Sensitivity analysis of one parameter semigroups exemplified by the Wright--Fisher diffusion

Abstract

We consider the sensitivity, with respect to a parameter θ, of parametric families of operators Aθ, vectors πθ corresponding to the adjoints Aθ* of Aθ via Aθ*πθ=0 and one parameter semigroups t etAθ. We display formulas relating weak differentiability of θ πθ (at θ=0) to weak differentiability of θ Aθ*π0 and [eAθt]*π0. We give two applications: The first one concerns the sensitivity of the Ornstein--Uhlenbeck process with respect to its location parameter. The second one provides new insights regarding the Wright--Fisher diffusion for small mutation parameter.