bio | website | |
---|---|---|
location | Heidelberg | |
age | 29 | |
visits | member for | 4 years, 1 month |
seen | Jun 25 '13 at 0:16 | |
stats | profile views | 315 |
Jul 2 |
awarded | Curious |
Jun 25 |
awarded | Promoter |
Jun 23 |
awarded | Commentator |
Jun 23 |
comment |
How can one interpret homology and Stokes' Theorem via derived categories?
It seems to me that a sensible version of this question would formulate some analogue of "Stokes' theorem" that perhaps one needs in one's research and ask whether it is true. At the very least, I would like to see a lot more about what one would like. |
Jun 23 |
comment |
How can one interpret homology and Stokes' Theorem via derived categories?
What is the mathematical question? It seems like a question about analogies. Seems hard to be definitive there... |
Jun 23 |
awarded | Enthusiast |
Jun 16 |
comment |
Book on the Three body Problem
Should I suggest you begin with the two body problem? thetwobodyproblem.com |
Jun 8 |
comment |
State of research in moduli space of flat connections
Maybe one could say that Geometric Langlands is advancing so quickly that it is important to have access to a "big expert" if one wants to work on that. |
Jun 4 |
comment |
How to find a topic to do research with as a Post-Doc?
Why is everyone so mean-spirited? Just some small words of encouragement and generic advice from more experienced colleagues and the OP would have gone on happily ever after :) More seriously isn't it very important to choose problems smartly to have a nice career rather than randomly investing time in the first thing that catches your fancy? |
May 26 |
revised |
global sections of structure sheaf on the toric Calabi-Yau
added 156 characters in body |
May 26 |
comment |
global sections of structure sheaf on the toric Calabi-Yau
Yes, it is as you say in the dual cone. But this description is not so explicit(at least I have trouble to implement it in practice) and I was hoping know what the best algorithm is for computing. |
May 25 |
asked | global sections of structure sheaf on the toric Calabi-Yau |
Feb 7 |
revised |
Family of hypersurfaces in (C^*)^2 corresponding to tropical family
added 12 characters in body |
Feb 7 |
revised |
Family of hypersurfaces in (C^*)^2 corresponding to tropical family
added 174 characters in body |
Feb 5 |
revised |
Family of hypersurfaces in (C^*)^2 corresponding to tropical family
added 321 characters in body |
Feb 4 |
revised |
Family of hypersurfaces in (C^*)^2 corresponding to tropical family
edited title |
Feb 4 |
asked | Family of hypersurfaces in (C^*)^2 corresponding to tropical family |
Jan 8 |
comment |
Smooth projective toric varieties which are quotients of product of spheres and torii by a free torus action?
Thank you Jason and Dmitri for your very knowledgeable answers. |
Jan 7 |
accepted | Smooth projective toric varieties which are quotients of product of spheres and torii by a free torus action? |
Jan 7 |
comment |
Smooth projective toric varieties which are quotients of product of spheres and torii by a free torus action?
Dmitri, thank you very much for this answer. To make it clear, you are saying the converse is true for surfaces because P^1 \times P^1 and P^2 obviously have such a representation but also P^2 blown up at a point? |