bio | website | mysbfiles.stonybrook.edu/… |
---|---|---|
location | Simons Center | |
age | 30 | |
visits | member for | 4 years, 3 months |
seen | Jul 8 at 1:41 | |
stats | profile views | 2,523 |
Research Asst Professor
Interested in Symplectic geometry, complex Algebraic geometry, Gromov-Witten theory, Mirror symmetry, Calabi-Yau threefolds, Enumerative geometry, Abelian surfaces, Moduli space of objects with real structure, ...
Jul 2 |
awarded | Inquisitive |
Jul 2 |
awarded | Curious |
Jun 18 |
revised |
On Lerman's description of symplectic cut
edited body |
Jun 18 |
revised |
On Lerman's description of symplectic cut
edited title |
Jun 18 |
asked | On Lerman's description of symplectic cut |
May 27 |
awarded | Popular Question |
Apr 17 |
comment |
Intersection theory on M_{g,n}
I am aware of a Macaulay based program doing this but I am looking for some printed numbers. |
Apr 17 |
asked | Intersection theory on M_{g,n} |
Apr 10 |
awarded | Yearling |
Mar 15 |
accepted | Are rational varieties simply connected? |
Mar 13 |
awarded | Nice Question |
Mar 9 |
comment |
almost holomorphic line bundles
Thanks for sharing your thoughts. I agree with the first paragraph on how the question can be stated. Then in fact, my question is about the existence of a good J_M; generic J_M does not have this property for sure. I am looking for topological or symplectic obstructions against the existence of such J_M. For example, chern class of L is a well-defined 2-form no matter what J is. Then what does the existence of such J impose on this class; if J_M is good, can we conclude that c_1(L) would be (1,1) with respect to J_M? and similar. |
Mar 7 |
asked | almost holomorphic line bundles |
Feb 24 |
comment |
3D objects with projections of constant area
math.sc.edu/~howard/Reprints/published_brightness.pdf |
Feb 24 |
comment |
3D objects with projections of constant area
what is the non-spherical solid of constant diameter in your hand? |
Feb 17 |
awarded | Promoter |
Feb 17 |
comment |
A good metric for transversal intersections
I need to identify a neighborhood of normal bundle with a neighborhood of V in M for some construction to work. |
Feb 15 |
comment |
A good metric for transversal intersections
I was naive, Misha's definition is the rigorous one. |
Feb 15 |
comment |
A good metric for transversal intersections
Thanks for the edit, I was lazy to do that! |
Feb 15 |
comment |
A good metric for transversal intersections
@Taghavi: You special case is OK, but very easy due to your assumptions. |