Hiroshi Tsukada
Published 2017-02-02Version 1
For symmetric L\'evy processes, if the local times exist, the Tanaka formula has already constructed via the techniques in the potential theory by Salminen and Yor (2007). In this paper, we study the Tanaka formula for arbitrary strictly stable processes with index $\alpha \in (1,2)$ including spectrally positive and negative cases in a framework of It\^o's stochastic calculus. Our approach to the existence of local times for such processes is different from Bertoin (1996).
Moduli of continuity of local times of random walks on graphs in terms of the resistance metric
Potential Theory of Truncated Stable Processes
An Application of Renewal Theorems to Exponential Moments of Local Times
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