On self-similar Bernstein functions and corresponding generalized fractional derivatives

Abstract

We use the theory of Bernstein functions to analyze power law tail behavior with log-periodic perturbations which corresponds to self-similarity of the Bernstein functions. Such tail behavior appears in the context of semistable L\'evy processes. The Bernstein approach enables us to solve some open questions concerning semi-fractional derivatives recently introduced in Fract. Calc. Appl. Anal. 22(2), pp. 326--357, by means of the generator of certain semistable L\'evy processes. In particular it is shown that semi-fractional derivatives can be seen as generalized fractional derivatives in the sense of Kochubei ( Integr. Equ. Oper. Theory 71, pp. 583--600).

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