Abstract:
Let $(\Omega,\mathscr F,\mathbf P)$ be a probability space with an increasing family of $\sigma$-algebras $(\mathscr F_t)$, $t\in R_+$, and let $X=(X_t)$ be a semi-martingale, that is $X_t=A_t+M_t$, $\forall t\in R_+$, where $A_t$ is a process with bounded variation and $M_t$ is a martingale.
In the paper, under some conditions, a new measure $\widetilde{\mathbf P}(d\omega)=\zeta(\omega)\mathbf P(d\omega)$ is constructed such that, on the new probability space $(\Omega,\mathscr F,\widetilde{\mathbf P})$ with the same family of $\sigma$-algebras $(\mathscr F_t)$, the process $X$ is a process with independent increments.
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