TY - EJOUR
DO - 10.1007/s00453-010-9431-z
AB - The main focus of this paper is a pair of new approximation algorithms for certain integer programs. First, for covering integer programs {min cx:Ax≥b,0≤x≤d} where A has at most k nonzeroes per row, we give a k-approximation algorithm. (We assume A,b,c,d are nonnegative.) For any k≥2 and ε>0, if P≠NP this ratio cannot be improved to k−1−ε, and under the unique games conjecture this ratio cannot be improved to k−ε. One key idea is to replace individual constraints by others that have better rounding properties but the same nonnegative integral solutions; another critical ingredient is knapsack-cover inequalities. Second, for packing integer programs {max cx:Ax≤b,0≤x≤d} where A has at most k nonzeroes per column, we give a (2k 2+2)-approximation algorithm. Our approach builds on the iterated LP relaxation framework. In addition, we obtain improved approximations for the second problem when k=2, and for both problems when every A ij is small compared to b i . Finally, we demonstrate a 17/16-inapproximability for covering integer programs with at most two nonzeroes per column.
T1 - Approximability of Sparse Integer Programs
IS - 1
DA - 2011
AU - Pritchard, David
AU - Chakrabarty, Deeparnab
JF - Algorithmica
SP - 75-93
VL - 61
EP - 75-93
PB - Springer-Verlag
N1 - Preliminary version appeared in Proc. European Symposium on Algorithms (ESA) 2009.
N1 - National Licences
ID - 150507
KW - Integer programming
KW - Approximation algorithms
KW - LP rounding
KW - Vertex Cover
KW - Approximation Algorithms
KW - 2 Variables
KW - Packing
SN - 0178-4617
UR - http://infoscience.epfl.ch/record/150507/files/453_2010_Article_9431.pdf
ER -