Degenerate Sklyanin algebras and generalized twisted homogeneous coordinate rings

Chelsea Walton

doi:10.1016/j.jalgebra.2009.02.024

Corrigendum to “Degenerate Sklyanin algebras and generalized twisted homogeneous coordinate rings” [J. Algebra 322 (7) (2009) 2508–2527]

Journal of Algebra ◽

10.1016/j.jalgebra.2011.12.032 ◽

2012 ◽

Vol 356 (1) ◽

pp. 275-282

Author(s):

Chelsea Walton

Keyword(s):

Sklyanin Algebras ◽

Coordinate Rings

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The Convex Polytopes and Homogeneous Coordinate Rings of Bivariate Polynomials

Scientific Research Journal ◽

10.24191/srj.v16i2.9346 ◽

2019 ◽

Vol 16 (2) ◽

pp. 1

Author(s):

Shamsatun Nahar Ahmad ◽

Nor’Aini Aris ◽

Azlina Jumadi

Keyword(s):

Convex Polytopes ◽

Polynomial Systems ◽

Matrix Formulation ◽

Bivariate Polynomials ◽

Homogeneous Coordinates ◽

The Matrix ◽

Projective Vector ◽

Coordinate Rings ◽

Resultant Matrix ◽

The Given

Concepts from algebraic geometry such as cones and fans are related to toric varieties and can be applied to determine the convex polytopes and homogeneous coordinate rings of multivariate polynomial systems. The homogeneous coordinates of a system in its projective vector space can be associated with the entries of the resultant matrix of the system under consideration. This paper presents some conditions for the homogeneous coordinates of a certain system of bivariate polynomials through the construction and implementation of the Sylvester-Bèzout hybrid resultant matrix formulation. This basis of the implementation of the Bèzout block applies a combinatorial approach on a set of linear inequalities, named 5-rule. The inequalities involved the set of exponent vectors of the monomials of the system and the entries of the matrix are determined from the coefficients of facets variable known as brackets. The approach can determine the homogeneous coordinates of the given system and the entries of the Bèzout block. Conditions for determining the homogeneous coordinates are also given and proven.

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Maps from Feigin and Odesskii's elliptic algebras to twisted homogeneous coordinate rings

Forum of Mathematics Sigma ◽

10.1017/fms.2020.60 ◽

2021 ◽

Vol 9 ◽

Author(s):

Alex Chirvasitu ◽

Ryo Kanda ◽

S. Paul Smith

Keyword(s):

Elliptic Curve ◽

Symmetric Power ◽

Canonical Homomorphism ◽

Coordinate Ring ◽

Characteristic Variety ◽

Closed Subvariety ◽

Coordinate Rings ◽

Cubic Hypersurfaces ◽

Elliptic Algebras ◽

Twisted Homogeneous Coordinate Ring

Abstract The elliptic algebras in the title are connected graded $\mathbb {C}$ -algebras, denoted $Q_{n,k}(E,\tau )$ , depending on a pair of relatively prime integers $n>k\ge 1$ , an elliptic curve E and a point $\tau \in E$ . This paper examines a canonical homomorphism from $Q_{n,k}(E,\tau )$ to the twisted homogeneous coordinate ring $B(X_{n/k},\sigma ',\mathcal {L}^{\prime }_{n/k})$ on the characteristic variety $X_{n/k}$ for $Q_{n,k}(E,\tau )$ . When $X_{n/k}$ is isomorphic to $E^g$ or the symmetric power $S^gE$ , we show that the homomorphism $Q_{n,k}(E,\tau ) \to B(X_{n/k},\sigma ',\mathcal {L}^{\prime }_{n/k})$ is surjective, the relations for $B(X_{n/k},\sigma ',\mathcal {L}^{\prime }_{n/k})$ are generated in degrees $\le 3$ and the noncommutative scheme $\mathrm {Proj}_{nc}(Q_{n,k}(E,\tau ))$ has a closed subvariety that is isomorphic to $E^g$ or $S^gE$ , respectively. When $X_{n/k}=E^g$ and $\tau =0$ , the results about $B(X_{n/k},\sigma ',\mathcal {L}^{\prime }_{n/k})$ show that the morphism $\Phi _{|\mathcal {L}_{n/k}|}:E^g \to \mathbb {P}^{n-1}$ embeds $E^g$ as a projectively normal subvariety that is a scheme-theoretic intersection of quadric and cubic hypersurfaces.

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Quantum Heisenberg groups and sklyanin algebras

Letters in Mathematical Physics ◽

10.1007/bf00761709 ◽

1994 ◽

Vol 31 (3) ◽

pp. 167-177 ◽

Cited By ~ 1

Author(s):

Nicol�s Andruskiewitsch ◽

Jorge Devoto ◽

Alejandro Tiraboschi

Keyword(s):

Heisenberg Groups ◽

Sklyanin Algebras

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Sklyanin algebras and Hilbert schemes of points

Advances in Mathematics ◽

10.1016/j.aim.2006.06.009 ◽

2007 ◽

Vol 210 (2) ◽

pp. 405-478 ◽

Cited By ~ 11

Author(s):

T.A. Nevins ◽

J.T. Stafford

Keyword(s):

Hilbert Schemes ◽

Sklyanin Algebras

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Degenerate Sklyanin algebras

Open Physics ◽

10.2478/s11534-009-0142-5 ◽

2010 ◽

Vol 8 (4) ◽

Cited By ~ 5

Author(s):

