Analysis of Semilocal and Order of Convergence on Riemannian Manifolds for Secant Method

Authors

  • Mr. Vipul Snehi, Mr. Prabhat Kumar

DOI:

https://doi.org/10.17762/msea.v71i4.729

Abstract

This paper deals the analysis of semilocal and order of convergence on Riemannian Manifolds for Secant Method. Furthermore, it has divided difference geodesic points on euclidean spaces. Also, we have used the fact that ? is monotonic in its two arguments under invertible.This paper deals the analysis of semilocal and order of convergence on Riemannian Manifolds for Secant Method. Furthermore, it has divided difference geodesic points on euclidean spaces. Also, we have used the fact that ? is monotonic in its two arguments under invertible.

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Published

2022-09-05

How to Cite

Mr. Vipul Snehi, Mr. Prabhat Kumar. (2022). Analysis of Semilocal and Order of Convergence on Riemannian Manifolds for Secant Method. Mathematical Statistician and Engineering Applications, 71(4), 1988–1994. https://doi.org/10.17762/msea.v71i4.729

Issue

Vol. 71 No. 4 (2022)

Section

Articles