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ORCIDYoung Ik Kim
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2020 – today
- 2020
[j33]Min-Young Lee, Young Ik Kim:
Development of a Family of Jarratt-Like Sixth-Order Iterative Methods for Solving Nonlinear Systems with Their Basins of Attraction. Algorithms 13(11): 303 (2020)- [j32]Min-Young Lee, Young Ik Kim
:
The dynamical analysis of a uniparametric family of three-point optimal eighth-order multiple-root finders under the Möbius conjugacy map on the Riemann sphere. Numer. Algorithms 83(3): 1063-1090 (2020)
2010 – 2019
- 2019
- [j31]Ramandeep Behl, Vinay Kanwar, Young Ik Kim:
Higher-order families of Multiple root Finding Methods Suitable for non-convergent Cases and their dynamics. Math. Model. Anal. 24(3): 422-444 (2019) - 2018
- [j30]Min Surp Rhee, Young Ik Kim, Beny Neta:
An optimal eighth-order class of three-step weighted Newton's methods and their dynamics behind the purely imaginary extraneous fixed points. Int. J. Comput. Math. 95(11): 2174-2211 (2018) - [j29]Young Hee Geum, Young Ik Kim, Beny Neta:
Constructing a family of optimal eighth-order modified Newton-type multiple-zero finders along with the dynamics behind their purely imaginary extraneous fixed points. J. Comput. Appl. Math. 333: 131-156 (2018) - [j28]Young Hee Geum, Young Ik Kim, Ángel Alberto Magreñán:
A study of dynamics via Möbius conjugacy map on a family of sixth-order modified Newton-like multiple-zero finders with bivariate polynomial weight functions. J. Comput. Appl. Math. 344: 608-623 (2018) - 2017
- [j27]Min-Young Lee, Young Ik Kim, Ángel Alberto Magreñán:
On the dynamics of a triparametric family of optimal fourth-order multiple-zero finders with a weight function of the principal mth root of a function-to function ratio. Appl. Math. Comput. 315: 564-590 (2017) - [j26]Sang Deok Lee, Young Ik Kim, Beny Neta:
An optimal family of eighth-order simple-root finders with weight functions dependent on function-to-function ratios and their dynamics underlying extraneous fixed points. J. Comput. Appl. Math. 317: 31-54 (2017) - [j25]Young Hee Geum, Young Ik Kim, Beny Neta:
A family of optimal quartic-order multiple-zero finders with a weight function of the principal kth root of a derivative-to-derivative ratio and their basins of attraction. Math. Comput. Simul. 136: 1-21 (2017) - [j24]Young Ik Kim, Ramandeep Behl, Sandile Sydney Motsa:
An Optimal family of Eighth-order iterative Methods with an inverse interpolatory rational function error corrector for nonlinear equations. Math. Model. Anal. 22(3): 321-336 (2017) - 2016
- [j23]Young Ik Kim, Ramandeep Behl, Sandile Sydney Motsa:
Higher-order efficient class of Chebyshev-Halley type methods. Appl. Math. Comput. 273: 1148-1159 (2016) - [j22]Young Hee Geum, Young Ik Kim, Ángel Alberto Magreñán:
A biparametric extension of King's fourth-order methods and their dynamics. Appl. Math. Comput. 282: 254-275 (2016) - [j21]Young Hee Geum, Young Ik Kim, Beny Neta:
A sixth-order family of three-point modified Newton-like multiple-root finders and the dynamics behind their extraneous fixed points. Appl. Math. Comput. 283: 120-140 (2016) - 2015
- [j20]Young Hee Geum, Young Ik Kim, Beny Neta:
On developing a higher-order family of double-Newton methods with a bivariate weighting function. Appl. Math. Comput. 254: 277-290 (2015) - [j19]Young Hee Geum, Young Ik Kim, Beny Neta:
A class of two-point sixth-order multiple-zero finders of modified double-Newton type and their dynamics. Appl. Math. Comput. 270: 387-400 (2015) - 2014
