Your search keyword '"QA150"' showing total 32 results

1. Modular invariants of finite gluing groups

Author

R. James Shank, David L. Wehlau, and Yin Chen

Subjects

Classical group, Semidirect product, Pure mathematics, Algebra and Number Theory, Symplectic group, 010102 general mathematics, Sylow theorems, Field of fractions, 13A50, Mathematics - Commutative Algebra, Commutative Algebra (math.AC), 01 natural sciences, Faithful representation, Mathematics::Group Theory, QA150, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, Representation Theory (math.RT), 0101 mathematics, Abelian group, Invariant (mathematics), Mathematics - Representation Theory, Mathematics

Abstract

We use the gluing construction introduced by Jia Huang to explore the rings of invariants for a range of modular representations. We construct generating sets for the rings of invariants of the maximal parabolic subgroups of a finite symplectic group and their common Sylow $p$-subgroup. We also investigate the invariants of singular finite classical groups. We introduce parabolic gluing and use this construction to compute the invariant field of fractions for a range of representations. We use thin gluing to construct faithful representations of semidirect products and to determine the minimum dimension of a faithful representation of the semidirect product of a cyclic $p$-group acting on an elementary abelian $p$-group., Comment: Example 5.12 has been corrected and expanded

Published

2021

2. Representations of elementary abelian p-groups and finite subgroups of fields

Author

Jianjun Chuai, H. E. A. Campbell, David L. Wehlau, and R. J. Shank

Subjects

Algebra and Number Theory, 010102 general mathematics, 13A50, Field (mathematics), Group Theory (math.GR), Rational function, Rank (differential topology), Commutative Algebra (math.AC), Mathematics - Commutative Algebra, 01 natural sciences, Prime (order theory), Combinatorics, Mathematics::Group Theory, QA150, 0103 physical sciences, FOS: Mathematics, Prime characteristic, 010307 mathematical physics, 0101 mathematics, Abelian group, QA, Mathematics - Group Theory, Finite set, Additive group, Mathematics

Abstract

Suppose $\mathbb{F}$ is a field of prime characteristic $p$ and $E$ is a finite subgroup of the additive group $(\mathbb{F},+)$. Then $E$ is an elementary abelian $p$-group. We consider two such subgroups, say $E$ and $E'$, to be equivalent if there is an $\alpha\in\mathbb{F}^*:=\mathbb{F}\setminus\{0\}$ such that $E=\alpha E'$. In this paper we show that rational functions can be used to distinguish equivalence classes of subgroups and, for subgroups of prime rank or rank less than twelve, we give explicit finite sets of separating invariants., Comment: There has been a minor change of title from the previous version. We have expanded the introduction, simplified some of the proofs and corrected a number of minor errors. The document is now 25 pages

Published

2019

3. Tauvel’s height formula for quantum nilpotent algebras

Author

T. H. Lenagan, Ken R. Goodearl, and Stéphane Launois

Subjects

Pure mathematics, Algebra and Number Theory, Prime ideal, Mathematics::Rings and Algebras, 010102 general mathematics, Quotient algebra, Mathematics - Rings and Algebras, 010103 numerical & computational mathematics, 01 natural sciences, Nilpotent, QA150, Dimension (vector space), Rings and Algebras (math.RA), 16T20, 20G42, 16D25, 16P90, 16S36, Mathematics - Quantum Algebra, Gelfand–Kirillov dimension, FOS: Mathematics, Quantum Algebra (math.QA), 0101 mathematics, Mathematics::Representation Theory, Link (knot theory), Quantum, Mathematics

Abstract

Tauvel's height formula, which provides a link between the height of a prime ideal and the Gelfand-Kirillov dimension of the corresponding factor algebra, is verified for quantum nilpotent algebras.

Published

2019

4. ECM Factorization with QRT Maps

Author

Andrew N.W. Hone

Subjects

Pseudorandom number generator, Sequence, Pure mathematics, Integrable system, 010102 general mathematics, Scalar multiplication, 01 natural sciences, Hamiltonian system, Elliptic curve, QA150, Factorization, 0103 physical sciences, QA241, QA101, 0101 mathematics, QA, 010306 general physics, Integer factorization, Mathematics

Abstract

Quispel-Roberts-Thompson (QRT) maps are a family of birational maps of the plane which provide the simplest discrete analogue of an integrable Hamiltonian system, and are associated with elliptic fibrations in terms of biquadratic curves. Each generic orbit of a QRT map corresponds to a sequence of points on an elliptic curve. In this preliminary study, we explore versions of the elliptic curve method (ECM) for integer factorization based on performing scalar multiplication of a point on an elliptic curve by iterating three different QRT maps with particular initial data. Pseudorandom number generation and other possible applications are briefly discussed.

Published

2021

5. The invariant rings of the Sylow groups of GU(3,q2), GU(4,q2), Sp(4,q) and O+(4,q) in the natural characteristic

Author

Peter Fleischmann and Jorge N.M. Ferreira

Subjects

Classical group, Discrete mathematics, Algebra and Number Theory, Symplectic group, Invariant polynomial, 010102 general mathematics, Sylow theorems, Complete intersection, 010103 numerical & computational mathematics, 01 natural sciences, Unitary state, Combinatorics, Computational Mathematics, QA150, Orthogonal group, 0101 mathematics, Invariant (mathematics), Mathematics

Abstract

Let G be a Sylow p -subgroup of the unitary groups GU(3,q2)GU(3,q2), GU(4,q2)GU(4,q2), the symplectic group Sp(4,q)Sp(4,q) and, for q odd, the orthogonal group O+(4,q)O+(4,q). In this paper we construct a presentation for the invariant ring of G acting on the natural module. In particular we prove that these rings are generated by orbit products of variables and certain invariant polynomials which are images under Steenrod operations, applied to the respective invariant form defining the corresponding classical group. We also show that these generators form a SAGBI basis and the invariant ring for G is a complete intersection.