Andrey Smirnov

Keyword(s):

Difference Operators ◽

Baxter Equation ◽

Quantum Algebras ◽

Rational Solutions ◽

R Matrix ◽

Gauge Transformations ◽

Sklyanin Algebras ◽

Sklyanin Algebra ◽

The Difference

AbstractNew trigonometric and rational solutions of the quantum Yang-Baxter equation (QYBE) are obtained by applying some singular gauge transformations to the known Belavin-Drinfeld elliptic R-matrix for sl(2;?). These solutions are shown to be related to the standard ones by the quasi-Hopf twist. We demonstrate that the quantum algebras arising from these new R-matrices can be obtained as special limits of the Sklyanin algebra. A representation for these algebras by the difference operators is found. The sl(N;?)-case is discussed.

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A Note on the Multiplicity of Cohen-Macaulay Algebras with Pure Resolutions

Canadian Journal of Mathematics ◽

10.4153/cjm-1985-062-4 ◽

1985 ◽

Vol 37 (6) ◽

pp. 1149-1162 ◽

Cited By ~ 26

Author(s):

Craig Huneke ◽

Matthew Miller

Keyword(s):

Tangent Cone ◽

Betti Numbers ◽

Rational Surface ◽

Minimal Resolution ◽

Homogeneous Ideal ◽

Elliptic Singularity ◽

Rational Surface Singularity ◽

Generic Matrix ◽

Image Position ◽

Coordinate Rings

Let R = k[X1, …, Xn] with k a field, and let I ⊂ R be a homogeneous ideal. The algebra R/I is said to have a pure resolution if its homogeneous minimal resolution has the formSome of the known examples of pure resolutions include the coordinate rings of: the tangent cone of a minimally elliptic singularity or a rational surface singularity [15], a variety defined by generic maximal Pfaffians [2], a variety defined by maximal minors of a generic matrix [3], a variety defined by the submaximal minors of a generic square matrix [6], and certain of the Segre-Veronese varieties [1].If I is in addition Cohen-Macaulay, then Herzog and Kühl have shown that the betti numbers bi are completely determined by the twists di.

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Residue Complex for Sklyanin Algebras of Dimension Three

Advances in Mathematics ◽

10.1006/aima.1998.1807 ◽

1999 ◽

Vol 144 (2) ◽

pp. 137-160 ◽

Cited By ~ 4

Author(s):

Kaushal Ajitabh

Keyword(s):

Sklyanin Algebras

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Nilpotent Orbit Varieties and the Atomic Decomposition of the Q-Kostka Polynomials

Canadian Journal of Mathematics ◽

10.4153/cjm-1998-028-3 ◽

1998 ◽

Vol 50 (3) ◽

pp. 525-537 ◽

Cited By ~ 2

Author(s):

William Brockman ◽

Mark Haiman

Keyword(s):

Atomic Decomposition ◽

Jordan Block ◽

Geometric Interpretation ◽

Nilpotent Orbit ◽

Cohomology Rings ◽

Direct Sum ◽

Kostka Polynomials ◽

Orbit Closures ◽

Direct Sum Decomposition ◽

Coordinate Rings

AbstractWe study the coordinate rings of scheme-theoretic intersections of nilpotent orbit closures with the diagonal matrices. Here μ′ gives the Jordan block structure of the nilpotent matrix. de Concini and Procesi [5] proved a conjecture of Kraft [12] that these rings are isomorphic to the cohomology rings of the varieties constructed by Springer [22, 23]. The famous q-Kostka polynomial is the Hilbert series for the multiplicity of the irreducible symmetric group representation indexed by λ in the ring . Lascoux and Schützenberger [15, 13] gave combinatorially a decomposition of as a sum of “atomic” polynomials with non-negative integer coefficients, and Lascoux proposed a corresponding decomposition in the cohomology model.Our work provides a geometric interpretation of the atomic decomposition. The Frobenius-splitting results of Mehta and van der Kallen [19] imply a direct-sum decomposition of the ideals of nilpotent orbit closures, arising from the inclusions of the corresponding sets. We carry out the restriction to the diagonal using a recent theorem of Broer [3]. This gives a direct-sum decomposition of the ideals yielding the , and a new proof of the atomic decomposition of the q-Kostka polynomials.

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Integral closure of some co-ordinate rings

Journal of the Australian Mathematical Society ◽

10.1017/s1446788700023995 ◽

1975 ◽

Vol 20 (1) ◽

pp. 115-123

Author(s):

David J. Smith

Keyword(s):

Integral Closure ◽

Principal Result ◽

Space Curve ◽

Coordinate Ring ◽

Unique Factorization ◽

Algebraic Space ◽

Space Curves ◽

Integrally Closed ◽

Coordinate Rings ◽

Special Case

In this paper, some methods are developed for obtaining explicitly a basis for the integral closure of a class of coordinate rings of algebraic space curves.The investigation of this problem was motivated by a need for examples of integrally closed rings with specified subrings with a view toward examining questions of unique factorization in them. The principal result, giving the elements to be adjoined to a ring of the form k[x1, …,xn] to obtain its integral closure, is limited to the rather special case of the coordinate ring of a space curve all of whose singularities are normal. But in numerous examples where the curve has nonnormal singularities, the same method, which is essentially a modification of the method of locally quadratic transformations, also gives the integral closure.

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