nonfactorizability
Nonfactorizability is the property of a system or model in which its description cannot be written as a product of independent parts. In probability theory, a joint distribution P(A,B) is factorizable if P(A,B) = P(A)P(B). Nonfactorizable distributions exhibit correlations that cannot be reduced to independent marginals. The concept also applies to functions and physical models where a two-part description cannot be separated into a product of a function of one part and a function of the other.
In quantum physics, nonfactorizability is closely tied to quantum entanglement and the failure of local hidden-variable
Beyond physics, nonfactorizability appears in mathematics and computation to describe objects that cannot be written as