TY - GEN
T1 - On robust solutions to uncertain monotone linear complementarity problems (LCPs) and their variants
AU - Xie, Yue
AU - Shanbhag, Uday V.
N1 - Publisher Copyright:
© 2014 IEEE.
PY - 2014
Y1 - 2014
N2 - Variational inequality and complementarity problems have found utility in modeling a range of optimization and equilibrium problems arising in engineering, economics, and the sciences. Yet, while there have been tremendous growth in addressing uncertainty in optimization, far less progress has been seen in the context of variational inequality problems, exceptions being the efforts to solve variational inequality problems with expectation-valued maps [1], [2]. Yet, in many instances, the goal lies in obtaining solutions that are robust to uncertainty. While the fields of robust optimization and control theory have made deep inroads into developing tractable schemes for resolving such concerns, there has been little progress in the context of variational problems. In what we believe is amongst the very first efforts to comprehensively address such problems in a distribution-free environment, we present an avenue for obtaining robust solutions to uncertain monotone affine complementarity problems defined over the nonnegative orthant. We begin with and mainly focus on showing that robust solutions to such problems can be tractably obtained through the solution of a single convex program. Importantly, we discuss how these results can be extended to account for uncertainty in the associated sets by generalizing the results to uncertain affine variational inequality problems defined over uncertain polyhedral sets.
AB - Variational inequality and complementarity problems have found utility in modeling a range of optimization and equilibrium problems arising in engineering, economics, and the sciences. Yet, while there have been tremendous growth in addressing uncertainty in optimization, far less progress has been seen in the context of variational inequality problems, exceptions being the efforts to solve variational inequality problems with expectation-valued maps [1], [2]. Yet, in many instances, the goal lies in obtaining solutions that are robust to uncertainty. While the fields of robust optimization and control theory have made deep inroads into developing tractable schemes for resolving such concerns, there has been little progress in the context of variational problems. In what we believe is amongst the very first efforts to comprehensively address such problems in a distribution-free environment, we present an avenue for obtaining robust solutions to uncertain monotone affine complementarity problems defined over the nonnegative orthant. We begin with and mainly focus on showing that robust solutions to such problems can be tractably obtained through the solution of a single convex program. Importantly, we discuss how these results can be extended to account for uncertainty in the associated sets by generalizing the results to uncertain affine variational inequality problems defined over uncertain polyhedral sets.
UR - http://www.scopus.com/inward/record.url?scp=84988241332&partnerID=8YFLogxK
UR - http://www.scopus.com/inward/citedby.url?scp=84988241332&partnerID=8YFLogxK
U2 - 10.1109/CDC.2014.7039824
DO - 10.1109/CDC.2014.7039824
M3 - Conference contribution
AN - SCOPUS:84988241332
T3 - Proceedings of the IEEE Conference on Decision and Control
SP - 2834
EP - 2839
BT - 53rd IEEE Conference on Decision and Control,CDC 2014
PB - Institute of Electrical and Electronics Engineers Inc.
T2 - 2014 53rd IEEE Annual Conference on Decision and Control, CDC 2014
Y2 - 15 December 2014 through 17 December 2014
ER -