Abstract
In this paper, we survey David Anderson’s work on graded integral domains, with emphasis on Picard groups of graded integral domains, graded Krull domains, graded Prüfer v-multiplication domains, graded Prüfer domains, Nagata rings, and Kronecker function rings.
Dedicated to David F. Anderson
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References
D.D. Anderson, D.F. Anderson, Generalized GCD domain. Comment. Math. Univ. St. Paul. 28, 215–221 (1979)
D.D. Anderson, D.F. Anderson, Divisorial ideals and invertible ideals in a graded integral domain. J. Algebra 76, 549–569 (1982)
D.D. Anderson, D.F. Anderson, Divisibility properties of graded domains. Canad. J. Math. 34, 196–215 (1982)
D.D. Anderson, D.F. Anderson, G.W. Chang, Graded-valuation domains. Commun. Algebra 45, 4018–4029 (2017)
D.D. Anderson, D.F. Anderson, M. Zafrullah, The ring D\( + XD_S[X]\) and \(t\)-splitting sets. Commut. Algebra Arab. J. Sci. Eng. Sect. C Theme Issues 26, 3–16 (2001)
D.D. Anderson, M. Zafrullah, Integral domains in which nonzero locally principal ideals are invertible. Commun. Algebra 39, 933–941 (2011)
D.F. Anderson, Graded Krull domains. Commun. Algebra 7, 79–106 (1979)
D.F. Anderson, Seminormal graded rings. J. Pure Appl. Algebra 21, 1–7 (1981)
D.F. Anderson, Seminormal graded rings II. J. Pure Appl. Algebra 23, 221–226 (1982)
D.F. Anderson, The Picard group of a monoid domain. J. Algebra 115, 342–351 (1988)
D.F. Anderson, The Picard group of a monoid domain II. Arch. Math. 55, 143–145 (1990)
D.F. Anderson, The kernel of \(\rm Pic\mathit{(R_0)\rightarrow \rm Pic}(R)\) for \(R\) a graded domain. C. R. Math. Rep. Acad. Sci. Can. 13, 248–252 (1991)
D.F. Anderson, Divisibility properties in graded integral domains, in Arithmetical Properties of Commutative Rings, ed. by S.T. Chapman (Chapman & Hall, Boca Raton, 2005), pp. 22–45
D.F. Anderson, G.W. Chang, Homogeneous splitting sets of a graded integral domain. J. Algebra 288, 527–544 (2005)
D.F. Anderson, G.W. Chang, Graded integral domains and Nagata rings. J. Algebra 387, 169–184 (2013)
D.F. Anderson, G.W. Chang, Graded integral domains whose nonzero homogeneous ideals are invertible. Int. J. Algebra Comput. 26, 1361–1368 (2016)
D.F. Anderson, G.W. Chang, M. Zafrullah, Graded Prüfer domains. Commun. Algebra 46, 792–809 (2018)
D.F. Anderson, D.N. El Abidine, The \(A+XB[X]\) and \(A+XB[\![X]\!]\) constructions from GCD-domains. J. Pure Appl. Algebra 159, 15–24 (2001)
D.F. Anderson, J. Ohm, Valuations and semi-valuations of graded domains. Math. Ann. 256, 145–156 (1981)
G.W. Chang, Graded integral domains and Nagata rings, II. Korean J. Math. 25, 215–227 (2017)
G.W. Chang, T. Dumitrescu, M. Zafrullah, \(t\)-splitting sets in integral domains. J. Pure Appl. Algebra 187, 71–86 (2004)
G.W. Chang, D.Y. Oh, Discrete valuation overrings of a graded Noetherian domain. J. Commut. Algebra 10, 45–61 (2018)
P.M. Cohn, Bézout rings and their subrings. Proc. Camb. Philos. Soc. 64, 25l–264 (1968)
R. Gilmer, Multiplicative Ideal Theory (Marcel Dekker, New York, 1972)
W.C. Holland, J. Martinez, W.W. McGovern, M. Tesemma, Bazzoni’s conjecture. J. Algebra 320, 1764–1768 (2008)
E.G. Houston, S.B. Malik, J.L. Mott, Characterizations of \(*\)-multiplication domains. Canad. Math. Bull. 27, 48–52 (1984)
D.G. Northcott, A generalization of a theorem on the content of polynomials. Proc. Camb. Philos. Soc. 55, 282–288 (1959)
D.G. Northcott, Lessons on Rings, Modules, and Multiplicities (Cambridge University Press, Cambridge, 1968)
P. Sahandi, Characterizations of graded Prüfer \(*\)-multiplication domains. Korean J. Math. 22, 181–206 (2014)
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Chang, G.W., Kim, H. (2019). David Anderson’s Work on Graded Integral Domains. In: Badawi, A., Coykendall, J. (eds) Advances in Commutative Algebra. Trends in Mathematics. Birkhäuser, Singapore. https://doi.org/10.1007/978-981-13-7028-1_10
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DOI: https://doi.org/10.1007/978-981-13-7028-1_10
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