A ball convergence comparison is developed between three Banach space valued schemes of fourth convergence order to solve nonlinear models under $\omega-$continuity conditions on the derivative.
Regmi, S. , Argyros, I. K. , George, S. and Argyros, C. I. (2022). Ball comparison between three fourth convergence order schemes for nonlinear equations. Computational Mathematics and Computer Modeling with Applications (CMCMA), 1(1), 56-62. doi: 10.52547/CMCMA.1.1.56
MLA
Regmi, S. , , Argyros, I. K. , , George, S. , and Argyros, C. I.. "Ball comparison between three fourth convergence order schemes for nonlinear equations", Computational Mathematics and Computer Modeling with Applications (CMCMA), 1, 1, 2022, 56-62. doi: 10.52547/CMCMA.1.1.56
HARVARD
Regmi, S., Argyros, I. K., George, S., Argyros, C. I. (2022). 'Ball comparison between three fourth convergence order schemes for nonlinear equations', Computational Mathematics and Computer Modeling with Applications (CMCMA), 1(1), pp. 56-62. doi: 10.52547/CMCMA.1.1.56
CHICAGO
S. Regmi , I. K. Argyros , S. George and C. I. Argyros, "Ball comparison between three fourth convergence order schemes for nonlinear equations," Computational Mathematics and Computer Modeling with Applications (CMCMA), 1 1 (2022): 56-62, doi: 10.52547/CMCMA.1.1.56
VANCOUVER
Regmi, S., Argyros, I. K., George, S., Argyros, C. I. Ball comparison between three fourth convergence order schemes for nonlinear equations. Computational Mathematics and Computer Modeling with Applications (CMCMA), 2022; 1(1): 56-62. doi: 10.52547/CMCMA.1.1.56
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