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XV: 21, 290-306, LNM 850 (1981)

**CHACON, Rafael V.**; **LE JAN, Yves**; **WALSH, John B.**

Spatial trajectories (Markov processes, General theory of processes)

It is well known that Markov processes with the same excessive functions are the same up to a strictly increasing continuous time-change. It is therefore natural to study spatial trajectories, i.e., trajectories up to a strictly increasing continuous time changes, and in particular to provide the space of all spatial trajectories with a reasonable $\sigma$-field so that it may carry measures. It is shown here that the space of right-continuous spatial trajectories with left-hand limits is a Blackwell space. The class of intrinsic stopping times defined on this space is also investigated

Comment: See Chacon-Jamison,*Israel J. of M.*, **33**, 1979

Keywords: Spatial trajectories

Nature: Original

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Spatial trajectories (Markov processes, General theory of processes)

It is well known that Markov processes with the same excessive functions are the same up to a strictly increasing continuous time-change. It is therefore natural to study spatial trajectories, i.e., trajectories up to a strictly increasing continuous time changes, and in particular to provide the space of all spatial trajectories with a reasonable $\sigma$-field so that it may carry measures. It is shown here that the space of right-continuous spatial trajectories with left-hand limits is a Blackwell space. The class of intrinsic stopping times defined on this space is also investigated

Comment: See Chacon-Jamison,

Keywords: Spatial trajectories

Nature: Original

Retrieve article from Numdam