for D being non-empty finite-yielding ManySortedSet of NAT
for P being Probability_sequence of Trivial-SigmaField_sequence D holds
( (Product-Probability (P,D)) . 0 = P . 0 & (Product-Probability (P,D)) . 1 = Product-Probability ((D . 0),(D . 1),(P . 0),(P . 1)) & ex P1 being Probability of Trivial-SigmaField [:(D . 0),(D . 1):] st
( P1 = (Product-Probability (P,D)) . 1 & (Product-Probability (P,D)) . 2 = Product-Probability ([:(D . 0),(D . 1):],(D . 2),P1,(P . 2)) ) & ex P2 being Probability of Trivial-SigmaField [:(D . 0),(D . 1),(D . 2):] st
( P2 = (Product-Probability (P,D)) . 2 & (Product-Probability (P,D)) . 3 = Product-Probability ([:(D . 0),(D . 1),(D . 2):],(D . 3),P2,(P . 3)) ) & ex P3 being Probability of Trivial-SigmaField [:(D . 0),(D . 1),(D . 2),(D . 3):] st
( P3 = (Product-Probability (P,D)) . 3 & (Product-Probability (P,D)) . 4 = Product-Probability ([:(D . 0),(D . 1),(D . 2),(D . 3):],(D . 4),P3,(P . 4)) ) )