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《Mathematics in Practice and Theory》 2008-11
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Maximal Inverse Subsemigroup for the Ideal K(n,r) of OI_n

GAO Rong-hai1,2,XU Bo1(1.School of Mathematics and Computer Science,Guizhou Normal University,Guiyang 550001,China)(2.Journal Editorial Department,Guizhou Normal University,Guiyang 550001 China)  
Let Xn be finite set of containing n elements,and OIn be semigroup of all order-preserving strictly partial one-to-one transformation on the Xn.Writing K(n,r)={α∈OIn∶|Tmα|≤r} (0≤r≤n-1),then K(n,r)(0≤r≤n-1) is the ideal of OIn.
【Fund】: 贵州省科技基金资助项目(2007(2008));; 贵州师范大学青年教师科研发展基金(校青科2007-1-20)
【CateGory Index】: O152.7
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【Co-citations】
Chinese Journal Full-text Database 6 Hits
1 DENG Lun-zhi,LI Xiang(Department of Mathematics and Computer Science,Guizhou Normal University,Guiyang,Guizhou,550001 China);Mapping with keeping order from countable infinite set to finite set[J];Journal of Guizhou Education Institute;2008-03
2 XU Bo(School of Mathematics and Computer Science,Guizhou Normal University,Guiyang,Guizhou 550001,China);On maximal inverse subsemigroups of certain semigroups of order-preserving partial one-one transformation[J];Journal of Guizhou Normal University(Natural Sciences);2007-01
3 DENG Lun-zhi,LI Xiang,OUYANG Jian-xin,ZHANG Huan-ling(School of Mathematics and Computer Science,Guizhou Normal University,Guiyang,Guizhou 550001,China);Transformation with keeping measurement order on plane[J];Journal of Guizhou Normal University(Natural Sciences);2008-01
4 LI Xiang,DENG Lun-zhi,ZHANG Huan-ling,OUYANG Jian-xin(School of Mathematics and Computer Science,Guizhou Normal University,Guiyang,Guizhou 550001,China);Maximal subsemigroups of some special subsets of D-classes D_r of finite full transformation semigroup T_n[J];Journal of Guizhou Normal University(Natural Sciences);2008-01
5 LONG Wei-feng,LONG Wei-fang,GAO Rong-hai(School of Mathematics and Computer Science,Guizhou Normal University,Guiyang,Guizhou 55001,China);Regularity and Green's relations for a class of semigroups of partial transformations preserving an equivalence[J];Journal of Guizhou Normal University(Natural Sciences);2008-04
6 DENG Lun-zhi(School of Mathematics and Computer Science,Guizhou Normal Univerity,Guiyang,Guizhou 550001,China);The Green's relation of transformation semigroup that preserves an equivalence on plane[J];Journal of Guizhou Normal University(Natural Sciences);2008-04
【Co-references】
Chinese Journal Full-text Database 7 Hits
1 GAO Rong-hai YOU Tai-jie (School of Mathematics and Computer Science,Guizhou Normal University,Guiyang 550001,China);Green's Relations of Finite Singular Transformation Semigroup with Stable Subset[J];Guizhou Science;2009-02
2 YOU Taijie (Department of Mathematics and Computer Science, Guizhou Normal University, Guiyang 550001, China);The structure of some locally maximal idempotent-generated subsemigroups of Sing n[J];Journal of Guizhou Normal University(Natural Science);2000-04
3 YOU Tai jie (Department of Mathematics and Computer Science,Guizhou Normal University,Giuyang,Guizhou 550001,China);On the idempotent-generated properties in singular semigroups[J];Journal of Guizhou Normal University(Natural Science);2002-02
4 GAO Rong-hai1,2,XU Bo1,LONG Wei-feng1,LONG Wei-fang1(1.School of Mathematical and Computer Science,Guizhou Normal University,Guiyang,Guizhou 550001,China;2.Editorial Board of Journal,Guizhou Normal University,Guiyang,Guizhou 550001,China);Idempotent generators in finite partial transformation semigroup[J];Journal of Guizhou Normal University(Natural Sciences);2007-04
5 You Taijie(Dept. of Math., Guizhou Normal Univ., Guiyang, Guizhou, 550001, P. R. China);Idempotent Generators in Subsemigroups K(n,r)[J];Advances In Mathematics;2002-03
6 GAO Rong-hai1,2,XU Bo11.School of Mathematics and Computer Science,Guizhou Normal University,Guiyang 550001,China;2.Editorial Department of Journal,Guizhou Normal University,Guiyang 550001,China;Idempotent Rank in Decreasing-Order Finite Partial Transformation Semigroups[J];Journal of Southwest University(Natural Science Edition);2008-08
7 PEI Hui-sheng~1,ZOU Ding-yu~2,LI Lian-bing~1(1.College of Mathematics and Information Science,Xinyang Normal University,Xinyang 464000,China;2.Jiangsu Polytechnic University,Changzhou 213000,China);On the Semigroup of Order-decreasing and Order-preserving Finite Full Transformations[J];Journal of Xinyang Normal University(Natural Science Edition);2006-04
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