13,097 reputation
22356
bio website math.utah.edu/~schwede
location Utah
age 35
visits member for 4 years, 9 months
seen 6 hours ago

I'm an associate professor at the University of Utah. I work on algebraic geometry and commutative algebra.


6h
reviewed Leave Open Is there any algorithm to decide whether a series with integral coefficiens is a algebraic function?
20h
reviewed No Action Needed Determining the space complexity of van Emde Boas trees
21h
reviewed Leave Open Blinding a paper : the acknowledgements section
2d
reviewed Close toledo's lecture on cartwirght-steger surface
2d
reviewed Leave Open Who first defined quantum integers?
Oct
19
reviewed Leave Open Where can I find the classification of groups of order 8p?
Oct
18
reviewed Leave Open Inequality for an integral involving $ \exp $, $ \sin $ and $ \cos $
Oct
18
reviewed Close About freeness of modules over the coordinate ring of an affine variety
Oct
18
reviewed Close A calculus question
Oct
18
reviewed Close Inequality with five variables
Oct
18
reviewed Close Stable curves and degenerations of smooth ones
Oct
17
reviewed Reopen Can I find a resolution of singularities that is both smooth and projective?
Oct
17
reviewed Close Tangent space describes the manifold's first order characteristic. Is there something like tangent space describes higher order characteristic?
Oct
16
reviewed No Action Needed Cohomology of Formal Groups
Oct
14
reviewed Leave Closed Could it be possible to use Selberg trace formula to prove that the irreducible characters of representation form an orthonormal basis?
Oct
14
reviewed Close Sum of n independent F distribution random variables
Oct
11
reviewed Close Books which defines higher differentials in algebraic curves context
Oct
10
reviewed Close Non-isomorphic groups such that there are epis from one to another
Oct
10
comment Non-isomorphic groups such that there are epis from one to another
This question appears to be a duplicate (in fact a very special case) of mathoverflow.net/questions/119255/almost-isomorphic-groups as Stefan Kohl points out.
Oct
8
comment If the direct image of f preserves coherent sheaves on noetherian schemes, how to show f is proper?
Allen, if you take a line through that missing point then the pushforward of the structure sheaf of that line won't be coherent. Right?