A quasisecant method for solving a system of nonsmooth equations
Access Status
Fulltext not available
Authors
Long, Q.
Wu, Changzhi
Date
2013Type
Journal Article
Metadata
Show full item recordCitation
Long, Q. and Wu, C. 2013. A quasisecant method for solving a system of nonsmooth equations. Computers and Mathematics with Applications. 66 (4): pp. 419-431.
Source Title
Computers and Mathematics with Applications
ISSN
Collection
Abstract
In this paper, the solution of nonsmooth equations is studied. We first transform theproblem into an equivalent nonsmooth optimization problem and then the quasisecantmethod is introduced to solve it. Some nonsmooth equations that have arisen from bilevelprogramming problems are solved by our proposed method. The numerical results showthe effectiveness and efficiency of our proposed method.
Related items
Showing items related by title, author, creator and subject.
-
Long, Q.; Wu, Changzhi; Wang, Xiangyu (2015)In this paper, a subgradient method is developed to solve the system of (nonsmooth) equations. First, the system of (nonsmooth) equations is transformed into a nonsmooth optimization problem with zero minimal objective ...
-
Long, Q.; Wu, Changzhi (2017)© 2017 IEEE. In this paper, a subgradient method is developed to solve the system of (nonsmooth) equations. First, the system of (nonsmooth) equations is transformed into a nonsmooth optimization problem with zero minimal ...
-
Ling, C.; Yin, H.; Zhou, Guanglu (2011)This paper discusses the L 2 spectral estimation problem with lower and upper bounds. To the best of our knowledge, it is unknown if the existing methods for this problem have superlinear convergence property or not. In ...