Comments for Delta Epsilons http://deltaepsilons.wordpress.com Mathematical research and problem solving Sun, 31 Mar 2013 13:20:44 +0000 hourly 1 http://wordpress.com/ Comment on Divisibility theorems for group representations by malmsteenkoushik http://deltaepsilons.wordpress.com/2009/10/11/divisibility-theorems-for-group-representations/#comment-1003 Sun, 31 Mar 2013 13:20:44 +0000 http://deltaepsilons.wordpress.com/?p=574#comment-1003 Reblogged this on addictionmath.

]]> Comment on The tubular neighborhood theorem by tinyurl.com http://deltaepsilons.wordpress.com/2009/11/05/the-tubular-neighborhood-theorem/#comment-999 Fri, 01 Mar 2013 20:52:27 +0000 http://deltaepsilons.wordpress.com/?p=636#comment-999 Where did u actually obtain the points to publish ““The
tubular neighborhood theorem | Delta Epsilons” 37thvannats ?
Regards ,Tressa

]]> Comment on The Hahn-Banach theorem and two applications by Advanced Analysis, Notes 6: Banach spaces (basics, the Hahn-Banach Theorems) « Noncommutative Analysis http://deltaepsilons.wordpress.com/2009/11/28/the-hahn-banach-theorem-and-two-applications/#comment-981 Fri, 02 Nov 2012 10:17:32 +0000 http://deltaepsilons.wordpress.com/?p=728#comment-981 [...] polynomials in prime powers of are dense in , isn’t that neat? See Theorem 3 on this post for the part of the proof of Muntz’ theorem (the sufficiency part – which is the more [...]

]]> Comment on The tubular neighborhood theorem by Gary K http://deltaepsilons.wordpress.com/2009/11/05/the-tubular-neighborhood-theorem/#comment-771 Wed, 13 Jun 2012 22:48:34 +0000 http://deltaepsilons.wordpress.com/?p=636#comment-771 Nevermind, Sorry.

]]> Comment on The tubular neighborhood theorem by Gary K http://deltaepsilons.wordpress.com/2009/11/05/the-tubular-neighborhood-theorem/#comment-770 Wed, 13 Jun 2012 22:30:50 +0000 http://deltaepsilons.wordpress.com/?p=636#comment-770 I don’t know if I am missing something, but, does the sum v+p in the

middle of the 2nd paragraph always

make sense? What if, say, M=R^7 , N=S^2 . Then E would have

dimension 5, right?

]]> Comment on The Hahn-Banach theorem and two applications by Konstantinos http://deltaepsilons.wordpress.com/2009/11/28/the-hahn-banach-theorem-and-two-applications/#comment-755 Sun, 29 Apr 2012 21:28:11 +0000 http://deltaepsilons.wordpress.com/?p=728#comment-755 Reblogged this on Room 196, Hilbert's Hotel and commented:
I’ve been studying the Hahn – Banach theorem and I found this post very informative! :D

]]> Comment on The test case: flat Riemannian manifolds by TK http://deltaepsilons.wordpress.com/2009/11/12/the-test-case-flat-riemannian-manifolds/#comment-710 Wed, 22 Feb 2012 14:44:09 +0000 http://deltaepsilons.wordpress.com/?p=690#comment-710 Did you prove the “only if” part?

]]> Comment on The Hopf-Rinow theorems and geodesic completeness by 1. Hopf–Rinow theorem | Daily Meditations http://deltaepsilons.wordpress.com/2009/11/14/the-hopf-rinow-theorems-and-geodesic-completeness/#comment-695 Thu, 02 Feb 2012 05:30:33 +0000 http://deltaepsilons.wordpress.com/?p=702#comment-695 [...] C.J.Aitken proved it to be false in infinite dimension (first page of the PDF is here) and  one can read the 15-page paper by Ivar Ekeland on the generalization.  Shlomo Sternberg has some an invaluable link to some slides on this topic. Gliklikh also has a paper about generalizations of the theorem in geodesics. ArXiv has a paper of the theorem in Sato-Grassmannian. Last but not the least, there is Akhil Matthew’s blog on this topic. [...]

]]> Comment on About by Anonymous http://deltaepsilons.wordpress.com/about/#comment-659 Thu, 24 Nov 2011 03:59:54 +0000 #comment-659 dude barack obama that was hilarious you rock

]]> Comment on The Hopf-Rinow theorems and geodesic completeness by Akhil Mathew http://deltaepsilons.wordpress.com/2009/11/14/the-hopf-rinow-theorems-and-geodesic-completeness/#comment-642 Tue, 01 Nov 2011 04:39:26 +0000 http://deltaepsilons.wordpress.com/?p=702#comment-642 Dear Sean,

That sounds like an interesting question. Unfortunately I have no idea how to answer it; perhaps you should try MathOverflow!

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