TY  - EJOU
AU  - Rafiq, Naila 
AU  - Akram, Saima 
AU  - Shams, Mudassir 
AU  - Mir, Nazir Ahmad 

TI  - Computer Geometries for Finding All Real Zeros of Polynomial Equations Simultaneously
T2  - Computers, Materials \& Continua

PY  - 2021
VL  - 69
IS  - 2
SN  - 1546-2226

AB  - In this research article, we construct a family of derivative free simultaneous numerical schemes to approximate all real zero of non-linear polynomial equation. We make a comparative analysis of the newly constructed numerical schemes with a well-known existing simultaneous method for determining all the distinct real zeros of polynomial equations using computer algebra system Mat Lab. Lower bound of convergence of simultaneous schemes is calculated using Mathematica. Global convergence property of the numerical schemes is presented by taking random starting initial approximation and their convergence history are graphically presented. Some real life engineering applications along with some higher degree polynomials are considered as numerical test problems to show performance and efficiency of the derivative free family of numerical methods with comparison of an existing method of same order in literature. Local computational order of convergence, CPU time, graph of computational order of convergence and residual error graphs elaborate efficiency, robustness and authentication of the suggested family of numerical methods in its domain.
KW  - Polynomials; simultaneous iterative methods; random initial guesses; lower bound; local computational order; CAS-mathematica and mat lab

DO  - 10.32604/cmc.2021.018955