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Communications in Algebra Volume 37, 2009 - Issue 1
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Original Articles

Uppers to Zero in Polynomial Rings and Prüfer-Like Domains

Gyu Whan Chang Department of Mathematics, University of Incheon, Incheon, Korea
&
Marco Fontana Department of Mathematics, University of Roma Tre, Rome, ItalyCorrespondence[email protected]
Pages 164-192 | Received 08 Jan 2007, Published online: 09 Oct 2009

REFERENCES

  • Atiyah , M. F. , Macdonald , I. G. ( 1969 ). Introduction to Commutative Algebra . Reading, Massachusetts : AddisonWesley .
  • Anderson , D. D. ( 1988 ). Star-operations induced by overrings . Comm. Algebra 16 : 2535 – 2553 .
  • Anderson , D. F. , Dobbs , D. E. , Fontana , M. ( 1989 ). On treed Nagata rings . J. Pure Appl. Algebra 61 : 107 – 122 .
  • Barucci , V. , Gabelli , S. ( 1987 ). How far is a Mori domain from being a Krull domain? . J. Pure Appl. Algebra 45 : 101 – 112 .
  • Ayache , A. , Cahen , P.-J. , Echi , O. ( 1996 ). Anneaux quasi-Prüfériens et P-anneaux . Boll. Un. Mat. Ital. 10-B : 1 – 24 .
  • Chang , G. W. ( 2006 ). *-Noetherian domains and the ring D[X] N * . J. Algebra 297 : 216 – 233 .
  • Chang , G. W. , Zafrullah , M. ( 2006 ). The w-integral closure of integral domains . J. Algebra 259 : 195 – 210 .
  • Dieudonné , J. ( 1941 ). Sur la théorie de la divisibilité . Bull. Soc. Math. France 69 : 133 – 144 .
  • De Souza Doering , A. , Lequain , Y. ( 1982 ). Chain of prime ideals in polynomial rings . J. Algebra 78 : 163 – 180 .
  • Dobbs , D. E. ( 1980 ). On INC-extensions and polynomials with unit content . Canad. Math. Bull. 23 : 37 – 42 .
  • Dobbs , D. E. , Houston , E. G. , Lucas , T. G. , Zafrullah , M. ( 1990 ). t-linked overrings as intersections of localizations . Proc. Amer. Math. Soc. 109 : 637 – 646 .
  • Dobbs , D. E. , Houston , E. G. , Lucas , T. G. , Zafrullah , M. ( 1989 ). t-linked overrings and Prüfer v-multiplication domains . Comm. Algebra 17 : 2835 – 2852 .
  • Dobbs , D. E. , Houston , E. G. , Lucas , T. G. , Roitman , M. , Zafrullah , M. ( 1992 ). On t-linked overrings . Comm. Algebra 20 : 1463 – 1488 .
  • Dumitrescu , T. ( 2001 ). A two-dimensional domain whose integral closure is not t-linked . An. St. Univ. Ovidius Constanţa 9 : 55 – 58 .
  • El Baghdadi , S. , Fontana , M. ( 2004 ). Semistar linkedness and flatness, Prüfer semistar multiplication domains . Comm. Algebra 32 : 1101 – 1126 .
  • El Baghdadi , S. , Fontana , M. , Picozza , G. ( 2004 ). Semistar Dedekind domains . J. Pure Appl. Algebra 193 : 27 – 60 .
  • Fontana , M. ( 1980 ). Topologically defined classes of commutative rings . Ann. Mat. Pure Appl. 123 : 331 – 355 .
  • Fontana , M. , Huckaba , J. A. ( 2000 ). Localizing systems and semistar operations . In: Chapman , S. T. , Glaz , S. , eds. Non-Noetherian Commutative Ring Theory . Kluwer Academic Publishers , pp. 169 – 198 .
  • Fontana , M. , Huckaba , J. , Papick , I. ( 1997 ). Prüfer Domains . New York : Marcel Dekker .
  • Fontana , M. , Jara , P. , Santos , E. ( 2003 ). Prüfer ☆-multiplication domains and semistar operations . J. Algebra Appl. 2 : 21 – 50 .
  • Fontana , M. , Gabelli , S. , Houston , E. ( 1998 ). UMT-domains and domains with Prüfer integral closure . Comm. Algebra 26 : 1017 – 1039 .
  • Fontana , M. , Loper , K. A. ( 2001a ). A Krull-type theorem for the semistar integral closure of an integral domain . ASJE Theme Issue Commutative Algebra 26 : 89 – 95 .
  • Fontana , M. , Loper , K. A. ( 2001b ). Kronecker Function Rings: A General Approach. Ideal Theoretic Methods in Commutative Algebra, Lecture Notes in Pure Appl. Math., 220 . Marcel Dekker , pp. 189 – 205
  • Fontana , M. , Loper , K. A. (2003). Nagata rings, Kronecker function rings and related semistar operations. Comm. Algebra 31:4775–4801.
  • Fontana , M. , Picozza , G. ( 2005 ). Semistar invertibility on integral domains . Algebra Colloq. 12 : 645 – 664 .
  • Fossum , R. M. ( 1973 ). The Divisor Class Group of a Krull Domain . Berlin : Springer .
  • Gilmer , R. ( 1972 ). Multiplicative Ideal Theory . New York : Marcel Dekker .
  • Gilmer , R. , Hoffmann , J. F. ( 1975 ). A characterization of Prüfer domains in terms of polynomials . Pacific J. Math. 60 : 81 – 85 .
