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Sep
24 |
awarded | Autobiographer |
May
7 |
comment |
About interpolability of Stein structures
Are you willing to make modifications to the psh functions? e.g. add constants, compose them with convex increasing functions, etc? or do you really want to keep $\psi_1$ and $\psi_2$ as they are? |
Apr
5 |
awarded | Yearling |
Apr
3 |
answered | Extending Reeb field from contact submanifold to ambient contact manifold |
Mar
30 |
comment |
Transversality in Bourgeois Oancea's non-equivariant contact homology
Your summary of Dragnev's paper is correct, but the same argument shows that you can obtain transversality in Ritter's setting with time-dependent cylindrical J, with some assumptions on the Hamiltonian. I'll get back to you about Hryniewicz and Macarini. |
Mar
27 |
comment |
Transversality in Bourgeois Oancea's non-equivariant contact homology
I believe that Ritter's remark should be understood to mean that it is more delicate to prove transversality in that case than in the general case. Are you familiar with Dragnev's paper on transversality for cylindrical almost complex structures? (The key part of the idea is also explained at the end of Bourgeois's paper on homotopy groups of contact structures.) |
Mar
17 |
comment |
Computation of symplectic quasi-state
In actual fact, we were both wrong with our CZ indices originally :-) I'm glad this got you on the right track despite that. |
Mar
15 |
answered | Computation of symplectic quasi-state |
Feb
26 |
answered | A question about solutions to Floer's equation which are asymptotic to a stationary point |
Feb
19 |
comment |
Question on Ionel and Parker's paper: Relative Gromov Witten Invariants
Have you sorted this question out? I'm also interested in the answer, though I haven't thought about it very much yet. |
Feb
19 |
answered | How to compute Conley-Zehnder indices on prequantization spaces? |
Jan
10 |
answered | Fundamental proof of the baby case of Hofer's theorem about displacement energy |
Jan
7 |
comment |
Fundamental proof of the baby case of Hofer's theorem about displacement energy
I don't understand what you are looking for. Do you want an elementary proof of this result in this special case, or are you looking to understand what happens when you take one of the proofs of an energy-capacity inequality and specialize it to $\mathbb{R}^2$? |
Oct
11 |
awarded | Constituent |
Jun
25 |
awarded | Revival |
Jun
25 |
awarded | Citizen Patrol |
May
13 |
awarded | Civic Duty |
Apr
9 |
comment |
Mathematicians who were late learners?-list
The letter from Wilder is also available on the 4th page of this pdf file from the Notices ams.org/notices/200311/comm-batterson.pdf |
Apr
7 |
comment |
Homology classes represented by $J$-holomorphic curves
@J.Martel : If the form on $M$ is exact and $\Sigma$ is closed, then the curve is constant. Perhaps you are thinking of punctured curves? @Hwang: This is probably a stupid comment, but what do you mean by the free part? I thought the splitting wasn't natural. |
Jan
22 |
accepted | strong contactomorphism group inside contactomorphism group |