Published

2017

6. Cluster algebras and discrete integrability

Author

Philipp Lampe, Theodoros E. Kouloukas, Andrew N.W. Hone, Euler, Norbert, and Nucci, Maria Clara

Subjects

Combinatorics, Pure mathematics, Class (set theory), QA150, QA901, Integrable system, Mutation (knot theory), Cluster (physics), Context (language use), QA, Commutative property, Cluster algebra, Mathematics

Abstract

Cluster algebras are a class of commutative algebras whose generators are defined by a recursive process called mutation. We give a brief introduction to cluster algebras, and explain how discrete integrable systems can appear in the context of cluster mutation. In particular, we give examples of birational maps that are integrable in the Liouville sense and arise from cluster algebras with periodicity, as well as examples of discrete Painleve equations that are derived from Y-systems.

Published

2019

7. On the automorphisms of quantum Weyl algebras

Author

Andrew P. Kitchin and Stéphane Launois

Subjects

Pure mathematics, Weyl algebra, Algebra and Number Theory, 010102 general mathematics, Quotient algebra, Jacobian conjecture, Mathematics::Spectral Theory, Automorphism, 01 natural sciences, Quantization (physics), QA150, Mathematics Subject Classification, Tensor (intrinsic definition), 0103 physical sciences, Cover (algebra), 010307 mathematical physics, 0101 mathematics, Mathematics::Representation Theory, QA, Mathematics

Abstract

Motivated by Weyl algebra analogues of the Jacobian conjecture and the Tame Generators problem, we prove quantum versions of these problems for a family of analogues to the Weyl algebras. In particular, our results cover the Weyl-Hayashi algebras and tensor powers of a quantization of the first Weyl algebra which arises as a primitive factor algebra of U + q (so5). Mathematics Subject Classification (2010). 16W35, 16S32, 16W20, 17B37.

Published

2018

8. Geometry of horospherical varieties of Picard rank one

Author

Alexander Samokhin, Richard Gonzales, Clélia Pech, and Nicolas Perrin

Subjects

Derived category, Ring (mathematics), Group (mathematics), General Mathematics, 010102 general mathematics, Geometry, 01 natural sciences, Cohomology, Coherent sheaf, Mathematics - Algebraic Geometry, QA150, Mathematics::Algebraic Geometry, 0103 physical sciences, FOS: Mathematics, 010307 mathematical physics, Representation Theory (math.RT), 0101 mathematics, Variety (universal algebra), Mathematics::Representation Theory, Algebraic Geometry (math.AG), Mathematics::Symplectic Geometry, Mathematics - Representation Theory, Symplectic geometry, Quantum cohomology, Mathematics

Abstract

We study the geometry of non-homogeneous horospherical varieties. These have been classified by Pasquier and include the well-known odd symplectic Grassmannians. We focus our study on quantum cohomology, with a view towards Dubrovin's conjecture. In particular, we describe the cohomology groups of these varieties as well as a Chevalley formula, and prove that many Gromov-Witten invariants are enumerative. This enables us to prove that in many cases the quantum cohomology is semisimple. We give a presentation of the quantum cohomology ring for odd symplectic Grassmannians. The final section is devoted to the derived categories of coherent sheaves on horospherical varieties. We first discuss a general construction of exceptional bundles on these varieties. We then study in detail the case of the horospherical variety associated to the exceptional group $G_2$, and construct a full rectangular Lefschetz exceptional collection in the derived category., 71 pages

Published

2018

9. Free integro-differential algebras and Gröbner–Shirshov bases

Author

Li Guo, Markus Rosenkranz, and Xing Gao

Subjects

Symmetric algebra, Algebra and Number Theory, Mathematics::Commutative Algebra, Mathematics::Rings and Algebras, 010102 general mathematics, 0102 computer and information sciences, Basis (universal algebra), 16. Peace & justice, Rota–Baxter algebra, Difference algebra, 01 natural sciences, Algebra, QA150, QA372, 010201 computation theory & mathematics, Free algebra, Algebra representation, QA299, 0101 mathematics, Differential algebraic geometry, Mathematics, Algebraic differential equation

Abstract

The notion of commutative integro-differential algebra was introduced for the algebraic study of boundary problems for linear ordinary differential equations. Its noncommutative analog achieves a similar purpose for linear systems of such equations. In both cases, free objects are crucial for analyzing the underlying algebraic structures, e.g. of the (matrix) functions. In this paper we apply the method of Grobner–Shirshov bases to construct the free (noncommutative) integro-differential algebra on a set. The construction is from the free Rota–Baxter algebra on the free differential algebra on the set modulo the differential Rota–Baxter ideal generated by the noncommutative integration by parts formula. In order to obtain a canonical basis for this quotient, we first reduce to the case when the set is finite. Then in order to obtain the monomial order needed for the Composition-Diamond lemma, we consider the free Rota–Baxter algebra on the truncated free differential algebra. A Composition-Diamond lemma is proved in this context, and a Grobner–Shirshov basis is found for the corresponding differential Rota–Baxter ideal.

