[en] Finding the least squares (LS) solution s to a system of linear equations Hs = y where H, y are given and s is a vector of binary variables, is a well known NP-hard problem. In this paper, we consider binary LS problems under the assumption that the coefficient matrix H is also unknown, and lies in a given uncertainty ellipsoid. We show that the corresponding worst-case robust optimization problem, although NP-hard, is still amenable to semidefinite relaxation (SDR)-based approximations. However, the relaxation step is not obvious, and requires a certain problem reformulation to be efficient. The proposed relaxation is motivated using Lagrangian duality and simulations suggest that it performs well, offering a robust alternative over the traditional SDR approaches for binary LS problems.
Disciplines :
Sciences informatiques Sciences informatiques
Identifiants :
UNILU:UL-CONFERENCE-2011-426
Auteur, co-auteur :
Tsakonas, Efthymios
Jaldén, Joakim
OTTERSTEN, Björn ; University of Luxembourg > Interdisciplinary Centre for Security, Reliability and Trust (SNT)
Langue du document :
Anglais
Titre :
Robust binary least squares: Relaxations and algorithms
Date de publication/diffusion :
2011
Nom de la manifestation :
Proceedings IEEE International Conference on Acoustics,Speech and Signal Processing (ICASSP)
Lieu de la manifestation :
Prague, République Tchèque
Date de la manifestation :
22-27 May 2011
Manifestation à portée :
International
Titre de l'ouvrage principal :
Acoustics, Speech and Signal Processing (ICASSP), 2011 IEEE International Conference on
