“School of Mathematics”
Back to Papers HomeBack to Papers of School of Mathematics
| Paper IPM / M / 8982 | ||||||||||||||||||
|
||||||||||||||||||
| Abstract: | ||||||||||||||||||
|
Let R be a commutative integral domain and let ∗ be a
semistar operation of finite type on R, and I be a
quasi-∗-ideal of R. We show that, if every minimal prime
ideal of I is the radical of a ∗-finite ideal, then the set
\Min(I) of minimal prime ideals over I is finite.
Download TeX format |
||||||||||||||||||
| back to top | ||||||||||||||||||
