Matches in DBpedia 2015-10 for { ?s ?p "In commutative algebra, an integral domain Ais called an N−1 ring if its integral closure in its quotient field is a finitely generated A module. Itis called a Japanese ring (or an N−2 ring) if for everyfinite extension L of its quotient field K, the integral closure of A in L is a finitely generated A module (or equivalently a finite A-–algebra)."@en }
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- Nagata_ring comment "In commutative algebra, an integral domain Ais called an N−1 ring if its integral closure in its quotient field is a finitely generated A module. Itis called a Japanese ring (or an N−2 ring) if for everyfinite extension L of its quotient field K, the integral closure of A in L is a finitely generated A module (or equivalently a finite A-–algebra).".