Some Results on Triangular Coefficient Matrix Rings
Abstract
In this paper, we introduce the concept of a triangular coefficient matrix ring and investigate the structure of its ideals. We then characterize the radicals of the ring \( Rh[x]/ xn \) for every positive integer \( n \), where \( Rh[x] \) denotes the Hurwitz polynomial ring and \( xn \) represents the ideal of this ring generated by \( xn \). Furthermore, we explore several properties that are transferred between the base ring \( R \) and the matrix ring \( Hn(R) \) which is a proper subring of the triangular coefficient matrix ring.
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