Optimal Composition Ordering Problems for Piecewise Linear Functions

Abstract

In this paper, we introduce maximum composition ordering problems. The input is n real functions f1,…,fn:R and a constant c∈R. We consider two settings: total and partial compositions. The maximum total composition ordering problem is to compute a permutation σ:[n][n] which maximizes fσ(n) fσ(n-1)… fσ(1)(c), where [n]=\1,…,n\. The maximum partial composition ordering problem is to compute a permutation σ:[n][n] and a nonnegative integer k~(0 k n) which maximize fσ(k) fσ(k-1)… fσ(1)(c). We propose O(n n) time algorithms for the maximum total and partial composition ordering problems for monotone linear functions fi, which generalize linear deterioration and shortening models for the time-dependent scheduling problem. We also show that the maximum partial composition ordering problem can be solved in polynomial time if fi is of form \aix+bi,ci\ for some constants ai\,( 0), bi and ci. We finally prove that there exists no constant-factor approximation algorithm for the problems, even if fi's are monotone, piecewise linear functions with at most two pieces, unless P=NP.