bio | website | |
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location | ||
age | ||
visits | member for | 3 years, 5 months |
seen | Dec 13 '10 at 7:52 | |
stats | profile views | 624 |
Nov 12 |
awarded | Yearling |
Jul 25 |
awarded | Popular Question |
Nov 13 |
awarded | Yearling |
Dec 12 |
awarded | Disciplined |
Dec 12 |
awarded | Organizer |
Dec 10 |
answered | Proofs that require fundamentally new ways of thinking |
Dec 8 |
comment |
On a characterization of the symbolic square of prime ideals in polynomial rings
@darji: Sorry that was a typo. It should have been $f\in P$ in the characterization. Thanks for pointing it out. |
Dec 8 |
revised |
On a characterization of the symbolic square of prime ideals in polynomial rings
edited body; edited title |
Dec 7 |
revised |
On a characterization of the symbolic square of prime ideals in polynomial rings
added 285 characters in body; edited body |
Dec 7 |
asked | On a characterization of the symbolic square of prime ideals in polynomial rings |
Dec 7 |
comment |
Rational powers of ideals in Noetherian rings
@Karl: Thanks for this. I don't know much about multiplier ideals, but I shall come back to this when I do. |
Dec 7 |
comment |
Rational powers of ideals in Noetherian rings
@Allen: Thanks for the reference. I shall look into this. |
Dec 2 |
revised |
Monomial-type ideals in polynomial rings
edited title |
Dec 2 |
revised |
Rational powers of ideals in Noetherian rings
added 5 characters in body |
Dec 2 |
revised |
Rational powers of ideals in Noetherian rings
added 8 characters in body; added 9 characters in body |
Dec 2 |
comment |
Rational powers of ideals in Noetherian rings
@Qiaochu: Thanks. As far as I remember, I didn't have to do this on math.SE. |
Dec 2 |
revised |
Rational powers of ideals in Noetherian rings
added 2 characters in body |
Dec 2 |
asked | Rational powers of ideals in Noetherian rings |
Dec 1 |
comment |
Radicals of binomial ideals
@J.C. Ottern: Yes. That is the paper I refer to in my second paragraph. |
Dec 1 |
comment |
Radicals of binomial ideals
@Thomas: Thanks. I had already looked over your paper earlier and also used your package "binomials" in Macaulay2. It has been extremely useful, though I was curious to know if there is any abstract description of radicals of binomial ideals. I am not optimistic about as general a result as in the case of monomial ideals, but I would definitely be interested in seeing some results under additional hypothesis (like the ones I mention in the last paragraph). |