bio | website | |
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location | Toronto | |
age | ||
visits | member for | 4 years, 11 months |
seen | May 16 at 11:23 | |
stats | profile views | 112 |
I am a student at UofT. My research interests are currently: convexity phenomena in completely integrable systems and coadjoint orbits.
Dec 1 |
awarded | Scholar |
Dec 1 |
accepted | Detecting Monodromy in Integrable Systems |
Nov 30 |
revised |
Symplectic quotient of projective variety is projective?
misspelled 'variety' in title |
Nov 30 |
suggested | approved edit on Symplectic quotient of projective variety is projective? |
Nov 30 |
comment |
Symplectic quotient of projective variety is projective?
If $M$ is compact then a Hamiltonian action of an non-trivial connected group cannot be free: $\mu$ must have critical points (certainly it may act freely \emph{on a level set} but this is different). |
Sep 24 |
awarded | Autobiographer |
Jun 18 |
awarded | Teacher |
May 19 |
answered | Detecting Monodromy in Integrable Systems |
Apr 27 |
awarded | Announcer |
Apr 19 |
comment |
Proofs without words
this proof makes me wonder what is a 'picture' and what is |
Feb 21 |
revised |
Detecting Monodromy in Integrable Systems
added 166 characters in body |
Feb 20 |
revised |
Detecting Monodromy in Integrable Systems
added 509 characters in body |
Feb 20 |
revised |
Detecting Monodromy in Integrable Systems
added 103 characters in body |
Feb 20 |
comment |
Detecting Monodromy in Integrable Systems
For example, are there interesting ways to show that the rotation numbers are multivalued functions? |
Feb 20 |
asked | Detecting Monodromy in Integrable Systems |
Dec 4 |
awarded | Critic |
Dec 4 |
comment |
basic questions on quantum integrable systems
Can you be more specific as to what happens for $g^*$ in terms of the 'quantization' in your first example (perhaps a reference)? Also, what is meant by 'principal symbols'? |
Jul 9 |
comment |
Fiction books about mathematicians?
The film was pretty terrible. |
May 20 |
awarded | Supporter |
May 19 |
comment |
Is there a Whitney Embedding Theorem for non-smooth manifolds?
@Tom do you know the original reference for the 2n+1 theorem 'every map from a smooth $N^n$ to a smooth $M^{2n+1}$ is homotopic to a smooth embedding? |