Restricted inverse optimal value problem on linear programming under weighted l1 norm

Abstract

We study the restricted inverse optimal value problem on linear programming under weighted l1 norm (RIOVLP 1). Given a linear programming problem LPc: \cx|Ax=b,x≥ 0\ with a feasible solution x0 and a value K, we aim to adjust the vector c to c such that x0 becomes an optimal solution of the problem LP c whose objective value cx0 equals K. The objective is to minimize the distance \| c - c\|1=Σj=1ndj| cj-cj| under weighted l1 norm.Firstly, we formulate the problem (RIOVLP1) as a linear programming problem by dual theories. Secondly, we construct a sub-problem (Dz), which has the same form as LPc, of the dual (RIOVLP1) problem corresponding to a given value z. Thirdly, when the coefficient matrix A is unimodular, we design a binary search algorithm to calculate the critical value z* corresponding to an optimal solution of the problem (RIOVLP1). Finally, we solve the (RIOV) problems on Hitchcock and shortest path problem, respectively, in O(TMCF\dmax,x0max,n\) time, where we solve a sub-problem (Dz) by minimum cost flow in TMCF time in each iteration. The values dmax,x0max are the maximum values of d and x0, respectively.