Hitting probabilities for L\'evy processes on the real line
Abstract
We prove sharp two-sided estimates on the tail probability of the first hitting time of bounded interval as well as its asymptotic behaviour for general non-symmetric processes which satisfy an integral condition \[ ∫0∞ d1+Re ()<∞. \] To this end, we first prove and then apply the global scale invariant Harnack inequality. Results are obtained under certain conditions on the characteristic exponent. We provide a wide class of L\'evy processs which satisfy these assumptions.
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