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Medicaid Expansion and Retail Pharmacy Availability.
JAMA Health ForumKakani P +4 more
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Trends in Ultraprocessed Food Consumption Among Korean Children and Adolescents, 2007 to 2024.
JAMA Netw OpenJung S +5 more
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Learning weights for the quasi-weighted means
IEEE Transactions on Fuzzy Systems, 2002We study the determination of weights for quasi-weighted means (also called quasi-linear means) when a set of examples is given. We consider first a simple case, the learning of weights for weighted means, and then we extend the approach to the more general case of a quasi-weighted mean. We consider the case of a known arbitrary generator f.
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Extended means as weighted means
Proceedings of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences, 2001Summary: Extended means can be viewed as special cases of the well-known weighted means. With this point of view, many properties of the extended means, like monotonicity and convexity, can be derived very easily from the corresponding established results of the weighted means.
Li, Xin, Mohapatra, R. N.
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Information Sciences, 2007
The paper contributes to the theory of aggregation operators, namely to the ordinal means investigation. It aims at modifying a former model known in the literature and introducing so-called ordinal means. The modification leads to the consequence that each obtained aggregation function is an ordinal mean.
Kolesárová, Anna +2 more
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The paper contributes to the theory of aggregation operators, namely to the ordinal means investigation. It aims at modifying a former model known in the literature and introducing so-called ordinal means. The modification leads to the consequence that each obtained aggregation function is an ordinal mean.
Kolesárová, Anna +2 more
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Complex Analysis and Operator Theory, 2017
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Forum Mathematicum, 2012
In the recent years, many authors have discussed the geometric mean of \(n\) positive definite matrices. We have three types of geometric means which have at least ten nice properties. One of them is called BMP mean, which is defined by using symmetrization procedures [\textit{D. A. Bini}, \textit{B. Meini} and \textit{F. Poloni}, Math. Comput. 79, No.
Lawson, Jimmie, Lee, Hosoo, Lim, Yongdo
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In the recent years, many authors have discussed the geometric mean of \(n\) positive definite matrices. We have three types of geometric means which have at least ten nice properties. One of them is called BMP mean, which is defined by using symmetrization procedures [\textit{D. A. Bini}, \textit{B. Meini} and \textit{F. Poloni}, Math. Comput. 79, No.
Lawson, Jimmie, Lee, Hosoo, Lim, Yongdo
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Canadian Mathematical Bulletin, 1989
AbstractThe aim of this paper is two-fold: First we prove the Radotype inequality Here denote the weighted geometric means of with where the pi are positive weights. Thereafter we investigate under which conditions the sequence is convergent as n → ∞
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AbstractThe aim of this paper is two-fold: First we prove the Radotype inequality Here denote the weighted geometric means of with where the pi are positive weights. Thereafter we investigate under which conditions the sequence is convergent as n → ∞
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Generalized Weighted Mean Programming
SIAM Journal on Applied Mathematics, 1971Two algorithms for nonlinear programming are given. The idea behind these algorithms is the arithmetic-geometric mean inequality. Two examples are shown together with the necessary proofs of convergence.
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On Weighted Randomly Trimmed Means
Journal of Systems Science and Complexity, 2007zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Wang, Ting, Li, Yong, Cui, Hengjian
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