Nullity-based matroid of rough sets and its application to attribute reduction

Rough sets were proposed to deal with vagueness and incompleteness of knowledge in information systems. In this field, there are many optimization issues such as attribute reduction. Matroids generalized from matrices have been widely used in many fields, particularly greedy algorithm design, which plays an important role in attribute reduction. Therefore, it is meaningful to combine matroids with rough sets to solve the optimization problems. In this paper, we construct a type of matroid of rough sets based on the concept of nullity and apply it to attribute reduction. First, we propose a nullity operator for rough sets to induce a matroid and then we present a specific type of matroid called a nullity-based matroid. Second, given the relationship between nullities and matrices, we present two types of matrices to characterize this type of matroid and its nullity operator. Third, the dual of this type of matroid is induced by the second type of matrix. Finally, we apply the obtained matroids to attribute reduction issues in information systems. In summary, this paper provides a new approach to studying rough sets.

[1]  Wen-Xiu Zhang,et al.  Knowledge reduction based on the equivalence relations defined on attribute set and its power set , 2007, Inf. Sci..

[2]  Degang Chen,et al.  Fuzzy rough set based attribute reduction for information systems with fuzzy decisions , 2011, Knowl. Based Syst..

[3]  Tian Yang,et al.  A Granular Reduction Algorithm Based on Covering Rough Sets , 2012, J. Appl. Math..

[4]  Yiyu Yao,et al.  Attribute reduction in decision-theoretic rough set models , 2008, Inf. Sci..

[5]  Huan Lian,et al.  The nullities for M-fuzzifying matroids , 2012, Appl. Math. Lett..

[6]  Qingxin Zhu,et al.  Quantitative analysis for covering-based rough sets through the upper approximation number , 2013, Inf. Sci..

[7]  William Zhu,et al.  Topological approaches to covering rough sets , 2007, Inf. Sci..

[8]  Christel Baier,et al.  Synthesis of Reo Connectors for Strategies and Controllers , 2014, Fundam. Informaticae.

[9]  Liang Liu,et al.  Attribute selection based on a new conditional entropy for incomplete decision systems , 2013, Knowl. Based Syst..

[10]  James G. Oxley,et al.  Matroid theory , 1992 .

[11]  Qingxin Zhu,et al.  Matroidal structure of rough sets and its characterization to attribute reduction , 2012, Knowl. Based Syst..

[12]  Zheng Pei,et al.  Generalized rough sets based on reflexive and transitive relations , 2008, Inf. Sci..

[13]  William Zhu,et al.  Geometric Lattice Structure of Covering-Based Rough Sets through Matroids , 2012, J. Appl. Math..

[14]  Shiping Wang,et al.  Rough Set Characterization for 2-circuit Matroid , 2014, Fundam. Informaticae.

[15]  Kun She,et al.  Matroidal Structure of Rough Sets from the Viewpoint of Graph Theory , 2012, J. Appl. Math..

[16]  Lorenzo Traldi,et al.  Binary nullity, Euler circuits and interlace polynomials , 2009, Eur. J. Comb..

[17]  Guilong Liu,et al.  Axiomatic systems for rough sets and fuzzy rough sets , 2008, Int. J. Approx. Reason..

[18]  Sanyang Liu,et al.  Matroidal approaches to rough sets via closure operators , 2012, Int. J. Approx. Reason..

[19]  Z. Pawlak Rough sets and fuzzy sets , 1985 .

[20]  Liang Liu,et al.  Decision rule mining using classification consistency rate , 2013, Knowl. Based Syst..

[21]  William Zhu,et al.  Rough matroids based on relations , 2013, Inf. Sci..

[22]  William Zhu,et al.  Attribute reduction of data with error ranges and test costs , 2012, Inf. Sci..

[23]  Qinghua Hu,et al.  Rule learning for classification based on neighborhood covering reduction , 2011, Inf. Sci..

[24]  Jianhua Dai,et al.  Attribute selection based on information gain ratio in fuzzy rough set theory with application to tumor classification , 2013, Appl. Soft Comput..

[25]  Davide Ciucci,et al.  Temporal Dynamics in Information Tables , 2012, Fundam. Informaticae.

[26]  Jack Edmonds,et al.  Matroids and the greedy algorithm , 1971, Math. Program..

[27]  Fei-Yue Wang,et al.  Reduction and axiomization of covering generalized rough sets , 2003, Inf. Sci..

[28]  William Zhu,et al.  Generalized rough sets based on relations , 2007, Inf. Sci..

[29]  William Zhu,et al.  Relationship between generalized rough sets based on binary relation and covering , 2009, Inf. Sci..

[30]  Qingxin Zhu,et al.  Four matroidal structures of covering and their relationships with rough sets , 2013, Int. J. Approx. Reason..

[31]  Xizhao Wang,et al.  Learning fuzzy rules from fuzzy samples based on rough set technique , 2007, Inf. Sci..

[32]  Fei-Yue Wang,et al.  Axiomatic Systems of Generalized Rough Sets , 2006, RSKT.

[33]  Daniel Vanderpooten,et al.  A Generalized Definition of Rough Approximations Based on Similarity , 2000, IEEE Trans. Knowl. Data Eng..

[34]  William Zhu,et al.  The algebraic structures of generalized rough set theory , 2008, Inf. Sci..