Optimality conditions and optimization methods for quartic polynomial optimization
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摘要
In this paper multivariate quartic polynomial optimization program (QPOP) is considered. Quartic optimization problems arise in various practical applications and are proved to be NP hard. We discuss necessary global optimality conditions for quartic problem (QPOP). And then we present a new (strongly or ε-strongly) local optimization method according to necessary global optimality conditions, which may escape and improve some KKT points. Finally we design a global optimization method for problem (QPOP) by combining the new (strongly or ε-strongly) local optimization method and an auxiliary function. Numerical examples show that our algorithms are efficient and stable.
论文关键词:Quartic polynomial optimization problem,Necessary global optimality condition,Linear transformation,Local optimization method,Global optimization method
论文评审过程:Available online 17 February 2014.
论文官网地址:https://doi.org/10.1016/j.amc.2014.01.074