  • Glaz , S. , Vasconcelos , W. V. ( 1977 ). Flat ideals, II . Manuscripta Math. 22 : 325 – 341 .
  • Griffin , M. ( 1967 ). Some results on v-multiplication rings . Canad. J. Math 19 : 710 – 722 .
  • Halter-Koch , F. ( 1997 ). Generalized integral closures . In: Anderson , D. D. ed. Factorization in Integral Domains . Lecture Notes Pure Appl. Math., 187 . Marcel Dekker , pp. 349 – 358 .
  • Halter-Koch , F. ( 1998 ). Ideal Systems: An Introduction to Multiplicative Ideal Theory . New York : Marcel Dekker .
  • Hedstrom , J. R. , Houston , E. G. ( 1978a ). Pseudo-valuation domains . Pacific J. Math. 75 : 137 – 147 .
  • Hedstrom , J. R. , Houston , E. G. ( 1978b ). Pseudo-valuation domains II . Houston J. Math. 4 : 199 – 207 .
  • Heinzer , W. , Ohm , J. , Pendleton , R. L. ( 1970 ). On integral domains of the form ∩D P , P minimal. J. Reine Angew Math. 241 : 150 – 159 .
  • Heinzer , W. ( 1981 ). An essential integral domain with a nonessential localization . Canad. J. Math. 23 : 400 – 403 .
  • Heinzer , W. , Ohm , J. ( 1972 ). An essential ring which is not a v-multiplication ring . Canad. J. Math. 21 : 856 – 861 .
  • Houston , E. ( 1994 ). Prime t-ideals in R[X] . In: Cahen , P.-J. , Costa , D. G. , Fontana , M. , Kabbaj , S.-E. , eds. Commutative Ring Theory . Lecture Notes Pure Appl. Math., 153 . Marcel Dekker , pp. 163 – 170 .
  • Houston , E. ( 2006 ). Uppers to zero in polynomial rings . In: Brewer , J. W. , Glaz , S. , Heinzer , W. J. , Olberding , B. M. , eds. Multiplicative Ideal Theory in Commutative Algebra. A Tribute to the Work of Robert Gilmer . Springer , pp. 243 – 261 .
  • Houston , E. , Malik , S. , Mott , J. ( 1984 ). Characterizations of *-multiplication domains . Canad. Math. Bull. 27 : 48 – 52 .
  • Houston , E. , Taylor , J. ( 2007 ). Arithmetic properties in pullbacks . J. Algebra 310 : 235 – 260 .
  • Houston , E. , Zafrullah , M. ( 1989 ). On t-invertibility, II . Comm. Algebra 17 : 1955 – 1969 .
  • Houston , E. , Zafrullah , M. ( 2005 ). UMV-domains . In: Arithmetical Properties of Commutative Rings and Monoids . Lecture Notes Pure Appl. Math., 241 . Chapman and Hall , pp. 304 – 315 .
  • Huckaba , J. ( 1988 ). Commutative Rings with Zero Divisors . New York : Marcel Dekker .
  • Jaffard , P. ( 1960 ). Les Systèmes d'Idéaux . Paris : Dunod .
  • Kang , B. G. ( 1989 ). Prüfer v-multiplication domains and the ring R[X] N v . J. Algebra 123 : 151 – 170 .
  • Kaplansky , I. ( 1974 ). Commutative Rings. , Revised ed . Chicago : University of Chicago .
  • Malik , S. , Mott , J. L. , Zafrullah , M. ( 1988 ). On t-invertibility . Comm. Algebra 16 : 149 – 170 .
  • Mimouni , A. ( 2005 ). Integral domains in which each ideal is a w-ideal . Comm. Algebra 33 : 1345 – 1355 .
  • Mott , J. L. , Zafrullah , M. ( 1981 ). On Prüfer v-multiplication domains . Manuscripta Math. 35 : 1 – 26 .
  • Okabe , A. , Matsuda , R. ( 1992 ). Star operations and generalized integral closures . Bull. Fac. Sci. Ibaraki Univ. 24 : 7 – 13 .
  • Okabe , A. , Matsuda , R. (1994). Semistar operations on integral domains. Math. J. Toyama Univ. 17:1–21.
  • Nagata , M. ( 1962 ). Local Rings . New York : Interscience .
  • Papick , I. J. ( 1983 ). Super-primitive elements . Pacific J. Math. 105 : 217 – 226 .
  • Picozza , G. ( 2004 ). Semistar Operations and Multiplicative Ideal Theory. Ph.D. Thesis , Università degli Studi “Roma Tre” .
  • Picozza , G. , Tartarone , F. ( 2008 ). When the semistar operation is the identity . Comm. Algebra 36 : 1954 – 1975 .
  • Wang , F. G. ( 2005 ). On t-dimension of Polynomial Rings . Chendu : Sichuan Normal University , Preprint .
  • Wang , F. G. ( 1999 ). w-dimension of a domain . Comm. Algebra 27 : 2267 – 2276 .
  • Wang , F. G. ( 2004 ). On induced operations and UMT-domains . Sichuan Shifan Daxue Xuebao Ziran Kexue Ban 27 : 1 – 9 .
  • Wang , F. G. , MacCasland , R. L. ( 1997 ). On w-modules over strong Mori domains . Comm. Algebra 25 : 1285 – 1306 .
  • Wang , F. G. , MacCasland , R. L. ( 1999 ). On strong Mori domains . J. Pure Appl. Algebra 135 : 155 – 165 .
  • Zafrullah , M. ( 2000 ). Putting t-invertibility to use . In: Chapman , S. T. , Glaz , S. , eds. Non-Noetherian Commutative Ring Theory . Kluwer Academic Publishers , pp. 429 – 457 .
  • Communicated by R. H. Villarreal.

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