Local polynomial estimation of the intensity of a doubly stochastic Poisson process with bandwidth selection procedure

Abstract

We consider a doubly stochastic Poisson process with stochastic intensity λt =n q(Xt) where X is a continuous It\o semimartingale and n is an integer. Both processes are observed continuously over a fixed period [0,T]. An estimation procedure is proposed in a non parametrical setting for the function q on an interval I where X is sufficiently observed using a local polynomial estimator. A method to select the bandwidth in a non asymptotic framework is proposed, leading to an oracle inequality. If m is the degree of the chosen polynomial, the accuracy of our estimator over the H\"older class of order β is n-β2β+1 if m ≥ β and it is optimal in the minimax sense if m ≥ β . A parametrical test is also proposed to test if q belongs to some parametrical family. Those results are applied to French temperature and electricity spot prices data where we infer the intensity of electricity spot spikes as a function of the temperature.