bio | website | sites.google.com/site/… |
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location | Amsterdam, the Netherlands | |
age | ||
visits | member for | 4 years, 8 months |
seen | Mar 25 '14 at 18:13 | |
stats | profile views | 312 |
I work at Utrecht University; I'm interested in derived differential geometry and its applications to mathematical physics.
Sep 24 |
awarded | Autobiographer |
Nov 26 |
awarded | Scholar |
Nov 26 |
accepted | Non-polynomial integrals of motion for polynomial dynamical systems |
Nov 8 |
awarded | Supporter |
Apr 24 |
awarded | Nice Answer |
Oct 28 |
awarded | Editor |
Oct 28 |
revised |
Do affine schemes form a Mal'cev category?
added 16 characters in body; edited body |
Oct 28 |
answered | Do affine schemes form a Mal'cev category? |
Jul 26 |
awarded | Necromancer |
Jul 25 |
answered | Applications of mathematics |
Jul 13 |
comment |
Non-polynomial integrals of motion for polynomial dynamical systems
Dear Robert, your comment is very helpful and counts as an answer. Thanks! |
Jul 12 |
asked | Non-polynomial integrals of motion for polynomial dynamical systems |
Mar 1 |
awarded | Student |
Mar 1 |
asked | a “homological dimension” for embedding of manifolds |
Aug 6 |
comment |
Is every graded manifold affine, and is this definition of graded manifold the right one?
Sure, no prob. I guess Teichner was giving a characterization of the essential image of the global sections functor into algebras -- an issue, in some sense, orthogonal to the answer I gave. In the graded case, the characterization will look different unless you complete, which may be a sensible thing to do for some purposes. Cheers! |
Aug 6 |
awarded | Teacher |
Aug 6 |
answered | Is every graded manifold affine, and is this definition of graded manifold the right one? |