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Characterizations of counter-monotonicity and upper comonotonicity by (tail) convex order

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<title>Characterizations of counter-monotonicity and upper comonotonicity by (tail) convex order</title>
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<namePart>Chun Cheung, Ka</namePart>
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<abstract displayLabel="Summary">In this paper, we characterize counter-monotonic and upper comonotonic random vectors by the optimality of the sum of their components in the senses of the convex order and tail convex order respectively. In the first part, we extend the characterization of comonotonicity by  Cheung (2010) and show that the sum of two random variables is minimal with respect to the convex order if and only if they are counter-monotonic. Three simple and illuminating proofs are provided. In the second part, we investigate upper comonotonicity by means of the tail convex order. By establishing some useful properties of this relatively new stochastic order, we prove that an upper comonotonic random vector must give rise to the maximal tail convex sum, thereby completing the gap in  Nam et al. (2011)¿s characterization. The relationship between the tail convex order and risk measures along with conditions under which the additivity of risk measures is sufficient for upper comonotonicity is also explored.</abstract>
<note type="statement of responsibility">Ka Chun Cheung, Ambrose Lo</note>
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<title>Insurance : mathematics and economics</title>
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<publisher>Oxford : Elsevier, 1990-</publisher>
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<identifier type="issn">0167-6687</identifier>
<identifier type="local">MAP20077100574</identifier>
<part>
<text>02/09/2013 Volumen 53 Número 2 - septiembre 2013 </text>
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