Comments on Entire Functions of the Derivative Operator

Abstract

Many attempts to introduce fundamental nonlocality into quantum (or classical) field theory are based on the assumption that exponentials of the d'Alembertian are positive-definite, so that these operators can be employed without engendering the Ostrogradskian instability associated with higher derivative Lagrangians. This assumption is false. Working in the simple context of a 1-dimensional, point particle q(t), I demonstrate that the equation [T2 d2dt2] q(t) = 0 has an infinite number of rapidly oscillating, exponentially rising and falling solutions. This infinite kernel is in one-to-one correspondence with the ability to specify ``initial value data'' arbitrarily over any finite interval t1 < t < t2.