JOURNAL OF LIGHT INDUSTRY

CN 41-1437/TS  ISSN 2096-1553

Volume 32 Issue 4
July 2017
Article Contents
    WAN Mei-ling, ZHANG Shu-yi and ZHENG Xiao-di. Nonunique fixed point theorems in 2-metric spaces[J]. Journal of Light Industry, 2017, 32(4): 105-108. doi: 10.3969/j.issn.2096-1553.2017.4.016
    Citation: WAN Mei-ling, ZHANG Shu-yi and ZHENG Xiao-di. Nonunique fixed point theorems in 2-metric spaces[J]. Journal of Light Industry, 2017, 32(4): 105-108. doi: 10.3969/j.issn.2096-1553.2017.4.016 shu

    Nonunique fixed point theorems in 2-metric spaces

    • College of Mathematics and Physics, Bohai University, Jinzhou 121013, China;

    • Jinzhou Teacher's Training College, Jinzhou 121001, China

    • Corresponding author: ZHANG Shu-yi, 
    • Received Date: 2016-03-10
      Available Online: 2017-07-15
    • The existence of nonunique fixed points for a class of mappings in orbitally complete 2-metric spaces was studied,a new nonunique fixed point theorem was proved.And the results obtained in the metric space in the relevant literature were extended to the 2-metric spaces.
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      1. [1]

        GÄHLER S.2-metrische Räume und ihre topologische Struktur[J].Math Nachr,1963,26(1-4):115.

      2. [2]

        ISEKI K.Fixed point theorems in 2-metric spaces[J].Math Sem Notes Kobe Univ,1975(3):133.

      3. [3]

        张石生.不动点理论及其应用[M].重庆:重庆人民出版社,1984.

      4. [4]

        张军贺,谷峰.2-距离空间中两对非相容映象的一个新的公共不动点定理[J].西南师范大学学报(自然科学版),2012,37(4):42.

      5. [5]

        郑晓迪,张树义.2-距离空间中两类Φ-压缩映象的公共不动点定理[J].杭州师范大学学报(自然科学版),2009, 8(6):429.

      6. [6]

        PACHPATTE B G.On ciric type maps with a nonunique fixed point[J].Indian J Pure Appl Math,1979,10(8):1039.

      7. [7]

        刘泽庆.关于非唯一不动点的一些结果[J].辽宁师范大学学报(自然科学版),1986(4):1.

      8. [8]

        ZHANG S Y,WANG L,SHIN S H,et al.Common fixed point theorems for a pair of orbitally contraction mapping[J].Fixed Point Theory and Applictions,2003(5):191.

      9. [9]

        郑晓迪,万美玲,张树义,等.轨道压缩映射的几个新的不动点定理[J].北华大学学报(自然科学版),2014,15(4):438.

      10. [10]

        张树义,赵美娜,李丹.关于平方型Altman映象的公共不动点定理[J].江南大学学报(自然科学版),2015,14 (4):472.

      11. [11]

        张树义,宋晓光,栾丹.Φ-压缩映象的公共不动点定理[J].北华大学学报(自然科学版),2014,15(2):167.

      12. [12]

        郑晓迪,邵颖,张树义.2-距离空间中一个新的公共不动点定理[J].杭州师范大学学报(自然科学版),2008,7(2):101.

      13. [13]

        张树义,林媛.Φ-φ-型压缩映象不动点的存在性[J].北华大学学报(自然科学版),2016,17(1):1.

      14. [14]

        张树义,宋晓光,万美玲,等.非Lipschitz渐近伪压缩映象不动点的迭代逼近[J].北华大学学报(自然科学版),2014,15(5):581.

      15. [15]

        张树义,万美玲,李丹.渐近伪压缩型映象迭代序列的强收敛定理[J].江南大学学报(自然科学版),2014,13(6):726.

      16. [16]

        张树义,赵美娜,李丹.渐近半压缩映象具混合型误差的迭代收敛性[J].北华大学学报(自然科学版),2015,16(3):281.

      17. [17]

        张树义.赋范线性空间中渐近拟伪压缩型映象不动点的修改的广义Ishikawa迭代逼近[J].应用数学学报,2011,34(5):886.

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