An Open Mapping Theorem for Measures.
Application de la théorie des algèbres de mesures à l'étude des mesures spectrales.
Applications de radonification des mesures compactologiques d'un espace métrique
Applications of the Kantorovich-Rubinstein maximum principle in the theory of Markov semigroups [Book]
Approximating Radon measures on first-countable compact spaces
The assertion every Radon measure defined on a first-countable compact space is uniformly regular is shown to be relatively consistent. We prove an analogous result on the existence of uniformly distributed sequences in compact spaces of small character. We also present two related examples constructed under CH.
Asimptotic Distribution and Weak Convergence on Compact Riemannian Manifolds.
Asymptotic periodicity of Markov operators on signed measures
A new criterion of asymptotic periodicity of Markov operators on , established in [3], is extended to the class of Markov operators on signed measures.
Asymptotic stability of a linear Boltzmann-type equation
We present a new necessary and sufficient condition for the asymptotic stability of Markov operators acting on the space of signed measures. The proof is based on some special properties of the total variation norm. Our method allows us to consider the Tjon-Wu equation in a linear form. More precisely a new proof of the asymptotic stability of a stationary solution of the Tjon-Wu equation is given.