bio  website  math.utah.edu/~schwede 

location  Utah  
age  36  
visits  member for  5 years, 2 months 
seen  2 hours ago  
stats  profile views  5,330 
I'm an associate professor at the University of Utah. I work on algebraic geometry and commutative algebra.
4h

comment 
How to prove that the set of maximal elements of a set of prime ideals is finite
Whoops, sorry, misread that. 
13h

comment 
How to prove that the set of maximal elements of a set of prime ideals is finite
Can you please define the term maximal element of a subset of a Noetherian ring. 
1d

reviewed  Close How to character the norm of elemental units in a quadratic number field 
2d

reviewed  Close Some questions about the paper, “Hypercontractivity, Sumofsquares Proofs and Their Applications” 
Mar 26 
comment 
Nonembeddable varieties
This is not exactly what you want, but there are results of the form: a variety $X$ admits an embedding into a smooth toric variety if and only if any two points can be contained in an affine open set which is the complement of a Cartier divisor. Sort of generalizing Kleiman's result about which things can be embedded into projective space. See the work of Wlodarczyk, Hausen, etc. 
Mar 26 
reviewed  Close sequences and series 
Mar 26 
answered  How singular can the Stein factorization of a proper map between smooth varieties be? 
Mar 24 
reviewed  Close Z Transform problem 
Mar 24 
revised 
On QCartier Divisors
added 134 characters in body 
Mar 24 
revised 
On QCartier Divisors
added 131 characters in body 
Mar 24 
revised 
On QCartier Divisors
Added commutative algebra tag, removed group schemes tag. 
Mar 24 
answered  On QCartier Divisors 
Mar 23 
reviewed  Close How compute combinatorial expression 
Mar 23 
reviewed  Leave Open Can you decide whether the commutator subgroup of a f.p. group is f.g? 
Mar 23 
reviewed  Close Advantages of intersection theory on stacks 
Mar 22 
reviewed  Leave Open Isomorphisms between different models of elliptic curves 
Mar 22 
reviewed  Close is there a relationship between $\ell (R/I^n)$ and $\ell (R/I)$ 
Mar 21 
reviewed  Leave Open What criteria are to determine if two projective varieties are projectively equivalent? 
Mar 20 
awarded  Cleanup 
Mar 20 
comment 
Blowingup a point in the singular locus
You completely changed the question so that the previously accepted answer didn't make sense, I rolled it back. If you have a new question, you should post a different question. 