Absolute Continuity and Singularity of Two Probability Measures on a Filtered Space

Let μ and ν be fixed probability measures on a filtered space $(\varOmega, \mathcal{F}, \allowbreak(\mathcal{F}_{t} )_{t\in \mathbf{R}^{+} } )$ . Denote by μ T and ν T (respectively, μ T− and ν T−) the restrictions of the measures μ and ν on $\mathcal{F}_{T} $ (respectively, on $\mathcal{F}_{T-} $ ) for a stopping time T. We find the Hahn decomposition of μ T and ν T using the Hahn decomposition of the measures μ, ν and the Hellinger process h t in the strict sense of order $\frac{1}{2}$ . The norm of the absolutely continuous component of μ T− with respect to ν T− is computed in terms of density processes and Hellinger integrals.