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$S$-Geometric Convexity of a Function Involving Maclaurin's Elementary Symmetric Mean


	Authors:	Xiao-Ming Zhang,
	Keywords:	Geometrically convex function, $S$-geometrically convex function, Inequality, Maclaurin-Inequality, Logarithm majorization.
	Date Received:	23/02/07
	Date Accepted:	27/04/07
	Subject Codes:	Primary 26D15.
	Editors:	Peter S. Bullen,


	Abstract:	Let $x_{i}>0,i=1,2,dots ,n$ , $x=left( {x_{1},x_{2},dots ,x_{n}}right)$ , the th elementary symmetric function of is defined as $P_{n}left( {x,k}right) =left( {{binom{n}{k}} ^{-1}E_{n}left( {x,k}right) }right) ^{frac{1}{k}}$ , and the function is defined as $fleft( xright) =P_{n}left( {x,k-1}right) -P_{n}left( {x,k}right)$ . The paper proves that is a S-geometrically convex function. The result generalizes the well-known Maclaurin-Inequality.;

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