Hassan Jolany
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Registered User
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A B C
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7h |
revised |
What is Kirillov’s method good for? edited tags |
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2d |
revised |
What is Kirillov’s method good for? edited tags; edited tags; edited tags |
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Jun 14 |
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shortest relation between poly-Bernoulli numbers and Euler numbers edited tags |
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Jun 14 |
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What is Kirillov’s method good for? @ Urs Schreiber, thanks for your nice link |
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Jun 12 |
answered | Alternating sum of binomial coefficients times logarithm |
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Jun 12 |
answered | sum calculation |
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Jun 12 |
answered | computing Bernoulli numbers |
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Jun 12 |
revised |
What is Kirillov’s method good for? added 4 characters in body |
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Jun 12 |
revised |
What is Kirillov’s method good for? edited tags |
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Jun 12 |
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What is Kirillov’s method good for? added 102 characters in body |
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Jun 12 |
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What is Kirillov’s method good for? Thanks @Gian Maria Dall'Ara, But this book is more than of 400 pages and I have it. |
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Jun 12 |
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What is Kirillov’s method good for? Ohhh, Thanks Peter Dalakov. It was a worthwhile reference |
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Jun 12 |
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What is Kirillov’s method good for? @Peter, You said "For other groups you have to enrich the coadjoint orbit to a bundle over them to get more representations". Can you explain the applications of non-positive line bundles for such representations? |
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Jun 12 |
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What is Kirillov’s method good for? @Peter, can you add in your answer why metaplectic quantization is important in orbit method? |
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Jun 12 |
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What is Kirillov’s method good for? One of my teachers has suggested me this topic for study. |
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Jun 12 |
asked | What is Kirillov’s method good for? |
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Jun 10 |
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identifying dual of lie algebra of general linear groups edited tags |
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Jun 10 |
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identifying dual of lie algebra of general linear groups I would be happy if you give a little bit with detail |
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Jun 10 |
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identifying dual of lie algebra of general linear groups @Peter MICHOR, Do you have any reference? |
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Jun 10 |
asked | identifying dual of lie algebra of general linear groups |
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Jun 3 |
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$p$-adic integrals and Cauchy’s theorem deleted 13 characters in body |
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Jun 3 |
answered | $p$-adic integrals and Cauchy’s theorem |
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Jun 2 |
asked | shortest relation between poly-Bernoulli numbers and Euler numbers |
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Jun 2 |
answered | zeta(3) in terms of derivatives of zeta at 1/2 and pi |
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May 12 |
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symplectic leaves why $S^n$ cannot be symplectic manifold |
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May 12 |
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para-complex structure edited tags |
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May 10 |
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para-complex structure Yes, we just need this trick. because $Ke_i=e_i$ and $Kf_i=-f_i$ so we get the desired result.thanks "The User". |
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May 10 |
asked | para-complex structure |
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Apr 19 |
asked | non-singular cubics are not rational |
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Apr 15 |
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Short time existence on Hyperbolic Ricci flow in non-compact case edited tags; edited tags |
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Apr 14 |
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sign of the First chern class fundamental group of Kahler Manifolds edited tags |
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Apr 14 |
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complete or open Kähler manifold and simply connected edited tags; edited tags |
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Apr 13 |
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why the group $GL(6,V)$ has an open orbit? Mariano , No,I think this thesis has been written around 1930. But the proof of Robert is very nice and unique. |
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Apr 13 |
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Short time existence on nonlinear parabolic PDE edited tags |
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Apr 13 |
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conservation law and generalized Symplectic Monge-Ampere equation arising from 3-variables added 194 characters in body; added 4 characters in body |
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Apr 13 |
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recognizing Kahler manifolds of complex dimension n edited tags |
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Apr 12 |
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A question about G-Manifolds @Ben , Nice comment |
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Apr 12 |
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A question about G-Manifolds Although , it was elementary , but your answer was nice, But here G is just Lie group, so can we say G act transitively |
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Apr 12 |
asked | A question about G-Manifolds |
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Apr 10 |
awarded | ● Nice Question |
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Apr 9 |
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classification for coadjoint orbits of lower or upper triangular matrices @ Jim, thanks , I will follow your references in library |
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Apr 9 |
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classification for coadjoint orbits of lower or upper triangular matrices Yes I am agree with Reimundo |
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Apr 9 |
asked | classification for coadjoint orbits of lower or upper triangular matrices |
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Apr 8 |
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smallest simplest $E_8$ -module Dear Mariano, Yes, I believe to your comment. |
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Apr 8 |
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smallest simplest $E_8$ -module niceeeeeeeeeeee |
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Apr 8 |
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a question about solutions of a system with four equations @Deane , I think in this equation you information is worthwhile But I was looking for ellipticity of a system with four second order non-linear PDE in my previous comments. Moreover what about counterexample of mathoverflow.net/questions/126203? |
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Apr 8 |
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a question about solutions of a system with four equations Yes, In fact I am looking for such solutions. But how can we define ellipticity for such systems?. If you follow to comments of Robert Bryant in mathoverflow.net/questions/126203 , then you see he found a counterexample . |
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Apr 7 |
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generalized Monge-Ampere equation Deane Yang: We are studying Some aspects of Hyper-Kähler Geometry and we faced with such equations. |
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Apr 7 |
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a question about solutions of a system with four equations @Dear Deane, Thanks for your comment, I revised it |
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Apr 7 |
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a question about solutions of a system with four equations added 187 characters in body |
