Name
Title | ||
|---|---|---|
Semidefinite Relaxations of Robust Binary Least Squares Under Ellipsoidal Uncertainty Sets |
Abstract | ||
|---|---|---|
The problem of finding the least squares solution ${\bf s}$ to a system of equations ${\bf Hs} = {\bf y}$ is considered, when ${\bf s}$ is a vector of binary variables and the coefficient matrix ${\bf H}$ is unknown but of bounded uncertainty. Similar to previous approaches to robust binary least squares, we explore the potential of a min-max design with the aim to provide solutions that are less sensitive to the uncertainty in ${\bf H}$. We concentrate on the important case of ellipsoidal uncertainty, i.e., the matrix ${\bf H}$ is assumed to be a deterministic unknown quantity which lies in a given uncertainty ellipsoid. The resulting problem is NP-hard, yet amenable to convex approximation techniques: Starting from a convenient reformulation of the original problem, we propose an approximation algorithm based on semidefinite relaxation that explicitly accounts for the ellipsoidal uncertainty in the coefficient matrix. Next, we show that it is possible to construct a tighter relaxation by suitably changing the description of the feasible region of the problem, and formulate an approximation algorithm that performs better in practice. Interestingly, both relaxations are derived as Lagrange bidual problems corresponding to the two equivalent problem reformulations. The strength of the proposed tightened relaxation is demonstrated by pertinent simulations. |
Year | DOI | Venue |
|---|---|---|
2011 | 10.1109/TSP.2011.2162507 | IEEE Transactions on Signal Processing |
Keywords | Field | DocType |
computational complexity,least squares approximations,matrix algebra,minimax techniques,set theory,Lagrange bidual problems,NP-hard problem,bounded uncertainty,coefficient matrix,convex approximation,ellipsoidal uncertainty sets,min-max design,robust binary least squares,semidefinite relaxations,Binary least squares,duality,robust optimization,semidefinite relaxation | Least squares,Approximation algorithm,Mathematical optimization,Ellipsoid,Coefficient matrix,Robust optimization,Matrix (mathematics),Feasible region,Mathematics,Computational complexity theory | Journal |
Volume | Issue | ISSN |
59 | 11 | 1053-587X |
Citations | PageRank | References |
3 | 0.41 | 19 |
Authors | ||
3 | ||
Name | Order | Citations | PageRank |
|---|---|---|---|
| Efthimios E. Tsakonas | 1 | 10 | 0.98 |
| Joakim Jalden | 2 | 243 | 21.59 |
| Björn E. Ottersten | 3 | 6418 | 575.28 |