copulae

Copulae are a fundamental concept in probability theory and statistics, referring to functions that describe the dependence structure between random variables. In simpler terms, a copula links the marginal distributions of multiple random variables to their joint distribution. This means that a copula captures the "shape" of the dependence without being influenced by the individual behaviors (marginal distributions) of the variables themselves.

The key idea behind copulae is Sklar's Theorem, which states that any multivariate joint distribution function

There are numerous types of copulae, each modeling different dependence structures. Some common examples include Archimedean