Items: 81 - 100 of 119
[81] 56 #5529 Gilmer, Robert; Heinzer, William A non-Noetherian two-dimensional Hilbert domain with principal maximal
ideals.
Michigan Math. J. 23 (1976), no. 4, 353--362 (1977). (Reviewer: T. Albu) 13G05
[82] 56 #2982 Gilmer, Robert; Heinzer, William Cardinality of generating sets for ideals of a commutative ring.
Indiana Univ. Math. J. 26 (1977), no. 4, 791--798. (Reviewer: Melvin Henriksen) 13A15
[83] 50 #2157 Eakin, Paul; Heinzer, William A cancellation problem for rings.
Conference on Commutative Algebra (Univ. Kansas, Lawrence, Kan.,
1972),
pp. 61--77. Lecture Notes in Math., Vol. 311, Springer, Berlin, 1973. (Reviewer: E. Enochs) 13F15
[84] 50 #309 Heinzer, William Hilbert integral domains with maximal ideals of preassigned
height.
J. Algebra 29 (1974), 229--231. (Reviewer: M. Griffin) 13G05
[85] 49 #5005 Heinzer, William Noetherian intersections of integral domains. II.
Conference on Commutative Algebra (Univ. Kansas, Lawrence, Kan.,
1972),
pp. 107--119. Lecture Notes in Math., Vol. 311, Springer, Berlin, 1973. (Reviewer: J. W. Brewer) 13G05
[86] 49 #2696 Brewer, J. W.; Montgomery, P. R.; Rutter, E. A.; Heinzer, W. J. Krull dimension of polynomial rings.
Conference on Commutative Algebra (Univ. Kansas, Lawrence, Kan.,
1972),
pp. 26--45. Lecture Notes in Math., Vol. 311, Springer, Berlin, 1973. (Reviewer: Philip B. Sheldon) 13B25
[87] 49 #267 Brewer, J. W.; Heinzer, W. J. Associated primes of principal ideals.
Duke Math. J. 41 (1974), 1--7. (Reviewer: M. Nagata) 13A15
[88] 48 #8468 Brewer, J. W.; Heinzer, W. J. Ideals $I$ of $R[X]$ for which $R[X]/I$ is $R$-projective.
Proc. Amer. Math. Soc. 43 (1974), 21--25. (Reviewer: R. E. MacRae) 13A15
[89] 48 #6093 Heinzer, William; Ohm, Jack An essential ring which is not a $v$-multiplication ring.
Canad. J. Math. 25 (1973), 856--861. (Reviewer: M. Griffin) 13G05
[90] 47 #8516 Eakin, Paul; Heinzer, W. More noneuclidian ${\rm PID}$'s and Dedekind domains with prescribed
class group.
Proc. Amer. Math. Soc. 40 (1973), 66--68. (Reviewer: P. Samuel) 13D15
[91] 47 #8503 Heinzer, William Minimal primes of ideals and integral ring extensions.
Proc. Amer. Math. Soc. 40 (1973), 370--372. (Reviewer: Robert Gilmer) 13A15
[92] 46 #9031 Heinzer, William; Ohm, Jack Defining families for integral domains of real finite character.
Canad. J. Math. 24 (1972), 1170--1177. (Reviewer: M. Griffin) 13G05
[93] 46 #5304 Heinzer, William; Ohm, Jack The finiteness of $I$ when $R[X]/I$ is $R$-flat. II.
Proc. Amer. Math. Soc. 35 (1972), 1--8. (Reviewer: W. V. Vasconcelos) 13C05
[94] 46 #5300 Abhyankar, Shreeram S.; Heinzer, William; Eakin, Paul On the uniqueness of the coefficient ring in a polynomial ring.
J. Algebra 23 (1972), 310--342. (Reviewer: P. Samuel) 13B25
[95] 46 #3499 Heinzer, William Locally affine ring extensions of a Noetherian domain.
Proc. Amer. Math. Soc. 35 (1972), 377--380. (Reviewer: R. E. MacRae) 13B99
[96] 45 #5156 Heinzer, William; Ohm, Jack Noetherian intersections of integral domains.
Trans. Amer. Math. Soc. 167 (1972), 291--308. (Reviewer: J. W. Brewer) 16A02 (13E05)
[97] 45 #3385 Heinzer, William; Ohm, Jack On the Noetherian-like rings of E. G. Evans.
Proc. Amer. Math. Soc. 34 (1972), 73--74. (Reviewer: Robert Gilmer) 13E05
[98] 43 #6192 Heinzer, William; Ohm, Jack Locally noetherian commutative rings.
Trans. Amer. Math. Soc. 158 1971 273--284. (Reviewer: R. M. Fossum) 13.25
[99] 43 #1964 Heinzer, William Integral ring extensions and prime ideals of infinite rank.
Proc. Amer. Math. Soc. 28 1971 344--346. (Reviewer: J. Ohm) 13.80
[100] 42 #244 Heinzer, William Quotient overrings of integral domains.
Mathematika 17 1970 139--148. (Reviewer: Robert Gilmer) 13.15
Items: 81 - 100 of 119