“School of Mathematics”
Back to Papers HomeBack to Papers of School of Mathematics
| Paper IPM / M / 12665 |
|
||||
| Abstract: | |||||
|
Let \mathbbK be a field and S=\mathbbK[x1,...,xn] be the
polynomial ring in n variables over the field \mathbbK. In this
paper, it is shown that Stanley's conjecture holds for I and S/I if
I is a product of monomial prime ideals or I is a high enough power of
a polymatroidal or a stable ideal generated in a single degree.
Download TeX format |
|||||
| back to top | |||||
