Spline approximation of a random process with singularity

Abstract

Let a continuous random process X defined on [0,1] be (m+β)-smooth, 0 m, 0<β 1, in quadratic mean for all t>0 and have an isolated singularity point at t=0. In addition, let X be locally like a m-fold integrated β-fractional Brownian motion for all non-singular points. We consider approximation of X by piecewise Hermite interpolation splines with n free knots (i.e., a sampling design, a mesh). The approximation performance is measured by mean errors (e.g., integrated or maximal quadratic mean errors). We construct a sequence of sampling designs with asymptotic approximation rate n-(m+β) for the whole interval.