On Interpolation by Almost Trigonometric Splines

Abstract

The existence and uniqueness of an interpolating periodic spline defined on an equidistant mesh by the linear differential operator L2n+2(D)=D2(D2+12)(D2+22)⋯(D2+n2) with n∈N are reproved under the final restriction on the step of the mesh. Under the same restriction, sharp estimates of the error of approximation by such interpolating periodic splines are obtained.