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Boolean Matrix Approach for Multi-scale Covering Decision Information System |
CHEN Yingsheng1, LI Jinjin1,2, LIN Rongde1, CHEN Dongxiao1 |
1. Fujian Province University Key Laboratory of Computational Science, School of Mathematical Sciences, Huaqiao University, Quanzhou 362021 2. School of Mathematics and Statistics, Minnan Normal University, Zhangzhou 363000 |
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Abstract In multi-scale decision information system, one condition attribute corresponding to a certain scale forms a partition of the universe. A multi-scale covering decision information system (MSCDS) is proposed and the partition is generalized to a covering. A boolean matrix method is applied to simplify the complexity of information expression in this system. Firstly, boolean matrix is employed to describe the covering decision information system, including upper and lower approximations, consistency and generalized decision function. Secondly, the definitions of MSCDS, consistency and generalized decision invariant of the system are expressed in boolean matrix method. Finally, the boolean matrix method is utilized to define the significance of a combination scale with both consistency and inconsistency, and the relevant algorithms and examples of optimal granularity selection of MSCDS are presented.
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Received: 29 March 2020
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Fund:National Natural Science Foundation of China (No.11871259,11701258), Program for Innovative Research Team in Science and Technology in Fujian Province University and Quanzhou High-Level Talents Support Plan(No.2017ZT012) |
Corresponding Authors:
LI Jinjin, Ph.D.,professor. His research interests include topo-logy, rough set and concept lattice.
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About author:: CHEN Yingsheng, master, lecturer. His research interests include rough set and concept lattice.Lin Rongde, Ph.D., associate professor. His research interests include artificial intelligence and computer systems.CHEN Dongxiao, master, lecturer. His research interests include rough set and concept lattice. |
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