STRUCTURE OF CERTAIN PERIODIC RINGS AND NEAR-RINGS

Using commutativity of rings satisfying (xy)

n(x,y)

= xy proved by

Searcoid and MacHale [16], Ligh and Luh [13] have given a direct sum

decomposition for rings with the mentioned condition. Further Bell and

Ligh [9] sharpened the result and obtained a decomposition theorem for

2

ringswiththepropertyxy=(xy) f(x,y)wheref(X,Y)∈Z<X,Y >, the ring of polynomials in two noncommuting indeterminates. In the present paper we continue the study and investigate structure of certain rings and near rings satisfying the following condition which is more general than the mentioned conditions : xy = p(x,y), where p(x,y) is an admissible polynomial in Z < X,Y >. Moreover we deduce the commutativity of such rings.