- [j18]Young Ik Kim, Young Hee Geum:
A New Biparametric Family of Two-Point Optimal Fourth-Order Multiple-Root Finders. J. Appl. Math. 2014: 737305:1-737305:7 (2014) - [j17]Young Hee Geum, Young Ik Kim:
An Optimal Family of Fast 16th-Order Derivative-Free Multipoint Simple-Root Finders for Nonlinear Equations. J. Optim. Theory Appl. 160(2): 608-622 (2014) - 2013
- [j16]Young Ik Kim, Young Hee Geum:
A Two-Parameter Family of Fourth-Order Iterative Methods with Optimal Convergence for Multiple Zeros. J. Appl. Math. 2013: 369067:1-369067:7 (2013) - 2012
- [j15]Young Ik Kim:
A triparametric family of three-step optimal eighth-order methods for solving nonlinear equations. Int. J. Comput. Math. 89(8): 1051-1059 (2012) - [j14]Min-Young Lee, Young Ik Kim:
A family of fast derivative-free fourth-order multipoint optimal methods for nonlinear equations. Int. J. Comput. Math. 89(15): 2081-2093 (2012) - 2011
- [j13]Young Hee Geum, Young Ik Kim:
A uniparametric family of three-step eighth-order multipoint iterative methods for simple roots. Appl. Math. Lett. 24(6): 929-935 (2011) - [j12]Young Hee Geum, Young Ik Kim:
A biparametric family of four-step sixteenth-order root-finding methods with the optimal efficiency index. Appl. Math. Lett. 24(8): 1336-1342 (2011) - [j11]Young Hee Geum, Young Ik Kim:
A biparametric family of eighth-order methods with their third-step weighting function decomposed into a one-variable linear fraction and a two-variable generic function. Comput. Math. Appl. 61(3): 708-714 (2011) - [j10]Young Hee Geum, Young Ik Kim:
A family of optimal sixteenth-order multipoint methods with a linear fraction plus a trivariate polynomial as the fourth-step weighting function. Comput. Math. Appl. 61(11): 3278-3287 (2011) - [j9]Young Ik Kim, Young Hee Geum:
A cubic-order variant of Newton's method for finding multiple roots of nonlinear equations. Comput. Math. Appl. 62(4): 1634-1640 (2011) - [j8]Young Hee Geum, Young Ik Kim:
A biparametric family of optimally convergent sixteenth-order multipoint methods with their fourth-step weighting function as a sum of a rational and a generic two-variable function. J. Comput. Appl. Math. 235(10): 3178-3188 (2011) - 2010
- [j7]Young Hee Geum, Young Ik Kim:
A multi-parameter family of three-step eighth-order iterative methods locating a simple root. Appl. Math. Comput. 215(9): 3375-3382 (2010) - [j6]Young Ik Kim:
A new two-step biparametric family of sixth-order iterative methods free from second derivatives for solving nonlinear algebraic equations. Appl. Math. Comput. 215(9): 3418-3424 (2010) - [j5]Young Hee Geum, Young Ik Kim:
A penta-parametric family of fifteenth-order multipoint methods for nonlinear equations. Appl. Math. Comput. 217(6): 2311-2319 (2010)
2000 – 2009
- 2009
- [j4]Young Hee Geum, Young Ik Kim, Hae Chull Lim:
A boundary equation of the principal period-2 component in the degree-n bifurcation set. Int. J. Comput. Math. 86(8): 1311-1318 (2009) - [j3]Young Hee Geum, Young Ik Kim:
Cubic convergence of parameter-controlled Newton-secant method for multiple zeros. J. Comput. Appl. Math. 233(4): 931-937 (2009) - 2006
- [j2]Young Hee Geum, Young Ik Kim, Min Surp Rhee:
High-order convergence of the k-fold pseudo-Newton's irrational method locating a simple real zero. Appl. Math. Comput. 182(1): 492-497 (2006) - 2003
- [j1]Young Hee Geum, Young Ik Kim:
A Study on Computation of Component Centers in the Degree-n Bifurcation Set. Int. J. Comput. Math. 80(2): 223-232 (2003)
Coauthor Index
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