The algebra of polynomial integro-differential operators is a holonomic bimodule over the subalgebra of polynomial differential operators

Abstract

In contrast to its subalgebra An:=K<x1, ..., xn, x1, ..., xn> of polynomial differential operators (i.e. the n'th Weyl algebra), the algebra n:=K<x1, ..., xn, x1, ..., xn, ∫1, ..., ∫n> of polynomial integro-differential operators is neither left nor right Noetherian algebra; moreover it contains infinite direct sums of nonzero left and right ideals. It is proved that n is a left (right) coherent algebra iff n=1; the algebra n is a holonomic An-bimodule of length 3n and has multiplicity 3n, and all 3n simple factors of n are pairwise non-isomorphic An-bimodules. The socle length of the An-bimodule n is n+1, the socle filtration is found, and the m'th term of the socle filtration has length n m2n-m. This fact gives a new canonical form for each polynomial integro-differential operator. It is proved that the algebra n is the maximal left (resp. right) order in the largest left (resp. right) quotient ring of the algebra n.