Bartholomew P.K. Leung
Hong Kong Polytechnic University
19 Papers
160 Citations
Bartholomew P.K. Leung is an academic researcher from Hong Kong Polytechnic University. The author has contributed to research in topics: Process capability index & Process capability. The author has an hindex of 10, co-authored 19 publications.
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Papers
Enhancing product development through a dynamic information interchange approach
TL;DR: In this article, a Responsive Product Development System (RPDS) is used to model the product development process and the components of the process with object technology, introducing a dynamic product information schema characterized by its ability to provide design practitioners with a product data exchange standard.
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A Performance Tradeoff Function for Evaluating Suggested Parameters in the Reactive Ion Etching Process
Henry C. W. Lau,C.X.H. Tang,Bartholomew P.K. Leung,Carman K. M. Lee,G.T.S. Ho +4 more
- 01 Jul 2009
TL;DR: A novel performance tradeoff function is presented for evaluating the overall suitability of adopting the predicted control parameters suggested by domain experts, taking into full consideration their impact on the performance of the machine involved.
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Assessing Process Capability: A Case Study
TL;DR: The case will use the case to illustrate a strategy followed by practitioners using PCIs as a quality management tool, to draw attention to gaps that exist in the practical use of PCIs, and to highlight research areas in the Practical Use of PCI.
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Testing the significance of index parameters in varying-coefficient single-index models
TL;DR: The generalized F-type test method is proposed to deal with the testing problems of the index parameters of the VCSIM and it is shown that under the null hypothesis the proposed test statistic follows asymptotically a ?
4
Bilateral obstacle optimal control for a quasilinear elliptic variational inequality with a source term
TL;DR: In this article, the authors considered an obstacle control problem where the state satisfies a quasilinear elliptic variational inequality with a source term and the control functions are the upper and the lower obstacles.
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