On the Feynman--Kac semigroup for some Markov processes
Abstract
For a (non-symmetric) strong Markov process X, consider the Feynman--Kac semigroup \[TtAf(x):= Ex[eAtf(Xt)], x∈ Rn, t>0,\] where A is a continuous additive functional of X associated with some signed measure. Under the assumption that X admits a transition probability density that possesses upper and lower bounds of certain type, we show that the kernel corresponding to TtA possesses the density ptA(x,y) with respect to the Lebesgue measure and construct upper and lower bounds for ptA(x,y). Some examples are provided.
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