Near optimal thresholding estimation of a Poisson intensity on the real line

Abstract

The purpose of this paper is to estimate the intensity of a Poisson process N by using thresholding rules. In this paper, the intensity, defined as the derivative of the mean measure of N with respect to ndx where n is a fixed parameter, is assumed to be non-compactly supported. The estimator fn,γ based on random thresholds is proved to achieve the same performance as the oracle estimator up to a possible logarithmic term. Then, minimax properties of fn,γ on Besov spaces B αp,q are established. Under mild assumptions, we prove that f∈ B αp,q L∞ E( | | fn,γ-f| |22)≤ C( nn) α α+1/2+(1/2-1p)+ and the lower bound of the minimax risk for B αp,q L∞ coincides with the previous upper bound up to the logarithmic term. This new result has two consequences. First, it establishes that the minimax rate of Besov spaces B αp,q with p≤ 2 when non compactly supported functions are considered is the same as for compactly supported functions up to a logarithmic term. When p>2, the rate exponent, which depends on p, deteriorates when p increases, which means that the support plays a harmful role in this case. Furthermore, fn,γ is adaptive minimax up to a logarithmic term.