Published

2015

10. Protoadditive functors, derived torsion theories and homology

Author

Tomas Everaert, Marino Gran, UCL - SST/IRMP - Institut de recherche en mathématique et physique, Algebra and Analysis, Topological Algebra, Functional Analysis and Category Theory, and Mathematics

Subjects

18G50, 18G10, 18E40, 18A40, 20J05, 08B05, Derived category, Algebra and Number Theory, Derived functor, Functor category, Mathematics - Category Theory, Homology (mathematics), Algebra, QA150, Mathematics::K-Theory and Homology, Mathematics::Category Theory, Natural transformation, Ext functor, FOS: Mathematics, Tor functor, Category Theory (math.CT), Adjoint functors, Mathematics

Abstract

Protoadditive functors are designed to replace additive functors in a non-abelian setting. Their properties are studied, in particular in relationship with torsion theories, Galois theory, homology and factorisation systems. It is shown how a protoadditive torsion-free reflector induces a chain of derived torsion theories in the categories of higher extensions, similar to the Galois structures of higher central extensions previously considered in semi-abelian homological algebra. Such higher central extensions are also studied, with respect to Birkhoff subcategories whose reflector is protoadditive or, more generally, factors through a protoadditive reflector. In this way we obtain simple descriptions of the non-abelian derived functors of the reflectors via higher Hopf formulae. Various examples are considered in the categories of groups, compact groups, internal groupoids in a semi-abelian category, and other ones.

Published

2015

11. Rota–Baxter operators on the polynomial algebra, integration, and averaging operators

Author

Li Guo, Shanghua Zheng, and Markus Rosenkranz

Subjects

Polynomial, Pure mathematics, Monomial, General Mathematics, Commutative Algebra (math.AC), QA150, Operator (computer programming), QA372, Mathematics::Category Theory, Mathematics::Quantum Algebra, 16W99, 45N05, 47G10, 12H20, Classical Analysis and ODEs (math.CA), FOS: Mathematics, QA299, Connection (algebraic framework), Algebraic number, Mathematics, Mathematics::Commutative Algebra, Mathematics::Rings and Algebras, Mathematics - Rings and Algebras, Mathematics - Commutative Algebra, Injective function, Abstraction (mathematics), Nonlinear Sciences::Exactly Solvable and Integrable Systems, Mathematics - Classical Analysis and ODEs, Rings and Algebras (math.RA), Product (mathematics)

Abstract

Rota-Baxter operators are an algebraic abstraction of integration. Following this classical connection, we study the relationship between Rota-Baxter operators and integrals in the case of the polynomial algebra $\mathbf{k}[x]$. We consider two classes of Rota-Baxter operators, monomial ones and injective ones. For the first class, we apply averaging operators to determine monomial Rota-Baxter operators. For the second class, we make use of the double product on Rota-Baxter algebras., Comment: 20 pages

Published

2015

12. A quadratic Poisson Gel’fand-Kirillov problem in prime characteristic

Author

Stéphane Launois and Cesar Lecoutre

Subjects

Discrete mathematics, Applied Mathematics, General Mathematics, Discrete Poisson equation, Mathematics - Rings and Algebras, Poisson distribution, Mathematics - Algebraic Geometry, symbols.namesake, Poisson bracket, QA150, Compound Poisson distribution, Uniqueness theorem for Poisson's equation, Rings and Algebras (math.RA), Poisson manifold, QA440, Mathematics - Quantum Algebra, FOS: Mathematics, symbols, Quantum Algebra (math.QA), Fractional Poisson process, Algebraic Geometry (math.AG), Mathematics, Poisson algebra

Abstract

The quadratic Poisson Gel'fand-Kirillov problem asks whether the field of fractions of a Poisson algebra is Poisson birationally equivalent to a Poisson affine space, i.e. to a polynomial algebra $\K[X_1,..., X_n]$ with Poisson bracket defined by $\{X_i,X_j\}=\lambda_{ij} X_iX_j$ for some skew-symmetric matrix $(\lambda_{ij}) \in M_n(\K)$. This problem was studied in \cite{GL} over a field of characteristic 0 by using a Poisson version of the deleting-derivations algorithm of Cauchon. In this paper, we study the quadratic Poisson Gel'fand-Kirillov problem over a field of arbitrary characteristic. In particular, we prove that the quadratic Poisson Gel'fand-Kirillov problem is satisfied for a large class of Poisson algebras arising as semiclassical limits of quantised coordinate rings. For, we introduce the concept of {\it higher Poisson derivation} which allows us to extend the Poisson version of the deleting-derivations algorithm from the characteristic 0 case to the case of arbitrary characteristic. When a torus is acting rationally by Poisson automorphisms on a Poisson polynomial algebra arising as the semiclassical limit of a quantised coordinate ring, we prove (under some technical assumptions) that quotients by Poisson prime torus-invariant ideals also satisfy the quadratic Poisson Gel'fand-Kirillov problem. In particular, we show that coordinate rings of determinantal varieties satisfy the quadratic Poisson Gel'fand-Kirillov problem., Comment: 39 pages, revised version (typo correction and more details in the introduction)

Published

2015

13. Vector invariants for the two-dimensional modular representation of a cyclic group of prime order

Author

R. J. Shank, H. E. A. Campbell, and David L. Wehlau

Subjects

Mathematics(all), Mathematics::Number Theory, General Mathematics, Cyclic group, Commutative Algebra (math.AC), Combinatorics, QA150, FOS: Mathematics, First main theorem, Representation Theory (math.RT), Mathematics, Discrete mathematics, Finite group, Ring (mathematics), Group (mathematics), SAGBI bases, Order (ring theory), 13A50, Mathematics - Commutative Algebra, Dyck paths, Modular invariant theory, Generating set of a group, Indecomposable module, Mathematics - Representation Theory, Generator (mathematics)

