-systems and -systems for quantum affinizations of quantum Kac-Moody algebras.
-гомоморфизмы колец
Tensor Products and Discriminants of Unital Quadratic Forms over Commutative Rings.
Tensor products of finite and infinite dimensional representations of semisimple Lie algebras
Ternärringe ohne Planaritätsbedingung
Ternary algebras and calculus of cubic matrices
We study associative ternary algebras and describe a general approach which allows us to construct various classes of ternary algebras. Applying this approach to a central bimodule with a covariant derivative we construct a ternary algebra whose ternary multiplication is closely related to the curvature of the covariant derivative. We also apply our approach to a bimodule over two associative (binary) algebras in order to construct a ternary algebra which we use to produce a large class of Lie algebras....
Ternary Jordan homomorphisms in -ternary algebras.
Test sets in free metabelian Lie algebras.
Tetrahedron equation and the algebraic geometry
The 3-manifold invariants of Witten and Reshetikhin-Turaev for sl (2, C).
The 3-state Potts model and Rogers-Ramanujan series
We explain the appearance of Rogers-Ramanujan series inside the tensor product of two basic A 2(2) -modules, previously discovered by the first author in [Feingold A.J., Some applications of vertex operators to Kac-Moody algebras, In: Vertex Operators in Mathematics and Physics, Berkeley, November 10–17, 1983, Math. Sci. Res. Inst. Publ., 3, Springer, New York, 1985, 185–206]. The key new ingredients are (5,6)Virasoro minimal models and twisted modules for the Zamolodchikov W 3-algebra.
The adjoint representation of group algebras and enveloping algebras.
In this paper we study the Hopf adjoint action of group algebras and enveloping algebras. We are particularly concerned with determining when these representations are faithful. Delta methods allow us to reduce the problem to certain better behaved subalgebras. Nevertheless, the problem remains open in the finite group and finite-dimensional Lie algebra cases.
The algebra of compact operators does not have any finite-codimensional ideal
The approximative centre of a Lie algebra.
The arithmetic theory of loop groups
The Atiyah extension of a Lie algebra deformation.
The automorphism group of the rank 2 Lie algebra free in the variety .
The automorphisms of generalized Witt type Lie algebras.
The Azéma martingales as components of quantum independent increment processes
The bar automorphism in quantum groups and geometry of quiver representations
Two geometric interpretations of the bar automorphism in the positive part of a quantized enveloping algebra are given. The first is in terms of numbers of rational points over finite fields of quiver analogues of orbital varieties; the second is in terms of a duality of constructible functions provided by preprojective varieties of quivers.