Z2-Algebras in the Boolean Function Irreducible Decomposition

Abstract

We develop further the consequences of the irreducible-Boolean classification established in Ref. [9]; which have the advantage of allowing strong statistical calculations in disordered Boolean function models, such as the NK-Kauffman networks. We construct a ring-isomorphism mathfrakRK i1, ..., iλ P2 -[K] of the set of reducible K-Boolean functions that are reducible in the Boolean arguments with indexes i1, ..., iλ; and the double power set P2 [K], of the first K natural numbers. This allows us, among other things, to calculate the number K (λ, ω) of K-Boolean functions which are λ -irreducible with weight ω. K (λ, ω) is a fundamental quantity in the study of the stability of NK-Kauffman networks against changes in their connections between their Boolean functions; as well as in the mean field study of their dynamics when Boolean irreducibility is taken into account.