907 research outputs found
Copulas in finance and insurance
Copulas provide a potential useful modeling tool to represent the dependence structure
among variables and to generate joint distributions by combining given marginal
distributions. Simulations play a relevant role in finance and insurance. They are used to
replicate efficient frontiers or extremal values, to price options, to estimate joint risks, and so
on. Using copulas, it is easy to construct and simulate from multivariate distributions based
on almost any choice of marginals and any type of dependence structure. In this paper we
outline recent contributions of statistical modeling using copulas in finance and insurance.
We review issues related to the notion of copulas, copula families, copula-based dynamic and
static dependence structure, copulas and latent factor models and simulation of copulas.
Finally, we outline hot topics in copulas with a special focus on model selection and
goodness-of-fit testing
On approximating copulas by finite mixtures
Copulas are now frequently used to approximate or estimate multivariate
distributions because of their ability to take into account the multivariate
dependence of the variables while controlling the approximation properties of
the marginal densities. Copula based multivariate models can often also be more
parsimonious than fitting a flexible multivariate model, such as a mixture of
normals model, directly to the data. However, to be effective, it is imperative
that the family of copula models considered is sufficiently flexible. Although
finite mixtures of copulas have been used to construct flexible families of
copulas, their approximation properties are not well understood and we show
that natural candidates such as mixtures of elliptical copulas and mixtures of
Archimedean copulas cannot approximate a general copula arbitrarily well. Our
article develops fundamental tools for approximating a general copula
arbitrarily well by a mixture and proposes a family of finite mixtures that can
do so. We illustrate empirically on a financial data set that our approach for
estimating a copula can be much more parsimonious and results in a better fit
than approximating the copula by a mixture of normal copulas.Comment: 26 pages and 1 figure and 2 table
Approximating multivariate distributions with vines
In a series of papers, Bedford and Cooke used vine (or pair-copulae) as a graphical tool for representing complex high dimensional distributions in terms of bivariate and conditional bivariate distributions or copulae. In this paper, we show that how vines can be used to approximate any given multivariate distribution to any required degree of approximation. This paper is more about the approximation rather than optimal estimation methods. To maintain uniform approximation in the class of copulae used to build the corresponding vine we use minimum information approaches. We generalised the results found by Bedford and Cooke that if a minimal information copula satis¯es each of the (local) constraints (on moments, rank correlation, etc.), then the resulting joint distribution will be also minimally informative given those constraints, to all regular vines. We then apply our results to modelling a dataset of Norwegian financial data that was previously analysed in Aas et al. (2009)
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