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42 results on '"Shelton, Brad"'

1. Splitting Algebras II: The Cohomology Algebra

Author

Shelton, Brad

Subjects
Mathematics - Rings and Algebras, 16W50, 05E15
Abstract

Gelfand, Retakh, Serconek and Wilson, in \cite{GRSW}, defined a graded algebra $A_\Gamma$ attached to any finite ranked poset $\Gamma$ - a generalization of the universal algebra of pseudo-roots of noncommutative polynomials. This algebra has since come to be known as the splitting algebra of $\Gamma$. The splitting algebra has a secondary filtration related to the rank function on the poset and the associated graded algebra is denoted here by $A'_\Gamma$. We calculate the cohomology algebra (and coalgebra) of $A'_\Gamma$ explicitly. As a corollary to this calculation we have a proof that $A'_\Gamma$ is Koszul (respectively quadratic) if and only if $\Gamma$ is Cohen-Macaulay (respectively uniform). We show by example that the cohomology algebra (resp. coalgebra) of $A_\Gamma$ may be strictly smaller that the cohomology algebra (resp. coalgebra) of $A'_\Gamma$., Comment: 16 pages, 1 figure

Published
2012

2. Splitting Algebras: Koszul, Cohen-Macaulay and Numerically Koszul

Author

Kloefkorn, Tyler and Shelton, Brad

Subjects
Mathematics - Rings and Algebras, Mathematics - Combinatorics, 16S37
Abstract

We study a finite dimensional quadratic graded algebra R defined from a finite ranked poset. This algebra has been central to the study of the splitting algebra of the poset, A, as introduced by Gelfand, Retakh, Serconek and Wilson . The algebra A is known to be quadratic when the poset satisfies a combinatorial condition known as uniform, and R is the quadratic dual of an associated graded algebra of A. We prove that R is Koszul and the poset is uniform if and only if the poset is Cohen-Macaulay. Koszulity of R implies Koszulity of A. We also show that when R is Koszul, the cohomology of the order complex of the poset can be identified with certain cohomology groups defined internally to the ring R. Finally, we settle in the negative the long-standing question: Does numerically Koszul imply Koszul for algebras of the form R?, Comment: 26 pages, 8 figures

Published
2012

3. $\mathcal K_2$ factors of Koszul algebras and applications to face rings

Author

Conner, Andrew and Shelton, Brad

Subjects
Mathematics - Rings and Algebras
Abstract

Generalizing the notion of a Koszul algebra, a graded k-algebra A is K2 if its Yoneda algebra is generated as an algebra in cohomology degrees 1 and 2. We prove a strong theorem about K2 factor algebras of Koszul algebras and use that theorem to show the Stanley-Reisner face ring of a simplicial complex is K2 whenever the Alexander dual simplicial complex is (sequentially) Cohen-Macaulay.

Published
2011

4. The Koszul property as a topological invariant and a measure of singularities

Author

Sadofsky, Hal and Shelton, Brad

Subjects
Mathematics - Rings and Algebras, Mathematics - Algebraic Topology, 16S37, 58K65
Abstract

Cassidy, Phan and Shelton associate to any regular cell complex X a quadratic K-algebra R(X). They give a combinatorial solution to the question of when this algebra is Koszul. The algebra R(X) is a combinatorial invariant but not a topological invariant. We show that nevertheless, the property that R(x) be Koszul is a topological invariant. In the process we establish some conditions on the types of local singular- ities that can occur in cell complexes X such that R(X) is Koszul, and more generally in cell complexes that are pure and connected by codimension one faces., Comment: 11 pages, 1 figure, fixes typos, enlarges abstract from previous version

Published
2009

5. Noncommutative Koszul Algebras from Combinatorial Topology

Author

Cassidy, Thomas, Phan, Christopher, and Shelton, Brad

Subjects
Mathematics - Rings and Algebras, Mathematics - Algebraic Topology
Abstract

