morse theory

Author

Joellenbeck, Michael and Welker, Volkmar

Subjects

Mathematics - Commutative Algebra, Mathematics - Combinatorics, 13D02, 05E99

Abstract

Forman's Discrete Morse theory is studied from an algebraic viewpoint. Analogous to independent work of Emil Skoeldberg we show that this theory can be extended to chain complexes of free modules over a ring. We provide three applications of this theory: We construct new resolutions of the residue class field $k$ over $A$, where $A$ is the quotient of a (i) commutative polynomial ring or (ii) non-commutaitve polynomial ring by a (twosided) ideal and (iii) we construct a new resolution of $A$ as an $A \otimes A^{op}$-module in the situation (ii). In either case we prove minimality of the resolution for certain classes of algebras $A$., Comment: 40 pages

Published

2005

7. Towards Boij–Söderberg theory for Grassmannians: the case of square matrices

Author

Steven V Sam, Jake Levinson, and Nicolas Ford

Subjects

Pure mathematics, free resolutions, Grassmannian, 13D02, 01 natural sciences, Square matrix, Mathematics::Algebraic Topology, Boij–Söderberg theory, Mathematics - Algebraic Geometry, 0103 physical sciences, cohomology table, 0101 mathematics, Schur functors, Mathematics, Betti table, Algebra and Number Theory, Mathematics::Commutative Algebra, 010102 general mathematics, Mathematics - Commutative Algebra, 16. Peace & justice, 13D02, 05E99, equivariant K-theory, 010307 mathematical physics, Equivariant K-theory, 05E99

Abstract

We characterize the cone of GL-equivariant Betti tables of Cohen-Macaulay modules of codimension 1, up to rational multiple, over the coordinate ring of square matrices. This result serves as the base case for `Boij-S\"oderberg theory for Grassmannians', with the goal of characterizing the cones of GL_k-equivariant Betti tables of modules over the coordinate ring of k x n matrices, and, dually, cohomology tables of vector bundles on the Grassmannian Gr(k, C^n). The proof uses Hall's Theorem on perfect matchings in bipartite graphs to compute the extremal rays of the cone, and constructs the corresponding equivariant free resolutions by applying Weyman's geometric technique to certain graded pure complexes of Eisenbud-Fl{\o}ystad-Weyman., Comment: 17 pages, v2: Section 4 rewritten

Published

2018

8. Betti numbers of monomial ideals and shifted skew shapes

Author

Victor Reiner and Uwe Nagel

Subjects

Monomial, Betti number, 0102 computer and information sciences, Commutative Algebra (math.AC), 01 natural sciences, Upper and lower bounds, Theoretical Computer Science, Combinatorics, Simple (abstract algebra), FOS: Mathematics, Discrete Mathematics and Combinatorics, Mathematics - Combinatorics, Ideal (ring theory), 0101 mathematics, Mathematics, Degree (graph theory), Mathematics::Commutative Algebra, Applied Mathematics, 010102 general mathematics, Square-free integer, 16. Peace & justice, Mathematics - Commutative Algebra, 13D02, 05E99, Computational Theory and Mathematics, 010201 computation theory & mathematics, Geometry and Topology, Combinatorics (math.CO), Resolution (algebra)

Abstract

We present two new problems on lower bounds for Betti numbers of the minimal free resolution for monomial ideals generated in a fixed degree. The first concerns any such ideal and bounds the total Betti numbers, while the second concerns ideals that are quadratic and bihomogeneous with respect to two variable sets, but gives a more finely graded lower bound. These problems are solved for certain classes of ideals that generalize (in two different directions) the edge ideals of threshold graphs and Ferrers graphs. In the process, we produce particularly simple cellular linear resolutions for strongly stable and squarefree strongly stable ideals generated in a fixed degree, and combinatorial interpretations for the Betti numbers of other classes of ideals, all of which are independent of the coefficient field.

Published

2007