The Ideals of Free Differential Algebras

We construct free group algebras in the quotient ring of the differential w x polynomial ring K X; ␦ , for suitable division rings K and nonzero derivations ␦ in K.

Insight on the structure of differential ideals defined by coherent autoreduced set allows one to uncouple the differential and algebraic computations in a decomposition algorithm. Original results as well as concise new proofs of already presented theorems are exposed. As a consequence, an effectiv

## Ideals in algebras of unbounded operators. I1 By W. TIMMERMANN of Leipzig (Eingegangen am 12. 5. 1978) This paper is part I1 of the investigations begun in [4]. There two classes of ideals in algebras of unbounded operators were defined: So(%) and M(S,(9), SF(9)), where @ is a symmetric norming

## Abstract Nest algebras provide examples of partial Jordan \*–triples. If __A__ is a nest algebra and __A__~__s__~ = __A__ ∩ A\*, where __A__\* is the set of the adjoints of the operators lying in __A__, then (__A__, __A__~__s__~) forms a partial Jordan \*–triple. Any weak\*–closed ideal in the n

Let F be a finite subset of the differential polynomial algebra k{y 1 , . . . , yn}. In order to determine membership in the radical differential ideal {F }, one is led to express {F } as the intersection of differential ideals of the form [P ] : M ∞ for suitable subsets P and M of k{y 1 , . . . , y

A duality is established between left and right ideals of a finite dimensional Grassmann algebra such that if under the duality a left ideal ᑣ and a right ideal J correspond then ᑣ is the left annihilator of J and J the right annihilator of ᑣ. Another duality is established for two-sided ideals of t