Associated to any uniform finite layered graph Gamma there is a noncommutative graded quadratic algebra A(Gamma) given by a construction due to Gelfand, Retakh, Serconek and Wilson. It is natural to ask when these algebras are Koszul. Unfortunately, a mistake in the literature states that all such algebras are Koszul. That is not the case and the theorem was recently retracted. We analyze the Koszul property of these algebras for two large classes of graphs associated to finite regular CW complexes, X. Our methods are primarily topological. We solve the Koszul problem by introducing new cohomology groups H_X(n,k), generalizing the usual cohomology groups H^n(X). Along with several other results, our methods give a new and primarily topological proof of a result of Serconek and Wilson and of Piontkovski., Comment: 22 pages, 1 figure

Published
2008
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6. The Yoneda algebra of a K_2 algebra need not be another K_2 algebra

Author

Cassidy, Thomas, Phan, Christopher, and Shelton, Brad

Subjects
Mathematics - Rings and Algebras, 16E65
Abstract

The Yoneda algebra of a Koszul algebra or a D-Koszul algebra is Koszul. K_2 algebras are a natural generalization of Koszul algebras, and one would hope that the Yoneda algebra of a K_2 algebra would be another K_2 algebra. We show that this is not necessarily the case by constructing a monomial K_2 algebra for which the corresponding Yoneda algebra is not K_2., Comment: Errors in v1 corrected

Published
2008
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7. Generalizing the notion of Koszul algebra

Author

Cassidy, Thomas and Shelton, Brad

Subjects
Mathematics - Rings and Algebras, 16E65
Abstract

We introduce a generalization of the notion of a Koszul algebra, which includes graded algebras with relations in different degrees, and we establish some of the basic properties of these algebras. This class is closed under twists, twisted tensor products, regular central extensions and Ore extensions. We explore the monomial algebras in this class and we include some well-known examples of algebras that fall into this class.

Published
2007

8. PBW-deformation theory and regular central extensions

Author

Cassidy, Thomas and Shelton, Brad

Subjects
Mathematics - Rings and Algebras
Abstract

A deformation $U$, of a graded $K$-algebra $A$ is said to be of PBW type if $grU$ is $A$. It has been shown for Koszul and $N$-Koszul algebras that the deformation is PBW if and only if the relations of $U$ satisfy a Jacobi type condition. In particular, for these algebras the determination of the PBW property is a {\it finite} and explicitly determined linear algebra problem. We extend these results to an arbitrary graded $K$-algebra, using the notion of central extensions of algebras and a homological constant attached to $A$ which we call the {\it complexity} of $A$.

Published
2006

33. SCHEMES OF LINE MODULES. II.

Author

Shelton, Brad and Vancliff, Michaela

Subjects
*ALGEBRA, *QUADRICS
Abstract

In this sequel to, we study the scheme of line modules for several classes of quantum P³s, including Clifford algebras, homogenized sl(2) and algebras associated to smooth quadrics in P³. We also prove that a quantum P³ with enough symmetry in its defining relations has a line scheme of dimension at least two, with infinitely many line modules incident to any point module. [ABSTRACT FROM AUTHOR]

Published
2002
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34. K2 factors of Koszul algebras and applications to face rings

Author

Conner, Andrew and Shelton, Brad

Subjects
Mathematics::Commutative Algebra, Mathematics::K-Theory and Homology, Mathematics::Rings and Algebras, Stanley–Reisner ring, Yoneda algebra, Face ring, Mathematics::Algebraic Topology, K2 algebra, Koszul algebra
Abstract

Generalizing the notion of a Koszul algebra, a graded k-algebra A is K2 if its Yoneda algebra ExtA(k,k) is generated as an algebra in cohomology degrees 1 and 2. We prove a strong theorem about K2 factor algebras of Koszul algebras and use that theorem to show the Stanley–Reisner face ring of a simplicial complex Δ is K2 whenever the Alexander dual simplicial complex Δ⁎ is (sequentially) Cohen–Macaulay.

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35. A KIND OF MAGIC?

Author

Shelton, Brad

Abstract

This article features the Wizarding World of Harry Potter in Universal Parks and Resorts' Islands of Adventure in Orlando, Florida. The theme park offers several of the main set pieces in the Harry Potter film series and books written by J. K. Rowling. The park includes three main attractions: Harry Potter and the Forbidden Journey, Dragon Challenge and Flight of the Hippogriff.

Published
2011

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