Comments for INEQUALITY'S BLOG
https://vankheakh.wordpress.com
By van khea (Cambodian)Sun, 11 Mar 2012 16:37:21 +0000
hourly
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Comment on A GENERALIZATION OF VANKHEA’S INEQUALITY by vankhea’s inequality « ចំណេះដឹងនិងចំណេះធ្វើ !!!
https://vankheakh.wordpress.com/2010/12/15/a-generalization-of-vankheas-inequality/#comment-141
Sun, 11 Mar 2012 16:37:21 +0000http://vankheakh.wordpress.com/?p=729#comment-141[…] នៅទីនេះ Like this:LikeBe the first to like this […]
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Comment on A GENERALIZATION OF VANKHEA’S INEQUALITY by vankhea’s inequality « ចំណេះដឹងនិងចំណេះធ្វើ !!!
https://vankheakh.wordpress.com/2010/12/15/a-generalization-of-vankheas-inequality/#comment-140
Sun, 11 Mar 2012 16:34:25 +0000http://vankheakh.wordpress.com/?p=729#comment-140[…] នៅទីនេះ Like this:Likeប្លកហ្គ័រម្នាក់ចូលចិត្ត […]
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Comment on Update inequality by aya hussein
https://vankheakh.wordpress.com/update-inequality/#comment-82
Tue, 06 Dec 2011 14:58:01 +0000http://vankheakh.wordpress.com/?page_id=255#comment-82i found sequence of sequences in l^infinity (1,0,0,…..)
(1,2,0,0,…………..)
and so on(1,1/2,…,1/n,0,0,0,0,0) it converge to (1,2,3,4,…………..)not in l^infinity
but found in s
if you want to know the answer
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Comment on Update inequality by vankhea
https://vankheakh.wordpress.com/update-inequality/#comment-78
Mon, 05 Dec 2011 19:17:35 +0000http://vankheakh.wordpress.com/?page_id=255#comment-78sorry i can’t.
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Comment on Update inequality by aya hussein
https://vankheakh.wordpress.com/update-inequality/#comment-77
Sat, 03 Dec 2011 21:40:08 +0000http://vankheakh.wordpress.com/?page_id=255#comment-77if i want to show that l^infinitly is not closed in the space s of all sequences i search to find sequence of l ^infinity convergent to seq ins but not in l^infinitly , can you help me? thanks
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Comment on Update inequality by vankhea
https://vankheakh.wordpress.com/update-inequality/#comment-46
Sun, 23 Oct 2011 11:27:39 +0000http://vankheakh.wordpress.com/?page_id=255#comment-46sorry i don’t know too. but u can search that books from ebook.
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Comment on Update inequality by aya hussein
https://vankheakh.wordpress.com/update-inequality/#comment-44
Sat, 22 Oct 2011 11:54:16 +0000http://vankheakh.wordpress.com/?page_id=255#comment-44forgive me , can i ask you for a good website or book explaining banach space and banach algebra, normed space and inner product .in a good way
thank you very much
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Comment on Update inequality by vankhea
https://vankheakh.wordpress.com/update-inequality/#comment-41
Sun, 16 Oct 2011 00:47:26 +0000http://vankheakh.wordpress.com/?page_id=255#comment-41Oh really good.
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Comment on Update inequality by aya hussein
https://vankheakh.wordpress.com/update-inequality/#comment-40
Sat, 15 Oct 2011 18:32:50 +0000http://vankheakh.wordpress.com/?page_id=255#comment-40Thanks I could really solve it
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Comment on Update inequality by vankhea
https://vankheakh.wordpress.com/update-inequality/#comment-39
Fri, 14 Oct 2011 04:51:22 +0000http://vankheakh.wordpress.com/?page_id=255#comment-39Never mind i will solution it in next time 😀
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Comment on Update inequality by aya hussein
https://vankheakh.wordpress.com/update-inequality/#comment-38
Thu, 13 Oct 2011 20:35:52 +0000http://vankheakh.wordpress.com/?page_id=255#comment-38thank you for your efforts but
i still have a problem
i just reach for this step
summation |ai ^s bi^s|<=(SUMMATION|ai|^p)^s/p * (SUMMATION|bi|^(qr/q+r))^(s(q+r)/qr)
summation|bi^s ci^s|<=(summation|bi|^(pq/p+q)^(s(p+q)/pq) * (summation|ci|^r)^s/r
how can i complete
Sorry to harass you
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Comment on Update inequality by vankhea
https://vankheakh.wordpress.com/update-inequality/#comment-34
Sun, 09 Oct 2011 02:01:24 +0000http://vankheakh.wordpress.com/?page_id=255#comment-34u should learn more about inequality in some link below http://rattanakrith.blogspot.com/2011/06/van-kheas-inequality-and-applications.html http://mathbookee.blogspot.com/2011/03/van-khea-inequality-and-applications.html https://vankheakh.wordpress.com/2011/04/02/van-kheas-inequality-and-application/
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Comment on Update inequality by vankhea
https://vankheakh.wordpress.com/update-inequality/#comment-33
Sun, 09 Oct 2011 01:56:36 +0000http://vankheakh.wordpress.com/?page_id=255#comment-33second solution: use inequality 04 van khea click link below https://vankheakh.wordpress.com/category/van-khea-04/
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Comment on Update inequality by vankhea
https://vankheakh.wordpress.com/update-inequality/#comment-32
Sun, 09 Oct 2011 01:54:32 +0000http://vankheakh.wordpress.com/?page_id=255#comment-32first solution: it not difficult you just use Holder’s inequality with 1/a1+1/a2+1/a3=1 ; with a1=p/s ; a2=q/s ; a3=r/s
remember that |summation ai^s bi^s ci ^s|^1/s<=(summation |ai^sbi^sci^s|)^1/s.
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Comment on Update inequality by aya hussein
https://vankheakh.wordpress.com/update-inequality/#comment-30
Sat, 08 Oct 2011 19:05:30 +0000http://vankheakh.wordpress.com/?page_id=255#comment-30thanxs
if i want to prove |summation ai^s bi^s ci ^s|^1/s <= (summation |ai|^p)^1/p*(summation |bi|^q)^1/q*(summation |ci|^r)^1/r
where 1/p+1/q+1/r=1/s can you help me
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