Note on P.P. Rings: (A Supplement to Hattori’s Paper)
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Publication:5726725
DOI10.1017/S0027763000002129zbMath0117.02203OpenAlexW1671692338MaRDI QIDQ5726725
Publication date: 1960
Published in: Nagoya Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/s0027763000002129
Related Items (40)
On weak Rickart modules ⋮ Generalizations of von Neumann regular rings, PP rings, and Baer rings ⋮ Unnamed Item ⋮ A generalization of lifting modules. ⋮ ON THE TOTAL GRAPH OF A COMMUTATIVE RING WITHOUT THE ZERO ELEMENT ⋮ Unnamed Item ⋮ Rings in Which the Annihilator of an Ideal Is Pure ⋮ Notes on reduced Rickart rings. I. Representation and equational axiomatizations ⋮ The n-zero-divisor graph of a commutative semigroup ⋮ Dual CS-Rickart modules over Dedekind domains ⋮ On right duo p.p. rings ⋮ On the Total Graph of a Ring and Its Related Graphs: A Survey ⋮ Almost quasi clean rings ⋮ Topologically defined classes of commutative rings ⋮ \(*\)-clean rings; some clean and almost clean Baer \(*\)-rings and von Neumann algebras. ⋮ A note on extensions of Baer and P. P. -rings ⋮ Direct sums of Rickart modules. ⋮ p.p. rings and reduced rings ⋮ Commutative group rings with von Neumann regular total rings of quotients. ⋮ Classes of almost clean rings. ⋮ ANNIHILATING CONTENT IN POLYNOMIAL AND POWER SERIES RINGS ⋮ Generalized GCD rings. IV ⋮ Quasi-Baer and biregular generalized matrix rings ⋮ Hereditary and semihereditary rings without nilpotent elements ⋮ Rings with projective principal right ideals ⋮ Comorphic rings ⋮ Structure theory of p.p. rings and their generalizations ⋮ π-Rickart rings ⋮ CS-Rickart modules. ⋮ Weakly principally quasi-Baer rings ⋮ p. p. rings and generalized p. p. rings ⋮ Generalized Quasi-Baer Rings ⋮ C(X): Something old and something new ⋮ Torsion-free and divisible modules over matrix rings ⋮ Rings with Projective Socle ⋮ s.Baer and s.Rickart Modules ⋮ Generalized APP-Rings ⋮ IDEALIZATION OF EM-HERMITE RINGS ⋮ On finitely generated projective ideals and Ohm condition ⋮ Abian's poset and the ordered monoid of annihilator classes in a reduced commutative ring
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