Asymmetric Copulas and Their Application in Design of Experiments
From MaRDI portal
Publication:5213717
DOI10.1007/978-3-319-28808-6_9zbMath1429.60024OpenAlexW2471959031MaRDI QIDQ5213717
Elisa Perrone, Fabrizio Durante
Publication date: 4 February 2020
Published in: On Logical, Algebraic, and Probabilistic Aspects of Fuzzy Set Theory (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/978-3-319-28808-6_9
Optimal statistical designs (62K05) Probability distributions: general theory (60E05) Fuzzy probability (60A86) Fuzziness and design of statistical experiments (62K86)
Related Items
\(D_s\)-optimality in copula models ⋮ On the degree of asymmetry of a quasi-copula with respect to a curve
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Construction of asymmetric copulas and its application in two-dimensional reliability modelling
- A flexible and tractable class of one-factor copulas
- Factor copula models for multivariate data
- Maximal non-exchangeability in dimension \(d\)
- Measures of non-exchangeability for bivariate random vectors
- Symmetry of functions and exchangeability of random variables
- Best-possible bounds on the set of copulas with given degree of non-exchangeability
- Graded dominance and related graded properties of fuzzy connectives
- Archimax copulas and invariance under transformations
- Erratum to ``Construction of asymmetric multivariate copulas
- A goodness-of-fit test for bivariate extreme-value copulas
- Invariant dependence structures and Archimedean copulas
- New constructions of diagonal patchwork copulas
- An introduction to copulas.
- Multivariate Archimedean copulas, \(d\)-monotone functions and \(\ell _{1}\)-norm symmetric distributions
- Construction of non-exchangeable bivariate distribution functions
- Extremes of nonexchangeability
- Design of experiments for bivariate binary responses modelled by copula functions
- On copulas, quasicopulas and fuzzy logic
- Construction of asymmetric multivariate copulas
- From Archimedean to Liouville copulas
- On the construction of copulas and quasi-copulas with given diagonal sections
- Shuffles of copulas
- On nonparametric measures of dependence for random variables
- Composite fuzzy relational equations with non-commutative conjunctions
- Nonstandard conjunctions and implications in fuzzy logic
- Triangular norms
- Baire category results for exchangeable copulas
- Inference in multivariate Archimedean copula models
- Tests of symmetry for bivariate copulas
- Some results on shuffles of two-dimensional copulas
- Design of experiments in nonlinear models. Asymptotic normality, optimality criteria and small-sample properties
- Bivariate distributions with given extreme value attractor
- Multivariate patchwork copulas: a unified approach with applications to partial comonotonicity
- Non-exchangeability of negatively dependent random variables
- Multivariate Archimax copulas
- Conjunctors and their residual implicators: characterizations and construction methods
- Adaptive designs for dose-finding based on efficacy-toxicity response
- Assessing and Modeling Asymmetry in Bivariate Continuous Data
- Graphical and formal statistical tools for the symmetry of bivariate copulas
- Invariant dependence structure under univariate truncation
- A Non-parametric Test of Exchangeability for Extreme-Value and Left-Tail Decreasing Bivariate Copulas
- Optimal designs for copula models
- ON THE CLASSES OF COPULAS AND QUASI-COPULAS WITH A GIVEN DIAGONAL SECTION
- Spatial contagion between financial markets: a copula-based approach
- Dependence Modeling with Copulas
- On measures of dependence
- The Equivalence of Two Extremum Problems
- Rectangular Patchwork for Bivariate Copulas and Tail Dependence
- COPULAS WITH GIVEN DIAGONAL SECTIONS: NOVEL CONSTRUCTIONS AND APPLICATIONS
- Copules archimédiennes et families de lois bidimensionnelles dont les marges sont données
- Optimal Designs for Bivariate Logistic Regression
- Principles of Copula Theory
- The Sequential Generation of $D$-Optimum Experimental Designs
- The Design of Experiments in the Multiresponse Case
This page was built for publication: Asymmetric Copulas and Their Application in Design of Experiments