Abstract

In this paper, we study the vector invariants, ${\bf{F}}[m V_2]^{C_p}$, of the 2-dimensional indecomposable representation $V_2$ of the cylic group, $C_p$, of order $p$ over a field ${\bf{F}}$ of characteristic $p$. This ring of invariants was first studied by David Richman \cite{richman} who showed that this ring required a generator of degree $m(p-1)$, thus demonstrating that the result of Noether in characteristic 0 (that the ring of invariants of a finite group is always generated in degrees less than or equal to the order of the group) does not extend to the modular case. He also conjectured that a certain set of invariants was a generating set with a proof in the case $p=2$. This conjecture was proved by Campbell and Hughes in \cite{campbell-hughes}. Later, Shank and Wehlau in \cite{cmipg} determined which elements in Richman's generating set were redundant thereby producing a minimal generating set. We give a new proof of the result of Campbell and Hughes, Shank and Wehlau giving a minimal algebra generating set for the ring of invariants ${\bf{F}}[m V_2]^{C_p}$. In fact, our proof does much more. We show that our minimal generating set is also a SAGBI basis for ${\bf{F}}[m V_2]^{C_p}$. Further, our techniques also serve to give an explicit decomposition of ${\bf{F}}[m V_2]$ into a direct sum of indecomposable $C_p$-modules. Finally, noting that our representation of $C_p$ on $V_2$ is as the $p$-Sylow subgroup of $SL_2({\bf F}_p)$, we are able to determine a generating set for the ring of invariants of ${\bf{F}}[m V_2]^{SL_2({\bf F}_p)}$.

Published

2010

14. Prime ideals in the quantum grassmannian

Author

T. H. Lenagan, L. Rigal, and Stéphane Launois

Subjects

Discrete mathematics, Root of unity, General Mathematics, Spectrum (functional analysis), General Physics and Astronomy, Torus, Mathematics - Rings and Algebras, Prime (order theory), Quantitative Biology::Cell Behavior, Combinatorics, QA150, Mathematics::Algebraic Geometry, Rings and Algebras (math.RA), Grassmannian, QA165, Mathematics - Quantum Algebra, FOS: Mathematics, Quantum Algebra (math.QA), Mathematics - Combinatorics, Combinatorics (math.CO), Cell decomposition, QA, Mathematics::Representation Theory, Quantum, Mathematics

Abstract

We consider quantum Schubert cells in the quantum grassmannian and give a cell decomposition of the prime spectrum via the Schubert cells. As a consequence, we show that all primes are completely prime in the generic case where the deformation parameter q is not a root of unity. There is a torus H that acts naturally on the quantum grassmannian and the cell decomposition of the set of H-primes leads to a parameterisation of the H-spectrum via certain diagrams on partitions associated to the Schubert cells. Interestingly, the same parameterisation occurs for the non-negative cells in recent studies concerning the totally non-negative grassmannian. Finally, we use the cell decomposition to establish that the quantum grassmannian satisfies normal separation and catenarity., 25 pages

Published

2008

15. A family of modules with Specht and dual Specht filtrations

Author

Rowena Paget

Subjects

Discrete mathematics, Pure mathematics, Algebra and Number Theory, Specht module, Young symmetrizer, Brauer algebra, Permutation, QA150, Conjugacy class, Mathematics::K-Theory and Homology, Symmetric group, Cellular algebra, Mathematics::Representation Theory, Indecomposable module, Filtration, Mathematics

Abstract

We study the permutation module arising from the action of the symmetric group S 2 n on the conjugacy class of fixed-point-free involutions, defined over an arbitrary field. The indecomposable direct summands of these modules are shown to possess filtrations by Specht modules and also filtrations by dual Specht modules. We see that these provide counterexamples to a conjecture by Hemmer. Twisted permutation modules are also considered, as is an application to the Brauer algebra.

Published

2007

16. Modular group actions on algebras and p-local Galois extensions for finite groups

Author

Peter Fleischmann and Chris F. Woodcock

Subjects

Discrete mathematics, Finite group, Pure mathematics, Algebra and Number Theory, G-module, Cyclic group, QA150, Matrix group, QA171, Field extension, Symmetric group, 16R30, 20G05, 13A50, FOS: Mathematics, Representation Theory (math.RT), Abelian group, Mathematics - Representation Theory, Mathematics, Group ring

Abstract

Let k be a field of positive characteristic p and let G be a finite group. In this paper we study the category TsG of finitely generated commutative k-algebras A on which G acts by algebra automorphisms with surjective trace. If A = k[X], the ring of regular functions of a variety X, then trace-surjective group actions on A are characterized geometrically by the fact that all point stabilizers on X are p'-subgroups or, equivalently, that A is a Galois extension of the ring of P invariants for every Sylow p-group P of G. We investigate categorical properties, using a version of Frobenius-reciprocity for group actions on k-algebras, which is based on tensor induction for modules. We also describe projective generators in TsG , extending and generalizing the investigations started in [8], [7] and [9] in the case of p-groups. As an application we show that for an abelian or p-elementary group G and k large enough, there is always a faithful (possibly nonlinear) action on a polynomial ring such that the ring of invariants is also a polynomial ring. This would be false for linear group actions by a result of Serre. For p-solvable groups we obtain a structure theorem on trace-surjective algebras, generalizing the corresponding result for p-groups in [8]., 23 pages, accepted by J. of Algebra

