Jianlin Jiang scite author profile

The classical multifacility Weber problem (MFWP) is one of the most important models in facility location. This paper considers more general and practical case of MFWP called constrained multifacility Weber problem (CMFWP), in which the gauge is used to measure distances and locational constraints are imposed to facilities. In particular, we develop a variational inequality approach for solving it. The CMFWP is reformulated into a linear variational inequality, whose special structures lead to new projection-type methods. Global convergence of the projection-type methods is proved under mild assumptions. Some preliminary numerical results are reported which verify the effectiveness of proposed methods.

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Nonmonotone gradient methods for vector optimization with a portfolio optimization application

Jiang

et al. 2017

European Journal of Operational Research

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Minisum location problem with farthest Euclidean distances

Jiang

2006

Math Meth Oper Res

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Jianlin Jiang

Port connectivity study: An analysis framework from a global container liner shipping network perspective

A variational inequality approach for constrained multifacility Weber problem under gauge

Nonmonotone gradient methods for vector optimization with a portfolio optimization application

Minisum location problem with farthest Euclidean distances

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