JIPAM - Journal of Inequalities in Pure and Applied Mathematics

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Note on the Carleman's Inequality for a Negative Power Number


	Authors:	Thanh Long Nguyen, Vu Duy Linh Nguyen, Thi Thu Van Nguyen,
	Keywords:	Carleman's inequality.
	Date Received:	30/10/02
	Date Accepted:	25/11/02
	Subject Codes:	26D15
	Editors:	Hüseyin Bor,


	Abstract:	By the method of indeterminate coefficients we prove the inequality $displaystyle sum_{n=1}^{infty }frac{n}{frac{1}{a_{1}}+frac{1}{a {2}}+...+frac{1}{%% a_{n}}}$ $displaystyle leq 2sum_{n=1}^{infty }left( 1-frac{1}{3n+1}%% -4n^{2}sum_{k=n}^{infty }frac{1}{k(k+1)^{2}(3k+1)(3k+4)}right) a_{n},$ where $a_{n}>0, n=1,2,... sum_{n=1}^{infty }a_{n}<infty .$ ;

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