Published

2015

17. A torsion theory in the category of cocommutative Hopf algebras

Author

Joost Vercruysse, Marino Gran, Gabriel Kadjo, and UCL - SST/IRMP - Institut de recherche en mathématique et physique

Subjects

Pure mathematics, General Computer Science, Semi-abelian category, Category of groups, 01 natural sciences, Theoretical Computer Science, QA150, Mathematics::K-Theory and Homology, Torsion theory, Mathematics::Category Theory, 0103 physical sciences, Mathematics - Quantum Algebra, FOS: Mathematics, Quantum Algebra (math.QA), Category Theory (math.CT), 0101 mathematics, Mathematics, Algebra and Number Theory, 010102 general mathematics, Mathematics - Category Theory, 18E40, 18E10, 20J99, 16T05, 16S40, torsion theory, Mathematics - Rings and Algebras, Hopf algebra, Rings and Algebras (math.RA), Torsion (algebra), 010307 mathematical physics, cocommutative Hopf algebra

Abstract

The purpose of this article is to prove that the category of cocommutative Hopf $K$-algebras, over a field $K$ of characteristic zero, is a semi-abelian category. Moreover, we show that this category is action representable, and that it contains a torsion theory whose torsion-free and torsion parts are given by the category of groups and by the category of Lie $K$-algebras, respectively.

Published

2015

18. Poisson algebras via model theory and differential-algebraic geometry

Author

Omar León Sánchez, Jason P. Bell, Rahim Moosa, and Stéphane Launois

Subjects

Model theory, Pure mathematics, General Mathematics, Poisson distribution, 01 natural sciences, symbols.namesake, Mathematics - Algebraic Geometry, QA150, 0103 physical sciences, Mathematics - Quantum Algebra, FOS: Mathematics, Quantum Algebra (math.QA), Representation Theory (math.RT), 0101 mathematics, Mathematics::Representation Theory, Algebraic Geometry (math.AG), Equivalence (measure theory), Mathematics, Poisson algebra, Applied Mathematics, 010102 general mathematics, Mathematics::Rings and Algebras, Mathematics - Rings and Algebras, Primitive ideal, Noncommutative geometry, Rings and Algebras (math.RA), Mathematics - Symplectic Geometry, symbols, Symplectic Geometry (math.SG), 010307 mathematical physics, Krull dimension, QA564, Differential algebraic geometry, Mathematics - Representation Theory

Abstract

Brown and Gordon asked whether the Poisson Dixmier-Moeglin equivalence holds for any complex affine Poisson algebra; that is, whether the sets of Poisson rational ideals, Poisson primitive ideals, and Poisson locally closed ideals coincide. In this article a complete answer is given to this question using techniques from differential-algebraic geometry and model theory. In particular, it is shown that while the sets of Poisson rational and Poisson primitive ideals do coincide, in every Krull dimension at least four there are complex affine Poisson algebras with Poisson rational ideals that are not Poisson locally closed. These counterexamples also give rise to counterexamples to the classical (noncommutative) Dixmier-Moeglin equivalence in finite $\operatorname{GK}$ dimension. A weaker version of the Poisson Dixmier-Moeglin equivalence is proven for all complex affine Poisson algebras, from which it follows that the full equivalence holds in Krull dimension three or less. Finally, it is shown that everything, except possibly that rationality implies primitivity, can be done over an arbitrary base field of characteristic zero., 28 pages; v2: minor changes; accepted for publication in Journal of the European Mathematical Society

Published

2014

19. Quantum Product and Parabolic Orbits in Homogeneous Spaces

Author

Clélia Pech, Institut Fourier (IF ), Centre National de la Recherche Scientifique (CNRS)-Université Grenoble Alpes [2016-2019] (UGA [2016-2019]), Institut Fourier (IF), and Centre National de la Recherche Scientifique (CNRS)-Université Grenoble Alpes (UGA)

Subjects

Discrete mathematics, Pure mathematics, 14M17, 14N35, Algebra and Number Theory, Hasse diagram, quantum product, Stratification (mathematics), Mathematics - Algebraic Geometry, QA150, Hyperplane, Homogeneous, Homogeneous space, FOS: Mathematics, [MATH.MATH-AG]Mathematics [math]/Algebraic Geometry [math.AG], QA564, homogeneous varieties, Algebraic Geometry (math.AG), Quantum, parabolic orbits, Mathematics

Abstract

Chaput, Manivel and Perrin proved a formula describing the quantum product by Schubert classes associated to cominuscule weights in a rational projective homogeneous space X. In the case where X has Picard rank one, we link this formula to the stratification of X by P-orbits, where P is the parabolic subgroup associated to the cominuscule weight. We deduce a decomposition of the Hasse diagram of X, i.e the diagram describing the cup-product with the hyperplane class., 19 pages, 3 figures

Published

2014

20. Quantisation Spaces of Cluster Algebras

Author

Philipp Lampe and Florian Gellert

Subjects

Pure mathematics, General Mathematics, 0102 computer and information sciences, 01 natural sciences, 13F60, Cluster algebra, High Energy Physics::Theory, Quantum Cluster Algebra, QA150, Mathematics::Quantum Algebra, Mathematics - Quantum Algebra, FOS: Mathematics, Quantum Algebra (math.QA), Mathematics - Combinatorics, Uniqueness, 0101 mathematics, Quantisation, Mathematics::Representation Theory, Mathematics, 010102 general mathematics, Cluster Algebra, 010201 computation theory & mathematics, QA165, Generating set of a group, Exchange matrix, Combinatorics (math.CO), Construct (philosophy)

Abstract

The article concerns the existence and uniqueness of quantisations of cluster algebras. We prove that cluster algebras with an initial exchange matrix of full rank admit a quantisation in the sense of Berenstein-Zelevinsky and give an explicit generating set to construct all quantisations.

