Sharp adaptive nonparametric testing for constant volatility

Abstract

Based on discrete observations, we develop a test to infer if the volatility function σ(·) within the nonparametric Gaussian white noise model dYt = σ(t)dWt is constant. The testing procedure is shown to be minimax-optimal and adaptive for infill asymptotics and these results entail that a deviation from the null hypothesis of constancy is best measured in terms of the ratio of σ(t) and its L2-average. The derivation of optimal constants requires the construction of hypotheses with height h(b), where the parameter b solves Fn(b)=0 for given functions Fn. Proving this equation to be solvable for each n∈N and establishing quantitative bounds of the solutions is built upon the implicit function theorem.