Transfer of regularity for Markov semigroups
Abstract
We study the regularity of a Markov semigroup (Pt)t>0, that is, when Pt(x,dy)=pt(x,y)dy for a suitable smooth function pt(x,y). This is done by transferring the regularity from an approximating Markov semigroup sequence (Pnt)t>0, n∈N, whose associated densities pnt(x,y) are smooth and can blow up as n∞. We use an interpolation type result and we show that if there exists a good equilibrium between the blow up and the speed of convergence, then Pt(x,dy)=pt(x,y)dy and pt has some regularity properties.
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