| dc.contributor.author |
Parida, Pradip Kumar |
|
| dc.contributor.author |
Gupta, D. K. |
|
| dc.date.accessioned |
2014-03-15T10:40:58Z |
|
| dc.date.available |
2014-03-15T10:40:58Z |
|
| dc.date.issued |
2010-10 |
|
| dc.identifier.citation |
Parida, Pradip Kumar and Gupta, D. K., “Semilocal convergence of a family of third-order Chebyshev-type methods under a mild differentiability condition”, International Journal of Computer Mathematics, DOI: 10.1080/00207160903026626, vol. 87, no. 15, pp. 3405–3419, Dec. 2010. |
en_US |
| dc.identifier.issn |
0020-7160 |
|
| dc.identifier.uri |
http://dx.doi.org/10.1080/00207160903026626 |
|
| dc.identifier.uri |
https://repository.iitgn.ac.in/handle/123456789/724 |
|
| dc.description.abstract |
The aim of this paper is to establish the semilocal convergence of a family of third-order Chebyshev-type methods used for solving nonlinear operator equations in Banach spaces under the assumption that the second Fréchet derivative of the operator satisfies a mild ω-continuity condition. This is done by using recurrence relations in place of usual majorizing sequences. An existence–uniqueness theorem is given that establishes the R-order and existence–uniqueness ball for the method. Two numerical examples are worked out and comparisons being made with a known result. |
en_US |
| dc.description.statementofresponsibility |
by P. K. Paridaa and D. K. Guptab |
|
| dc.format.extent |
Vol. 87, No. 15, pp. 3405-3419 |
|
| dc.language.iso |
en |
en_US |
| dc.publisher |
Taylor & Francis |
en_US |
| dc.subject |
ω-continuity condition |
en_US |
| dc.subject |
Nonlinear operator equations |
en_US |
| dc.subject |
Recurrence relations |
en_US |
| dc.subject |
R-order of convergence |
en_US |
| dc.subject |
Semilocal convergence |
en_US |
| dc.title |
Semilocal convergence of a family of third-order Chebyshev-type methods under a mild differentiability condition |
en_US |
| dc.type |
Article |
en_US |
| dc.relation.journal |
International Journal of Computer Mathematics |
|