TY - JOUR
T1 - Canonical primal-dual algorithm for solving fourth-order polynomial minimization problems
AU - Zhou, Xiaojun
AU - Gao, David Yang
AU - Yang, Chunhua
PY - 2014/1/15
Y1 - 2014/1/15
N2 - This paper focuses on implementation of a general canonical primal-dual algorithm for solving a class of fourth-order polynomial minimization problems. A critical issue in the canonical duality theory has been addressed, i.e., in the case that the canonical dual problem has no interior critical point in its feasible space Sa+, a quadratic perturbation method is introduced to recover the global solution through a primal-dual iterative approach, and a gradient-based method is further used to refine the solution. A series of test problems, including the benchmark polynomials and several instances of the sensor network localization problems, have been used to testify the effectiveness of the proposed algorithm.
AB - This paper focuses on implementation of a general canonical primal-dual algorithm for solving a class of fourth-order polynomial minimization problems. A critical issue in the canonical duality theory has been addressed, i.e., in the case that the canonical dual problem has no interior critical point in its feasible space Sa+, a quadratic perturbation method is introduced to recover the global solution through a primal-dual iterative approach, and a gradient-based method is further used to refine the solution. A series of test problems, including the benchmark polynomials and several instances of the sensor network localization problems, have been used to testify the effectiveness of the proposed algorithm.
KW - Canonical dual algorithm
KW - Global optimization
KW - Polynomial optimization
UR - http://www.scopus.com/inward/record.url?scp=84889677127&partnerID=8YFLogxK
U2 - 10.1016/j.amc.2013.11.013
DO - 10.1016/j.amc.2013.11.013
M3 - Article
SN - 0096-3003
VL - 227
SP - 246
EP - 255
JO - Applied Mathematics and Computation
JF - Applied Mathematics and Computation
ER -