Simultaneous approximations for functions in Sobolev spaces of derivatives of polyharmonic cardinal splines (Q1960899)

This paper proves that functions in Sobolev spaces and their derivatives can be approximated by polyharmonic splines and their derivatives in \(L^p(\mathbb{R}^n)\) norms. Of particular interest are the remainder formulas of such approximations and the order of convergence by the derivatives of cardinal polyharmonic interpolational splines.