The area of a self-similar fragmentation
Abstract
We consider the area A=∫0∞(Σi=1∞ Xi(t)) t of a self-similar fragmentation process =((t), t≥ 0) with negative index. We characterize the law of A by an integro-differential equation. The latter may be viewed as the infinitesimal version of a recursive distribution equation that arises naturally in this setting. In the case of binary splitting, this yields a recursive formula for the entire moments of A which generalizes known results for the area of the Brownian excursion.
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