On a skew stable L\'evy process

Abstract

The skew Brownian motion is a strong Markov process which behaves like a Brownian motion until hitting zero and exhibits an asymmetry at zero. We address the following question: what is a natural counterpart of the skew Brownian motion in the situation that the noise is a stable L\'evy process with finite mean and infinite variance. We define a skew stable L\'evy process X as the limit of a sequence of stable L\'evy processes which are perturbed at zero. We point out a formula for the resolvent of X and show that X is a solution to a stochastic differential equation with a local time. Also, we provide a representation of X in terms of It\o`s excursion theory.

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