Abstract
We are interested in estimating the location of what we call “smooth change-point” from n independent observations of an inhomogeneous Poisson process. The smooth change-point is a transition of the intensity function of the process from one level to another which happens smoothly, but over such a small interval, that its length delta _n is considered to be decreasing to 0 as nrightarrow +infty . We show that if delta _n goes to zero slower than 1/n, our model is locally asymptotically normal (with a rather unusual rate sqrt{delta _n/n}), and the maximum likelihood and Bayesian estimators are consistent, asymptotically normal and asymptotically efficient. If, on the contrary, delta _n goes to zero faster than 1/n, our model is non-regular and behaves like a change-point model. More precisely, in this case we show that the Bayesian estimators are consistent, converge at rate 1/n, have non-Gaussian limit distributions and are asymptotically efficient. All these results are obtained using the likelihood ratio analysis method of Ibragimov and Khasminskii, which equally yields the convergence of polynomial moments of the considered estimators. However, in order to study the maximum likelihood estimator in the case where delta _n goes to zero faster than 1/n, this method cannot be applied using the usual topologies of convergence in functional spaces. So, this study should go through the use of an alternative topology and will be considered in a future work.
Highlights
This paper lies within the realm of statistical inference for inhomogeneous Poisson processes
The model of inhomogeneous Poisson process is at the same time simple enough to allow the use of the likelihood ratio analysis, and sufficiently reach to modelize various random phenomena in diverse applied fields, such as biology, communication, seismology, astronomy, reliability theory, and so on (see, for example, Cox and Lewis 1966a, b; Thompson 1988; Snyder and Miller 1991; Streit 2010; Sarkar 2016, as well as Cha and Finkelstein (2018))
We are interested in the problem of estimation of the location θ, where the intensity function of an inhomogeneous Poisson process switches from one level to another
Summary
This paper lies within the realm of statistical inference for inhomogeneous Poisson processes. As to the fast case, we show that the asymptotic behavior of the Bayesian estimators is exactly the same as in the change-point model: they are consistent, converge at rate 1/n, their limit distribution is given by a functional of a two-sided Poisson process, and they are asymptotically efficient. In our opinion, these results justify the (successful) use of change-point models for real applications, despite the fact that physical systems can not switch immediately (discontinuously) from one level to another. Considering a given signal corresponds to fixing the length of the transition interval δ, and as bigger values of the SNR in the signal in WGN model correspond to bigger values of n in our model, the large SNR case is consistent with the case when nδ is large, and the moderate SNR case with the case when nδ is small (but n large)
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