The change-making problem for six coin values and beyond

Abstract

The change-making problem asks: given a positive integer v and a collection C of integer coin values c1=1<c2< c3< ·s< cn, what is the minimum number of coins needed to represent v with coin values from C? For some coin systems C, the greedy algorithm finds a representation with a minimum number of coins for all v. We call such coin systems orderly. However, there are coin systems where the greedy algorithm fails to always produce a minimal representation. Over the past fifty years, progress has been made on the change-making problem, including finding a characterization of all orderly coin systems with 3, 4, and 5 coin values. We characterize orderly coin systems with 6 coin values, and we make generalizations to orderly coin systems with n coin values.