\(\sin (\omega x)\) Can Approximate Almost Every Finite Set of Samples

Abstract

Consider a set of points \((x_1,y_1),\ldots ,(x_n,y_n)\) with distinct \(0 \le x_i \le 1\) and with \(-1 < y_i < 1\). The question of whether the function \(y = \sin (\omega x)\) can approximate these points arbitrarily closely for a suitable choice of \(\omega \) is considered. It is shown that such approximation is possible if and only if the set \(\{x_1,\ldots ,x_n\}\) is linearly independent over the rationals. Furthermore, a constructive sufficient condition for such approximation is provided. The results provide a sort of counterpoint to the classical sampling theorem for bandlimited signals. They also provide a stronger statement than the well-known result that the collection of functions \(\{\sin (\omega x) : \omega < \infty \}\) has infinite pseudo-dimension.