Squaring the Circle and Cubing the Sphere: Circular and Spherical Copulas

Abstract

Do there exist circular and spherical copulas in Rd? That is, do there exist circularly symmetric distributions on the unit disk in R2 and spherically symmetric distributions on the unit ball in Rd, d3, whose one-dimensional marginal distributions are uniform? The answer is yes for d=2 and 3, where the circular and spherical copulas are unique and can be determined explicitly, but no for d4. A one-parameter family of elliptical bivariate copulas is obtained from the unique circular copula in R2 by oblique coordinate transformations. Copulas obtained by a non-linear transformation of a uniform distribution on the unit ball in Rd are also described, and determined explicitly for d=2.