Research article

Further representations and computations of the generalized Moore-Penrose inverse

  • Received: 19 May 2023 Revised: 10 July 2023 Accepted: 13 July 2023 Published: 26 July 2023
  • MSC : 15A09

  • The aim of this paper is to provide new representations and computations of the generalized Moore-Penrose inverse. Based on the Moore-Penrose inverse, group inverse, Bott-Duffin inverse and certain projections, some representations for the generalized Moore-Penrose inverse are given. An equivalent condition for the continuity of the generalized Moore-Penrose inverse is proposed. Splitting methods and successive matrix squaring algorithm for computing the generalized Moore-Penrose inverse are presented.

    Citation: Kezheng Zuo, Yang Chen, Li Yuan. Further representations and computations of the generalized Moore-Penrose inverse[J]. AIMS Mathematics, 2023, 8(10): 23442-23458. doi: 10.3934/math.20231191

    Related Papers:

  • The aim of this paper is to provide new representations and computations of the generalized Moore-Penrose inverse. Based on the Moore-Penrose inverse, group inverse, Bott-Duffin inverse and certain projections, some representations for the generalized Moore-Penrose inverse are given. An equivalent condition for the continuity of the generalized Moore-Penrose inverse is proposed. Splitting methods and successive matrix squaring algorithm for computing the generalized Moore-Penrose inverse are presented.



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