Linear inverse problems for Markov processes and their regularisation

Abstract

We study the solutions of the inverse problem \[ g(z)=∫ f(y) PT(z,dy) \] for a given g, where (Pt(·,·))t ≥ 0 is the transition function of a given Markov process, X, and T is a fixed deterministic time, which is linked to the solutions of the ill-posed Cauchy problem \[ ut + A u=0, u(0,·)=g, \] where A is the generator of X. A necessary and sufficient condition ensuring square integrable solutions is given. Moreover, a family of regularisations for the above problems is suggested. We show in particular that these inverse problems have a solution when X is replaced by X + (1-)J, where is a Bernoulli random variable, whose probability of success can be chosen arbitrarily close to 1, and J is a suitably constructed jump process.