Principal construction of the toroidal Lie algebra of type(A_1)

We give vertex operator constructions for the toroidal Lie algebra of type B l ν ≥ 1 l ≥ 2 . We prove that the subquotients of the modules are completely reducible, and give the irreducible decomposition.

Let \(L\) be any one of \(W(n, 1), S(n, 1), H(n, 1)\), and \(K(n, 1)\) over an algebraically closed field \(F\) of characteristic \(p>3\). In this paper, we extend the results concerning modular representations of classical Lie algebras and semisimple groups to the case of \(L\) and obtain some prop

The cores of extended affine Lie algebras of reduced types were classified except for type A 1 . In this paper we determine the coordinate algebra of extended affine Lie algebras of type A 1 . It turns out that such an algebra is a unital n -graded Jordan algebra of a certain type, called a Jordan t