Abstract
For solving nonlinear monotone equations with convex constraints, Liu and Feng (Numer. Algoritm. 82(1):245–262, 2019) suggested a derivative-free iterative technique. Although they assert that the direction \(d_k\) satisfies inequality (2.1), however, this is not true, as the derivation of the parameter \(\theta _k\) given by equation (2.7) is not correct. This led to Lemma 2.2, Lemma 3.1 and Theorem 3.1 in Liu and Feng (Numer. Algoritm. 82(1):245–262, 2019) not holding. In addition, Theorem 3.1 is still invalid as the bound for \(\Vert F(x_k+\alpha _k^{\prime }d_k)\Vert \) was not established by the authors, instead the authors used the bound for \(\Vert F(x_k+\alpha _kd_k)\Vert \) as the bound for \(\Vert F(x_k+\alpha _k^{\prime }d_k)\Vert \). In this paper, We first describe the necessary adjustments and establish the bound for \(\Vert F(x_k+\alpha _k^{\prime }d_k)\Vert \), after which the proposed approach by Liu and Feng continues to converge globally. In addition, we provide some numerical results to support the adjustments.
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The second author would like to thank the Department of Mathematics and Applied Mathematics, Sefako Makgatho Health Sciences University.
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M. Abdullahi wrote the main manuscript text and A. B. Abubakar prepared all figures. Y. Feng and J. Liu checked the whole manuscript and polished the examples. All authors reviewed the manuscript.
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Abdullahi, M., Abubakar, A.B., Feng, Y. et al. Comment on: “A derivative-free iterative method for nonlinear monotone equations with convex constraints”. Numer Algor 94, 1551–1560 (2023). https://doi.org/10.1007/s11075-023-01546-5
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DOI: https://doi.org/10.1007/s11075-023-01546-5