[1] PEDRYCZ W. Granular computing: analysis and design of intelligent systems [M]. Boca Raton: CRC Press, 2013: 24-50. [2] YAN L. Fundamentals of mathematical logic and granular computing [M]. Beijing: Science Press, 2007: 155-165. (闫林. 数理逻辑基础与粒计算[M]. 北京:科学出版社, 2007: 155-165). [3] SKOWRON A, STEPANIUK J, SWINIARSKI R. Modeling rough granular computing based on approximation spaces [J]. Information Sciences, 2012, 184(1): 20-43. [4] MCALLISTER R A, ANGRYK R A. Abstracting for dimensionality reduction in text classification [J]. International Journal of Intelligent Systems, 2013, 28(2): 115-138. [5] FAN T. Rough set analysis of relational structures [J]. Information Sciences, 2013, 221: 230-244. [6] YAN L, YAN S. Granular reasoning and decision system's decomposition [J]. Journal of Software, 2012, 7(3): 683-690. [7] HONKO P. Association discovery from relational data via granular computing [J]. Information Sciences, 2013, 234: 136-149. [8] YAN L, SONG J. Granular trees based on different data sets and their modeling applications[J]. Computer Science, 2014, 41(3): 258-262. (闫林, 宋金鹏. 数据集的粒化树及其建模应用[J]. 计算机科学, 2014, 41(3): 258-262). [9] PAWLAK Z. Rough set ─ theoretical aspects of reasoning about data [M]. Norwell: Kluwer Academic Publishers, 1992: 157-201. [10] WANG S, ZHU Q, ZHU W, et al. Quantitative analysis for covering-based rough sets through the upper approximation number [J]. Information Sciences, 2013, 220: 483-491. [11] SHE Y. On the rough consistency measures of logic theories and approximate reasoning in rough logic [J]. International Journal of Approximate Reasoning, 2014, 55(1): 486-499. [12] YAN L, YAN S. Researches on rough truth of rough axioms based on granular reasoning [J]. Journal of Software, 2014, 9(2): 265-273. [13] KOLMAN B, BUSBY R C, ROSS S C. Discrete mathematical structures [M]. 4th ed. Upper Saddle River: Prentlce-Hall, 2001: 89-125. [14] GACEK A. Granular modeling of signals: a framework of granular computing [J]. Information Sciences, 2013, 221: 1-11. [15] YU Z, BAI X, YUN Z. A study of rough sets based on 1-neighborhood systems [J]. Information Sciences, 2013, 248: 103-113. [16] RIESEN K, BUNKE H. Graph classification and clustering based on vector space embedding [M]. River Edge: World Scientific Publishing, 2010: 138-146. |