An efficient method to compute different types of generalized inverses based on linear transformation

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摘要

In this paper, we present functional definitions of all types of generalized inverses related to the {1}-inverse, which is a continuation of the work of Campbell and Meyer (2009). According to these functional definitions, we further derive novel representations for all types of generalized inverses related to the {1}-inverse in terms of the bases for R(A*), N(A) and N(A*). Based on these representations, we present the corresponding algorithm for computing various generalized inverses related to the {1}-inverse of a matrix and analyze the computational complexity of our algorithm for a constant matrix. Finally, we implement our algorithm and several known algorithms for symbolic computation of the Moore-–Penrose inverse in the symbolic computational package MATHEMATICA and compare their running times. Numerical experiments show that our algorithm outperforms these known algorithms when applied to compute the Moore–Penrose inverse of one-variable rational matrices, but is not the best choice for two-variable rational matrices in practice.

论文关键词:Generalized inverse,Linear transformation,Rational matrix,MATHEMATICA

论文评审过程:Received 26 March 2018, Revised 2 October 2018, Accepted 26 December 2018, Available online 12 January 2019, Version of Record 12 January 2019.

论文官网地址:https://doi.org/10.1016/j.amc.2018.12.064