Simplicity criteria for rings of differential operators

Abstract

Let K be a field of arbitrary characteristic, be a commutative K-algebra which is a domain of essentially finite type (eg, the algebra of functions on an irreducible affine algebraic variety), r be its Jacobian ideal, ( ) be the algebra of differential operators on the algebra . The aim of the paper is to give a simplicity criterion for the algebra ( ): The algebra ( ) is simple iff ( ) ri ( )= ( ) for all i≥ 1 provided the field K is a perfect field. Furthermore, a simplicity criterion is given for the algebra (R) of differential operators on an arbitrary commutative algebra R over an arbitrary field. This gives an answer to an old question to find a simplicity criterion for algebras of differential operators.