LEBESGUE DECOMPOSITION FOR REPRESENTABLE FUNCTIONALS ON *-ALGEBRAS

We offer a Lebesgue-type decomposition of a representable functional on a *-algebra into absolutely continuous and singular parts with respect to another. Such a result was proved by Zs. Szucs due to a general Lebesgue decomposition theorem of S. Hassi, H.S.V. de Snoo, and Z. Sebestyen concerning non-negative Hermitian forms. In this paper, we provide a self-contained proof of Szucs' result and in addition we prove that the corresponding absolutely continuous parts are absolutely continuous with respect to each other.