It is often necessary to choose a Pareto optimal point from a set of many.
This paper introduces the concept of order of efficiency, which provides a
notion that is stronger than Pareto optimality and allows us to set up a pr
eference ordering amongst various alternatives that are Pareto optimal. Thi
s approach does not resort to setting up a ranking on the basis of an arbit
rary "criterion of merit" obtained by combining the multiple decision crite
ria into one scalar index. Examples are cited and it is argued that using t
he procedure described in this paper, it is possible to rule out Pareto alt
ernatives with "extreme components" and retain alternatives "in the middle"
of the Pareto set without the help of plots or other visualization aids. T
his makes the approach applicable for cases where the number of criteria is
very high and visualization is intractable.