A copy of this work was available on the public web and has been preserved in the Wayback Machine. The capture dates from 2019; you can also visit the original URL.
The file type is application/pdf
.
A Primal-Dual Interior Point Algorithm for Linear Programming
[chapter]
1989
Progress in Mathematical Programming
This chapter presents an algorithm that works simultaneously on primal and dual linear programming problems and generates a sequence of pairs of their interior feasible solutions. Along the sequence generated, the duality gap converges to zero at least linearly with a global convergence ratio (1 -Yf/n); each iteration reduces the duality gap by at least Yf/n. Here n denotes the size of the problems and Yf a positive number depending on initial interior feasible solutions of the problems. The
doi:10.1007/978-1-4613-9617-8_2
fatcat:kwlvlij3zrgu7bjel2h6flhq4u