arXiv:1910.12821 Abstract | arXiv Analytics

arXiv:1910.12821 [math.PR]Abstract References Reviews Resources

Spectral theory for one-dimensional (non-symmetric) stable processes killed upon hitting the origin

Published 2019-10-28Version 1

We obtain an integral formula for the distribution of the first hitting time of the origin for one-dimensional $\alpha$-stable processes $X_t$, where $\alpha\in(1,2)$. We also find a spectral-type integral formula for the transition operators $P_0^t$ of $X_t$ killed upon hitting the origin. Both expressions involve exponentially growing oscillating functions, which play a role of generalised eigenfunctions for $P_0^t$.

Categories: math.PR

Keywords: stable processes, spectral theory, one-dimensional, non-symmetric, spectral-type integral formula

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