Entropic Solution of the Innovation Conjecture of T. Kailath

Abstract

On a general filtered probability space, for a given signal Ut=Bt+∫0tusds, we prove that the filtration of U is equal to the filtration of its innovation process Z if and only if H(Z()|μ)= E[∫01|EP[us|s]|2ds] where d=(-∫01 EP[us|s]dZs- ∫01|EP[us|s]|2 ds)dP in case the density has expectation one, otherwies we give a localized version of the same strength with a sequence of stopping times of the filtration of U.