@article{oai:ous.repo.nii.ac.jp:00001089,
 author = {吉田, 憲一 and Yoshida, Ken-ichi and 織田, 進 and Oda, Susumu},
 journal = {岡山理科大学紀要. A, 自然科学, Bulletin of Okayama University of Science. A, Natural Sciences},
 month = {Mar},
 note = {P(論文), In what follows, all rings considered are commutative with identity. We say that a ring A is a Hilbert ring if each prime ideal of A is an intersection of maximal ideals of R. It is known that a k-affine domain over a field k is a Hilbert ring ([G, (31.11)]). We say that a ring A is a catenary ring if the following condition is satisfied : for any prime ideals p and q of A with p⊆q, then exists a saturated chain of prime ideals starting from p and ending at q, and all such chains have the same (finite) length. We say that a ring A is a universally catenary ring if A is Noetherian and every finitely generated A-algebra is catenary. Let k be a field and R a K-affine domain. Then R is Noetherian, Hilbert and catenary. Moreover dim R_m=Tr.deg_kR<+∞ for each maximal ideal m of R. Our objective in this paper is to investigate integral domains having these properties. Throughout this paper, k denotes a field and R an integral domain containing k and K(R) denotes the quotient field of R unless otherwise specified. Any unexplained terminology is standard, as in [M], [N].},
 pages = {1--5},
 title = {On Pseudo-Affine Domains},
 volume = {30},
 year = {1995},
 yomi = {ヨシダ, ケンイチ and オダ, ススム}
}