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Abstract
The concept of a commutative and zero-divisor-free Euclidean ring, defined via an Euclidean function, has been generalized to arbitrary left Euclidean rings and than to various other structures as semirings, nearrings and semi-near-rings. As first shown in the dissertation (Hebisch, Citation1984), these different investigations can be combined considering arbitrary (2, 2)-algebras (S, +, ·), defined as left Euclidean in a suitable way. Here we present and investigate an improved version of this concept. Moreover, Motzkin (Citation1949) gave a criterion which characterizes a commutative and zero-divisor-free ring as Euclidean by certain chains of product ideals, without the use of Euclidean functions. In the central part of this paper we obtain a corresponding characterization and two further criterions, necessary and sufficient for an algebra (S, +, ·) to be left Euclidean. Based on this we prove several results on these algebras.
Mathematics Subject Classification:
Notes
Communicated by R. Wisbauer.