Published

2014

21. Discrete integrable systems and Poisson algebras from cluster maps

Author

Andrew N.W. Hone and Allan P. Fordy

Subjects

Pure mathematics, Integrable system, Nonlinear Sciences - Exactly Solvable and Integrable Systems, Quiver, Complex system, FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Poisson distribution, QC20, Poisson bracket, Nonlinear system, symbols.namesake, QA150, Mathematics - Quantum Algebra, symbols, FOS: Mathematics, 17B63, 37K10, 37P05, Quantum Algebra (math.QA), Algebraic number, Invariant (mathematics), Exactly Solvable and Integrable Systems (nlin.SI), Mathematical Physics, Mathematics

Abstract

We consider nonlinear recurrences generated from cluster mutations applied to quivers that have the property of being cluster mutation-periodic with period 1. Such quivers were completely classified by Fordy and Marsh, who characterised them in terms of the skew-symmetric matrix that defines the quiver. The associated nonlinear recurrences are equivalent to birational maps, and we explain how these maps can be endowed with an invariant Poisson bracket and/or presymplectic structure. Upon applying the algebraic entropy test, we are led to a series of conjectures which imply that the entropy of the cluster maps can be determined from their tropical analogues, which leads to a sharp classification result. Only four special families of these maps should have zero entropy. These families are examined in detail, with many explicit examples given, and we show how they lead to discrete dynamics that is integrable in the Liouville-Arnold sense., Comment: 49 pages, 3 figures. Reduced to satisfy journal page restrictions. Sections 2.4, 4.5, 6.3, 7 and 8 removed. All other results remain, with minor editing

Published

2014

22. Quantum cluster algebras of type A and the dual canonical basis

Author

Philipp Lampe

Subjects

Pure mathematics, Weyl group, General Mathematics, Subalgebra, Universal enveloping algebra, Bilinear form, Representation theory, Cluster algebra, symbols.namesake, QA150, QA171, Mathematics::Quantum Algebra, Lie algebra, Standard basis, symbols, FOS: Mathematics, Representation Theory (math.RT), Mathematics::Representation Theory, Mathematics - Representation Theory, 13F60 (Primary) 17B37, 16G20 (Secondary), Mathematics

Abstract

The article concerns the subalgebra U_v^+(w) of the quantized universal enveloping algebra of the complex Lie algebra sl_{n+1} associated with a particular Weyl group element of length 2n. We verify that U_v^+(w) can be endowed with the structure of a quantum cluster algebra of type A_n. The quantum cluster algebra is a deformation of the ordinary cluster algebra Geiss-Leclerc-Schroeer attached to w using the representation theory of the preprojective algebra. Furthermore, we prove that the quantum cluster variables are, up to a power of v, elements in the dual of Lusztig's canonical basis under Kashiwara's bilinear form., 48 pages

Published

2013

23. A family of linearisable recurrences with the Laurent property

Author

Chloe Ward and Andrew N.W. Hone

Subjects

Pure mathematics, Constant coefficients, Property (philosophy), Nonlinear Sciences - Exactly Solvable and Integrable Systems, General Mathematics, FOS: Physical sciences, Mathematical Physics (math-ph), QC20, Cluster algebra, symbols.namesake, QA150, Monodromy, Chain (algebraic topology), Iterated function, symbols, Exactly Solvable and Integrable Systems (nlin.SI), Connection (algebraic framework), 11B37 (primary), 13F60, 37J35 (secondary), QA, Schrödinger's cat, Mathematical Physics, Mathematics

Abstract

We consider a family of nonlinear recurrences with the Laurent property. Although these recurrences are not generated by mutations in a cluster algebra, they fit within the broader framework of Laurent phenomenon algebras, as introduced recently by Lam and Pylyavskyy. Furthermore, each member of this family is shown to be linearisable in two different ways, in the sense that its iterates satisfy both a linear relation with constant coefficients and a linear relation with periodic coefficients. Associated monodromy matrices and first integrals are constructed, and the connection with the dressing chain for Schrodinger operators is also explained., 13 pages, LMS style file

Published

2013

24. Symplectic Maps from Cluster Algebras

Author

Andrew N.W. Hone and Allan P. Fordy

Subjects

algebraic entropy, FOS: Physical sciences, Cluster algebra, Combinatorics, Integer matrix, QA150, Laurent property, Mathematical Physics, Mathematics, Poisson algebra, Recurrence relation, Nonlinear Sciences - Exactly Solvable and Integrable Systems, lcsh:Mathematics, Quiver, tropical, integrable maps, Mathematical Physics (math-ph), lcsh:QA1-939, QC20, Iterated function, Geometry and Topology, Affine transformation, Exactly Solvable and Integrable Systems (nlin.SI), Analysis, Symplectic geometry, cluster algebra

Abstract

We consider nonlinear recurrences generated from the iteration of maps that arise from cluster algebras. More precisely, starting from a skew-symmetric integer matrix, or its corresponding quiver, one can define a set of mutation operations, as well as a set of associated cluster mutations that are applied to a set of affine coordinates (the cluster variables). Fordy and Marsh recently provided a complete classification of all such quivers that have a certain periodicity property under sequences of mutations. This periodicity implies that a suitable sequence of cluster mutations is precisely equivalent to iteration of a nonlinear recurrence relation. Here we explain briefly how to introduce a symplectic structure in this setting, which is preserved by a corresponding birational map (possibly on a space of lower dimension). We give examples of both integrable and non-integrable maps that arise from this construction. We use algebraic entropy as an approach to classifying integrable cases. The degrees of the iterates satisfy a tropical version of the map.

