Publication Type : Journal Article
Source : Symmetry (2020), 12, 1969; doi:10.3390/sym12121969.
Url : 10.3390/sym12121969.
Campus : Chennai
School : School of Engineering
Department : Mathematics
Year : 2020
Abstract : Many optimal order multiple root techniques, which use derivatives in the algorithm, have been proposed in literature. But contrarily, derivative free optimal order techniques for multiple root are almost nonexistent. By this as an inspirational factor, here we present a family of optimal fourth order derivative-free techniques for computing multiple roots of nonlinear equations. At the beginning the convergence analysis is executed for particular values of multiplicity afterwards it concludes in general form. Behl et. al derivative-free method is seen as special case of the family. Moreover, the applicability and comparison is demonstrated on different nonlinear problems that certifies the efficient convergent nature of the new methods. Finally, we conclude that our new methods consume the lowest CPU time as compared to the existing ones. This illuminates the theoretical outcomes to a great extent of this study.
Cite this Research Publication : Sunil Kumar, Deepak Kumar, Janak Raj Sharma, Lorentz Jantschi “A family of derivative free optimal fourth order methods for computing multiple roots”, Symmetry (2020), 12, 1969; doi:10.3390/sym12121969.