Bernstein Fractional Derivatives: Censoring and Stochastic Processes

Abstract

We define censored fractional Bernstein derivatives on the positive half-line based on the Bernstein--Riemann--Liouville fractional derivative. The censored fractional derivative turns out to be the generator of the censored decreasing subordinator Sc = (Stc)t≥ 0, which is obtained either via a pathwise construction by removing those jumps from the decreasing subordinator (x-St)t≥ 0, x>0, that drive the path into negative territory, or via the Hille--Yosida theorem. Then we show that the censored decreasing subordinator has only finite life-time, and we identify various probability distributions related to Sc.

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