Optimal C1,1 and Quasi-Optimal C2 Monotone Interpolation with Curvature Control

Abstract

We study monotone Hermite interpolation on an interval, where both function values and first derivatives are prescribed at the nodes. Among all C1,1 interpolants, we seek one with optimal curvature, measured by \|F''\|L∞. In this paper, we analyze the limitations of some classical techniques, and provide an explicit optimal construction in C1,1 given by quadratic splines by studying the optimal velocity profile. Moreover, given E = \x1,·s,xN\ and f: E R (without derivatives), we also provide a formula to compute the corresponding trace seminorm \[ ∈f\ \|F''\|L∞ : F(x)=f(x) on E and F' 0 everywhere \. \] In addition, we also describe how to mollify C1,1 solutions to C2 while preserving monotonicity and sacrificing a controlled amount of optimality.