Functions operating on several multivariate distribution functions

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Functions operating on several multivariate distribution functions

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Ressel Paul
(MGF, Kath. Universität Eichstätt-Ingolstadt, Ostenstr. 26, Eichstätt, Germany)

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Abstract

Functions ff on [0,1]m{\left[0,1]}^{m} such that every composition f∘(g1,…,gm)f\circ \left({g}_{1},\ldots ,{g}_{m}) with dd-dimensional distribution functions g1,…,gm{g}_{1},\ldots ,{g}_{m} is again a distribution function, turn out to be characterized by a very natural monotonicity condition, which for d=2d=2 means ultramodularity. For m=1m=1 (and d=2d=2), this is equivalent with increasing convexity.

Suggested Citation

Ressel Paul, 2023. "Functions operating on several multivariate distribution functions," Dependence Modeling, De Gruyter, vol. 11(1), pages 1-11, January.

Handle: RePEc:vrs:demode:v:11:y:2023:i:1:p:11:n:1
DOI: 10.1515/demo-2023-0104

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References listed on IDEAS

Ressel, Paul, 2011. "Monotonicity properties of multivariate distribution and survival functions -- With an application to Lévy-frailty copulas," Journal of Multivariate Analysis, Elsevier, vol. 102(3), pages 393-404, March.
Ressel, Paul, 2012. "Functions operating on multivariate distribution and survival functions—With applications to classical mean-values and to copulas," Journal of Multivariate Analysis, Elsevier, vol. 105(1), pages 55-67.
Massimo Marinacci & Luigi Montrucchio, 2005. "Ultramodular Functions," Mathematics of Operations Research, INFORMS, vol. 30(2), pages 311-332, May.
- Massimo Marinacci & Luigi Montrucchio, 2003. "Ultramodular functions," ICER Working Papers - Applied Mathematics Series 13-2003, ICER - International Centre for Economic Research.

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Keywords

multivariate distribution function; ultramodular; Bernstein polynomials; Faà di Bruno’s formula; higher order; monotonicity; 26E05; 26B40; 60E05;
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Functions operating on several multivariate distribution functions

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