Geometry of discrete copulas

Abstract: Multivariate distributions are fundamental to modeling. Discrete copulas can be used to construct diverse multivariate joint distributions over random variables from estimated univariate marginals. The space of discrete copulas admits a representation as a convex polytope which can be exploited in entropy-copula methods relevant to hydrology and climatology. To allow for an extensive use of such methods in a wide range of applied fields, it is important to have a geometric representation of discrete copulas wi… Show more

“…We now present the definition of discrete copulas on non-uniform grid domains, originally introduced in [18], and the associated convex polytopes.…”

“…A similar correspondence holds between the as the alternating transportation polytope [11,26]. The definition of discrete (quasi-) copulas is further generalized in [18] to the discrete (quasi-) copulas on arbitrary grid domains. There, the authors also show a connection between discrete (quasi-) copulas and other classes of (alternating) transportation polytopes.…”

“…Another work shows an application to copula selection in portfolio optimization [13]. In [18], the authors use tools from discrete geometry to define the polytopal representations of subfamilies of discrete copulas with desirable stochastic properties. Such representations can be helpful to design a hypothesis test for a negative dependence property [7].…”

“…On the mathematical side, discrete copulas (and discrete quasi-copulas) have been extensively studied in terms of their matrix representations [1,2,9,12,14,15,16,21]. In [18], the authors highlight that the space of discrete copulas with fixed marginal distributions of finite support of size p and q, respectively, corresponds to a polytope known as the generalized Birkhoff polytope [6]. A similar correspondence holds between the as the alternating transportation polytope [11,26].…”

Extreme Points of Polytopes of Discrete Copulas

“…We now present the definition of discrete copulas on non-uniform grid domains, originally introduced in [18], and the associated convex polytopes.…”

“…A similar correspondence holds between the as the alternating transportation polytope [11,26]. The definition of discrete (quasi-) copulas is further generalized in [18] to the discrete (quasi-) copulas on arbitrary grid domains. There, the authors also show a connection between discrete (quasi-) copulas and other classes of (alternating) transportation polytopes.…”

“…Another work shows an application to copula selection in portfolio optimization [13]. In [18], the authors use tools from discrete geometry to define the polytopal representations of subfamilies of discrete copulas with desirable stochastic properties. Such representations can be helpful to design a hypothesis test for a negative dependence property [7].…”

“…On the mathematical side, discrete copulas (and discrete quasi-copulas) have been extensively studied in terms of their matrix representations [1,2,9,12,14,15,16,21]. In [18], the authors highlight that the space of discrete copulas with fixed marginal distributions of finite support of size p and q, respectively, corresponds to a polytope known as the generalized Birkhoff polytope [6]. A similar correspondence holds between the as the alternating transportation polytope [11,26].…”

Extreme Points of Polytopes of Discrete Copulas

“…For results concerning the geometry of J µν see [3] and [14] where they are referred to as transportation polytopes and discrete copulas respectively. The earth mover's distance is defined as ‫,‪(µ‬ބލޅ‬ ν) = inf…”

Expected value of the one-dimensional earth mover’s distance

Polytopes of Discrete Copulas and Applications