On moments of integral exponential functionals of additive processes
Abstract
For real-valued additive process (X\t)\t≥ 0 a recursive equation is derived for the entire positive moments of functionals I\s,t= ∫ \st(-X\u)du, 0≤ s<t≤∞, in case the Laplace exponent of X\t exists for positive values of the parameter. From the equation emergesan easy-to-apply sufficient condition for the finiteness of the moments. As an application we study first hitprocesses of diffusions.
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