Computing Reviews
Today's Issue Hot Topics Search Browse Recommended My Account Log In
Browse by topic Browse by titles Authors Reviewers Browse by issue Browse Help
Search
  Browse All Reviews > Mathematics Of Computing (G) > Numerical Analysis (G.1) > Roots Of Nonlinear Equations (G.1.5)
 
  Roots Of Nonlinear Equations (G.1.5) See Reviews  
 
Subject Descriptors:
Continuation (Homotopy) Methods (7)
Convergence (18)
Error Analysis (2)
Iterative Methods (29)
Polynomials, Methods For (29)
Systems Of Equations (48)
 
Proper Nouns:
There are no proper nouns with reviews under G.1.5.
 
 
Reviews limited to:
 
 

Reviews about "Roots Of Nonlinear Equations (G.1.5)":
Date Reviewed
A convergence analysis of the inexact simplified Jacobi--Davidson algorithm for polynomial eigenvalue problems
Zhao T. Journal of Scientific Computing 75(3): 1207-1228, 2018.  Type: Article
Dec 20 2018
 Computing real roots of real polynomials
Sagraloff M., Mehlhorn K. Journal of Symbolic Computation 73(C): 46-86, 2016.  Type: Article
Dec 1 2015
Algorithm 954: an accurate and efficient cubic and quartic equation solver for physical applications
Flocke N. ACM Transactions on Mathematical Software 41(4): 1-24, 2015.  Type: Article
Dec 1 2015
A simple and efficient method with high order convergence for solving systems of nonlinear equations
Xiao X., Yin H. Computers & Mathematics with Applications 69(10): 1220-1231, 2015.  Type: Article
Sep 30 2015
Solving transcendental equations: the Chebyshev polynomial proxy and other numerical rootfinders, perturbation series, and oracles
Boyd J., SIAM, Philadelphia, PA, 2014. 480 pp.  Type: Book (978-1-611973-51-8)
Sep 8 2015
Recipes for continuation
Dankowicz H., Schilder F., Society for Industrial and Applied Mathematics, Philadelphia, PA, 2013. 600 pp.  Type: Book (978-1-611972-56-6)
Sep 11 2013
Nonclassical mathematical model in geoinformatics to solve dynamic problems for nonequilibrium nonisothermal seepage fields
Bulavatsky V. Cybernetics and Systems Analysis 47(6): 898-906, 2011.  Type: Article
Mar 27 2012
more...
 
 
Send Your Comments
Contact Us
Reproduction in whole or in part without permission is prohibited.   Copyright 1999-2024 ThinkLoud®
Terms of Use
| Privacy Policy