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A 2-category of chronological cobordisms and odd Khovanov homology

Krzysztof K. Putyra (2014)

Banach Center Publications

We create a framework for odd Khovanov homology in the spirit of Bar-Natan's construction for the ordinary Khovanov homology. Namely, we express the cube of resolutions of a link diagram as a diagram in a certain 2-category of chronological cobordisms and show that it is 2-commutative: the composition of 2-morphisms along any 3-dimensional subcube is trivial. This allows us to create a chain complex whose homotopy type modulo certain relations is a link invariant. Both the original and the odd Khovanov...

A $ℤ_{4}^{3}$ -grading on a $56$ -dimensional simple structurable algebra and related fine gradings on the simple Lie algebras of type $E$

Diego Aranda-Orna, Alberto Elduque, Mikhail Kochetov (2014)

Commentationes Mathematicae Universitatis Carolinae

We describe two constructions of a certain $ℤ_{4}^{3}$ -grading on the so-called Brown algebra (a simple structurable algebra of dimension $56$ and skew-dimension $1$ ) over an algebraically closed field of characteristic different from $2$ . The Weyl group of this grading is computed. We also show how this grading gives rise to several interesting fine gradings on exceptional simple Lie algebras of types $E_{6}$ , $E_{7}$ and $E_{8}$ .

A basic associativity theorem for alternative algebras

McCrimmon, Kevin (1979)

Portugaliae mathematica

A brief review of abelian categorifications.

Khovanov, Mikhail, Mazorchuk, Volodymyr, Stroppel, Catharina (2009)

Theory and Applications of Categories [electronic only]

A character approach to Looijenga's invariant theory for generalized root systems

Peter Slodowy (1985)

Compositio Mathematica

A characterization of coboundary Poisson Lie groups and Hopf algebras

Stanisław Zakrzewski (1997)

Banach Center Publications

We show that a Poisson Lie group (G,π) is coboundary if and only if the natural action of G×G on M=G is a Poisson action for an appropriate Poisson structure on M (the structure turns out to be the well known $π_{+}$ ). We analyze the same condition in the context of Hopf algebras. A quantum analogue of the $π_{+}$ structure on SU(N) is described in terms of generators and relations as an example.

A characterization of isoparametric hypersurfaces of Clifford type.

Immervoll, Stefan (2004)

Beiträge zur Algebra und Geometrie

A Characterization of the State Space of Quantum Mechanics

Huzihiro Araki (1980)

Recherche Coopérative sur Programme n°25

A class of fermionic Novikov superalgebras which is a class of Novikov superalgebras

Huibin Chen, Shaoqiang Deng (2018)

Czechoslovak Mathematical Journal

We construct a special class of fermionic Novikov superalgebras from linear functions. We show that they are Novikov superalgebras. Then we give a complete classification of them, among which there are some non-associative examples. This method leads to several new examples which have not been described in the literature.

A class of Lie and Jordan algebras realized by means of the canonical commutation relations

Hans Tilgner (1971)

Annales de l'I.H.P. Physique théorique

A Class of Nonassociative Algebras with Involution Containing the Class of Jordan Algebras.

B.N. Allison (1978)

Mathematische Annalen

A Class of Non-Standard Modules for Affine Lie Algebras.

Nolan R. Wallach (1987)

Mathematische Zeitschrift

A classification for real and complex finite dimensional $\mathcal{F}^{*}$ -algebras

Mauro Meschiari (1983)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

La presente Nota contiene una lista di $J^{\star}$ -algebre reali di dimensione finita ed una lista di $J^{\star}$ -algebre complesse di dimensione finita tali che: 1) due elementi distinti di ogni lista non sono mai $J^{\star}$ -isomorfi; 2) ogni $J^{\star}$ -algebra di dimensione finita reale (complessa) è $J^{\star}$ —isomorfa su $\mathbf{R}$ (su $\mathbf{C}$ ) alla somma diretta, finita, di $J^{\star}$ -algebre reali (complesse) elencate nella lista. In altre parole, diamo qui una classificazione completa delle $J^{\star}$ —algebre reali e delle $J^{\star}$ -algebre complesse di dimensione finita. Nel...

A classification of low dimensional multiplicative Hom-Lie superalgebras

Chunyue Wang, Qingcheng Zhang, Zhu Wei (2016)

Open Mathematics

We study a twisted generalization of Lie superalgebras, called Hom-Lie superalgebras. It is obtained by twisting the graded Jacobi identity by an even linear map. We give a complete classification of the complex multiplicative Hom-Lie superalgebras of low dimensions.

A classification of multiplicity free representations.

Leahy, Andrew S. (1998)

Journal of Lie Theory

A classification of Poisson homogeneous spaces of complex reductive Poisson-Lie groups

Eugene Karolinsky (2000)

Banach Center Publications

Let G be a complex reductive connected algebraic group equipped with the Sklyanin bracket. A classification of Poisson homogeneous G-spaces with connected isotropy subgroups is given. This result is based on Drinfeld's correspondence between Poisson homogeneous G-spaces and Lagrangian subalgebras in the double D𝖌 (here 𝖌 = Lie G). A geometric interpretation of some Poisson homogeneous G-spaces is also proposed.

A Clifford algebra approach to simple Lie algebras of real rank two. I: The $A_{2}$ case.

Ciatti, Paolo (2000)

Journal of Lie Theory

A cluster algebra approach to $q$ -characters of Kirillov–Reshetikhin modules

David Hernandez, Bernard Leclerc (2016)

Journal of the European Mathematical Society

We describe a cluster algebra algorithm for calculating $q$ -characters of Kirillov–Reshetikhin modules for any untwisted quantum affine algebra $U_{q} (\hat{𝔤})$ . This yields a geometric $q$ -character formula for tensor products of Kirillov–Reshetikhin modules. When $𝔤$ is of type $A, D, E$ , this formula extends Nakajima’s formula for $q$ -characters of standard modules in terms of homology of graded quiver varieties.

A combinatorial construction of $G_{2}$ .

Wildberger, N.J. (2003)

Journal of Lie Theory

A Comparison Theory for the Structure of Induced Representations II.

David H. Collingwood, Brian D. Boe (1985)

Mathematische Zeitschrift

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