Published

2011

25. A quantum cluster algebra of Kronecker type and the dual canonical basis

Author

Philipp Lampe

Subjects

Pure mathematics, General Mathematics, Subalgebra, Mathematics::Rings and Algebras, Universal enveloping algebra, 05E10 (Primary) 17B37, 13F60 (Secondary), Basis (universal algebra), Type (model theory), Cluster algebra, Nilpotent, QA150, QA171, Mathematics::Quantum Algebra, Lie algebra, Standard basis, Mathematics - Quantum Algebra, FOS: Mathematics, Quantum Algebra (math.QA), Representation Theory (math.RT), Mathematics::Representation Theory, Mathematics - Representation Theory, Mathematics

Abstract

The article concerns the dual of Lusztig's canonical basis of a subalgebra of the positive part U_q(n) of the universal enveloping algebra of a Kac-Moody Lie algebra of type A_1^{(1)}. The examined subalgebra is associated with a terminal module M over the path algebra of the Kronecker quiver via an Weyl group element w of length four. Geiss-Leclerc-Schroeer attached to M a category C_M of nilpotent modules over the preprojective algebra of the Kronecker quiver together with an acyclic cluster algebra A(C_M). The dual semicanonical basis contains all cluster monomials. By construction, the cluster algebra A(C_M) is a subalgebra of the graded dual of the (non-quantized) universal enveloping algebra U(n). We transfer to the quantized setup. Following Lusztig we attach to w a subalgebra U_q^+(w) of U_q(n). The subalgebra is generated by four elements that satisfy straightening relations; it degenerates to a commutative algebra in the classical limit q=1. The algebra U_q^+(w) possesses four bases, a PBW basis, a canonical basis, and their duals. We prove recursions for dual canonical basis elements. The recursions imply that every cluster variable in A(C_M) is the specialization of the dual of an appropriate canonical basis element. Therefore, U_q^+(w) is a quantum cluster algebra in the sense of Berenstein-Zelevinsky. Furthermore, we give explicit formulae for the quantized cluster variables and for expansions of products of dual canonical basis elements., 32 pages

Published

2010

26. Decomposing symmetric powers of certain modular representations of cyclic groups

Author

David L. Wehlau, R. James Shank, Campbell, Eddy, Helminck, Aloysius G., Kraft, Hanspeter, and Wehlau, David L.

Subjects

Discrete mathematics, Pure mathematics, Modular representation theory, Ring (mathematics), 010102 general mathematics, 0102 computer and information sciences, 16. Peace & justice, 01 natural sciences, Invariant theory, Representation theory of the symmetric group, QA150, 010201 computation theory & mathematics, 0101 mathematics, Ring of symmetric functions, Simple module, Representation theory of finite groups, Mathematics, Group ring

Abstract

For a prime number p, we construct a generating set for the ring of invariants for the p+1 dimensional indecomposable modular representation of a cyclic group of order p 2, and show that the Noether number for the representation is p 2 + p−3. We then use the constructed invariants to explicitly describe the decomposition of the symmetric algebra as a module over the group ring, confirming the Periodicity Conjecture of Ian Hughes and Gregor Kemper for this case. In the final section, we use our results to compute the Hilbert series for the corresponding ring of invariants together with some other related generating functions.

Published

2009

27. Cohomological stratification of diagram algebras

Author

Rowena Paget, Robert Hartmann, Steffen Koenig, and Anne Henke

Subjects

Discrete mathematics, Pure mathematics, Quantum group, General Mathematics, Non-associative algebra, Schur algebra, Quadratic algebra, symbols.namesake, Interior algebra, QA150, Frobenius algebra, symbols, Nest algebra, Brauer group, Mathematics

Abstract

The class of cellularly stratified algebras is defined and shown to include large classes of diagram algebras. While the definition is in combinatorial terms, by adding extra structure to Graham and Lehrer’s definition of cellular algebras, various structural properties are established in terms of exact functors and stratifications of derived categories. The stratifications relate ‘large’ algebras such as Brauer algebras to ‘smaller’ ones such as group algebras of symmetric groups. Among the applications are relative equivalences of categories extending those found by Hemmer and Nakano and by Hartmann and Paget, as well as identities between decomposition numbers and cohomology groups of ‘large’ and ‘small’ algebras.

