Abstract

In this paper we consider an inventory system with increasing concave ordering cost and average cost optimization criterion. The demand process is modeled as a Brownian motion. Porteus (1971) studied a discrete-time version of this problem and under the strong condition that the demand distribution belongs to the class of densities that are finite convolutions of uniform and/or exponential densities (note that normal density does not belong to this class), an optimal control policy is a generalized ( s , S ) policy consisting of a sequence of ( s i , S i ). Using a lower bound approach, we show that an optimal control policy for the Brownian inventory model is determined by a single pair ( s , S ).