We consider how a well-known sufficient condition for global optimality, expressed in terms of a continuously differentiable function ? satisfying a certain partial differential inequality, may be modified to broaden its applicability. We present a new condition in which ? is permitted to be Lipschitz continuous. The new condition always applies under a certain 'calmness' hypothesis, a local version of which has previously arisen in the literature as the weakest available hypothesis assuring non-triviality of the Pontryagin Maximum Principle multipliers.