Published

2009

28. Laurent Polynomials and Superintegrable Maps

Author

Andrew N.W. Hone

Subjects

Property (philosophy), Integrable system, Laurent series, Structure (category theory), FOS: Physical sciences, Somos sequences, QA150, Quartic function, FOS: Mathematics, Number Theory (math.NT), Mathematical Physics, Laurent property, Mathematics, Mathematics - Number Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems, Diophantine equation, Laurent polynomial, lcsh:Mathematics, integrable maps, Mathematical Physics (math-ph), lcsh:QA1-939, QC20, Algebra, QA241, Geometry and Topology, Exactly Solvable and Integrable Systems (nlin.SI), Focus (optics), Analysis

Abstract

This article is dedicated to the memory of Vadim Kuznetsov, and begins with some of the author's recollections of him. Thereafter, a brief review of Somos sequences is provided, with particular focus being made on the integrable structure of Somos-4 recurrences, and on the Laurent property. Subsequently a family of fourth-order recurrences that share the Laurent property are considered, which are equivalent to Poisson maps in four dimensions. Two of these maps turn out to be superintegrable, and their iteration furnishes infinitely many solutions of some associated quartic Diophantine equations., Comment: This is a contribution to the Vadim Kuznetsov Memorial Issue on Integrable Systems and Related Topics, published in SIGMA (Symmetry, Integrability and Geometry: Methods and Applications) at http://www.emis.de/journals/SIGMA/

Published

2007

29. On the coinvariants of modular representations of cyclic groups of prime order

Author

Müfit Sezer and R. James Shank

Subjects

Monomial, Pure mathematics, Ring (mathematics), Algebra and Number Theory, Mathematics::Commutative Algebra, Group (mathematics), Mathematics::Rings and Algebras, Cyclic group, Monomial basis, Gröbner basis, QA150, Ideal (ring theory), Indecomposable module, Mathematics::Representation Theory, Mathematics

Abstract

We consider the ring of coinvariants for modular representations of cyclic groups of prime order. For all cases for which explicit generators for the ring of invariants are known, we give a reduced Gröbner basis for the Hilbert ideal and the corresponding monomial basis for the coinvariants. We also describe the decomposition of the coinvariants as a module over the group ring. For one family of representations, we are able to describe the coinvariants despite the fact that an explicit generating set for the invariants is not known. In all cases our results confirm the conjecture of Harm Derksen and Gregor Kemper on degree bounds for generators of the Hilbert ideal. As an incidental result, we identify the coefficients of the monomials appearing in the orbit product of a terminal variable for the three-dimensional indecomposable representation.

Published

2006

30. Diophantine non-integrability of a third order recurrence with the Laurent property

Author

Andrew N.W. Hone

Subjects

Pure mathematics, Recurrence relation, Property (philosophy), Mathematics - Number Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems, Integrable system, Diophantine equation, General Physics and Astronomy, FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Conserved quantity, QC20, Third order, Singularity, QA150, Iterated function, QA241, FOS: Mathematics, QA101, Number Theory (math.NT), Exactly Solvable and Integrable Systems (nlin.SI), Mathematical Physics, Mathematics

Abstract

We consider a one-parameter family of third order nonlinear recurrence relations. Each member of this family satisfies the singularity confinement test, has a conserved quantity, and moreover has the Laurent property: all of the iterates are Laurent polynomials in the initial data. However, we show that these recurrences are not Diophantine integrable according to the definition proposed by Halburd. Explicit bounds on the asymptotic growth of the heights of iterates are obtained for a special choice of initial data. As a by-product of our analysis, infinitely many solutions are found for a certain family of Diophantine equations, studied by Mordell, that includes Markoff's equation., Comment: 7 pages; statement of Proposition 2 and minor typos corrected. To appear in J. Phys. A: Math. Gen

Published

2006

31. Endomorphisms of Quantum Generalized Weyl Algebras

Author

Stéphane Launois and Andrew P. Kitchin

Subjects

Pure mathematics, Weyl algebra, Ring (mathematics), Endomorphism, Laurent polynomial, Mathematics::Rings and Algebras, Statistical and Nonlinear Physics, Mathematics - Rings and Algebras, Automorphism, QA150, Rings and Algebras (math.RA), Simple (abstract algebra), Mathematics - Quantum Algebra, FOS: Mathematics, Quantum Algebra (math.QA), QA, Mathematics::Representation Theory, Commutative property, Quotient, Mathematical Physics, Mathematics

Abstract

We prove that every endomorphism of a simple quantum generalized Weyl algebra $A$ over a commutative Laurent polynomial ring in one variable is an automorphism. This is achieved by obtaining an explicit classification of all endomorphisms of $A$. Our main result applies to minimal primitive factors of the quantized enveloping algebra of $U_q(\mathfrak{sl}_2)$ and certain minimal primitive quotients of the positive part of $U_q(\mathfrak{so}_5)$., 11 pages

32. The input–output relationship approach to structural identifiability analysis

Author

Neil D. Evans, Daniel Bearup, and Michael J. Chappell

Subjects

Male, Models, Molecular, Monomial, Mathematical optimization, Relation (database), Health Informatics, Differential algebra, QA150, Simple (abstract algebra), Computational methods, Humans, QA276, Identifiability, QA, Mathematics, Input/output, Enzyme kinetics, United Kingdom, Enzymes, Computer Science Applications, Nonlinear system, Nonlinear Dynamics, Biocatalysis, Linear independence, Algorithms, Software

Abstract

Analysis of the identifiability of a given model system is an essential prerequisite to the determination of model parameters from physical data. However, the tools available for the analysis of non-linear systems can be limited both in applicability and by computational intractability for any but the simplest of models. The input–output relation of a model summarises the input–output structure of the whole system and as such provides the potential for an alternative approach to this analysis. However for this approach to be valid it is necessary to determine whether the monomials of a differential polynomial are linearly independent. A simple test for this property is presented in this work. The derivation and analysis of this relation can be implemented symbolically within Maple. These techniques are applied to analyse classical models from biomedical systems modelling and those of enzyme catalysed reaction schemes.