Indecomposable generalized weight modules over the algebra of polynomial integro-differential operators

Abstract: For the algebra In = K x 1 , . . . , xn, ∂ 1 , . . . , ∂n, 1 , . . . , n of polynomial integrodifferential operators over a field K of characteristic zero, a classification of simple weight and generalized weight (left and right) In-modules is given. It is proven that the category of weight In-modules is semisimple. An explicit description of generalized weight In-modules is given and using it a criterion is obtained for the problem of classification of indecomposable generalized weight In-modules to be of fin… Show more

“…The algebra of polynomial integrodifferential operators was introduced in [1] and was studied extensively in [2][3][4][5][6]. Early in 2009, the author of [1] introduced the Jacobian algebra (see [7]) which has similar properties to the algebra I of polynomial integrodifferential operators and both algebras are ideally equivalent.…”

Relations of the Algebra of Polynomial Integrodifferential Operators

“…The algebra of polynomial integrodifferential operators was introduced in [1] and was studied extensively in [2][3][4][5][6]. Early in 2009, the author of [1] introduced the Jacobian algebra (see [7]) which has similar properties to the algebra I of polynomial integrodifferential operators and both algebras are ideally equivalent.…”

Relations of the Algebra of Polynomial Integrodifferential Operators