REFERENCES
- Anderson , D. D. , Camillo , V. ( 1998 ). Armendariz rings and Gaussian rings . Comm. Algebra 26 : 2265 – 2272 .
- Anderson , D. D. , Camillo , V. ( 1999 ). Semigroups and rings whose zero products commute . Comm. Algebra 27 : 2847 – 2852 .
- Armendariz , E. P. ( 1974 ). A note on extensions of Baer and P.P.-rings . J. Aust. Math. Soc. 18 : 470 – 473 .
- Clark , W. E. ( 1967 ). Twisted matrix units semigroup algebras . Duke Math. J. 34 : 417 – 424 .
- Cohn , P. M. ( 1999 ). Reversible rings . Bull. London Math. Soc. 31 : 641 – 648 .
- Dorroh , J. L. ( 1932 ). Concerning adjunctins to algebras . Bull. Amer. Math. Soc. 38 : 85 – 88 .
- Eldridge , K. E. ( 1966 ). Orders for finite noncommutative rings with unity . Amer. Math. Monthly 73 : 376 – 377 .
- Hirano , Y. ( 2002 ). On annihilator ideals of a polynomial ring over a noncommutative ring . J. Pure Appl. Algebra 168 : 45 – 52 .
- Hong , C. Y. , Kim , N. K. , Kwak , T. K. ( 2000 ). Ore extensions of Baer and p.p.-rings . J. Pure Appl. Algebra 151 : 215 – 226 .
- Huh , C. , Kim , H. K. , Lee , Y. ( 2002 ). p.p. rings and generalized p.p. rings . J. Pure Appl. Algebra 167 : 37 – 52 .
- Huh , C. , Kim , H. K. , Kim , N. K. , Lee , Y. ( 2005 ). Basic examples and extensions of symmetric rings . J. Pure Appl. Algebra 202 : 154 – 167 .
- Kaplansky , I. ( 1968 ). Rings of Operators . New York : W. A. Benjamin .
- Kim , B.-O. , Lee , Y. ( 2011 ). Minimal noncommutative reversible and reflexive rings . Bull. Korean Math. Soc. 48 : 611 – 616 .
- Kim , N. K. , Lee , Y. ( 2000 ). Armendariz rings and reduced rings . J. Algebra 223 : 477 – 488 .
- Kim , N. K. , Lee , Y. ( 2003 ). Extensions of reversible rings . J. Pure Appl. Algebra 185 : 207 – 223 .
- Kruse , R. L. , Price , D. T. ( 1969 ). Nilpotent Rings . New York : Gordon and Breach .
- Kwak , T. K. , Lee , Y. ( 2012 ). Reflexive property of rings . Comm. Algebra 40 : 1576 – 1594 .
- Lambek , J. ( 1966 ). Lectures on Rings and Modules . Waltham : Blaisdell Publishing Company .
- Lambek , J. ( 1971 ). On the representation of modules by sheaves of factor modules . Canad. Math. Bull. 14 : 359 – 368 .
- Lee , T. K. , Zhou , Y. Q. ( 2004 ). Armendariz and reduced rings . Comm. Algebra 32 : 2287 – 2299 .
- Marks , G. ( 2002 ). Reversible and symmetric rings . J. Pure Appl. Algebra 174 : 311 – 318 .
- Mason , G. ( 1981 ). Reflexive ideals . Comm. Algebra 9 : 1709 – 1724 .
- McConnell , J. C. , Robson , J. C. ( 1987 ). Noncommutative Noetherian Rings . New York : John Wiley & Sons Ltd .
- Motais de Narbonne , L. ( 1982 ). Anneaux semi-commutatifs et unis riels anneaux dont les id aux principaux sont idempotents. In: Proceedings of the 106th National Congress of Learned Societies (Perpignan, 1981), Bib. Nat. Paris pp. 71–73 .
- Rege , M. B. , Chhawchharia , S. ( 1997 ). Armendariz rings . Proc. Japan Acad. Ser. A Math. Sci. 73 : 14 – 17 .
- Shin , G. Y. ( 1973 ). Prime ideals and sheaf representation of a pseudo symmetric ring . Trans. Amer. Math. Soc. 184 : 43 – 60 .
- Xue , W. ( 1992 ). Structure of minimal noncommutative duo rings and minimal strongly bounded non-duo rings . Comm. Algebra 20 : 2777 – 2788 .
- Communicated by T. Albu.