On invariant measures of extensions of Markov transition functions

In this paper the rearrangement-invariant hulls and kernels of the classes loc ] on a noncompact nondiscrete locally compact abelian group are characterized. The space L 1 loc & S$ of tempered distributions serves as the extended domain of the Fourier transform instead of the classical domain L 1 +

We develop a new approach to the measure extension problem, based on nonstandard analysis. The class of thick topological spaces, which includes all locally compact and all K-analytic spaces, is introduced in this paper, and measure extension results of the following type are obtained: If (X, T) is

We prove uniqueness of "invariant measures," i.e., solutions to the equation L \* µ = 0 where L = ∆ + B • ∇ on R n with B satisfying some mild integrability conditions and µ being a probability measure on R n . This solves an open problem posed by S. R. S. Varadhan in 1980. The same conditions are s