JIPAM - Journal of Inequalities in Pure and Applied Mathematics

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Generalized $\lambda$-Newton Inequalities Revisited


	Authors:	Jianhong Xu,
	Keywords:	Elementary symmetric functions, $lambda$-Newton inequalities, generalized $lambda$-Newton inequalities, arithmetic mean-geometric mean inequality, positive stable matrices, determinant-trace inequality.
	Date Received:	23/10/08
	Date Accepted:	10/02/09
	Subject Codes:	05A20, 05E05, 15A15, 15A42, 15A45, 26D05
	Editors:	Jerry J. Koliha,


	Abstract:	We present in this work a new and shorter proof of the generalized -Newton inequalities for elementary symmetric functions defined on a self-conjugate set which lies essentially in the open right half-plane. We also point out some interesting consequences of the generalized -Newton inequalities. In particular, we establish an improved complex version of the arithmetic mean-geometric mean inequality along with the corresponding determinant-trace inequality for positive stable matrices.;

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