Applied Mathematics

Volume 2, Issue 5 (May 2011)

ISSN Print: 2152-7385   ISSN Online: 2152-7393

Google-based Impact Factor: 0.96  Citations  

Solving Large Scale Unconstrained Minimization Problems by a New ODE Numerical Integration Method

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DOI: 10.4236/am.2011.25069    5,734 Downloads   10,283 Views  Citations

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ABSTRACT

In reference [1], for large scale nonlinear equations , a new ODE solving method was given. This paper is a continuous work. Here has gradient structure i.e. , is a scalar function. The eigenvalues of the Jacobian of ; or the Hessian of , are all real number. So the new method is very suitable for this structure. For quadratic function the convergence was proved and the spectral radius of iteration matrix was given and compared with traditional method. Examples show for large scale problems (dimension ) the new method is very efficient.

Share and Cite:

Han, T. , Luo, X. and Han, Y. (2011) Solving Large Scale Unconstrained Minimization Problems by a New ODE Numerical Integration Method. Applied Mathematics, 2, 527-532. doi: 10.4236/am.2011.25069.

Cited by

[1] Solving Load Flow Problems of Power System by Explicit Pseudo-Transient Continuation (E-ψtc) Method
Energy and Power Engineering, 2016
[2] Explicit pseudo-transient continuation
Computing, 2013
[3] Numerical Solution for Super Large Scale Systems
T Han, Y Han - ieeexplore.ieee.org, 2013
[4] Solving Various Large Scale Systems by a New ODE Method
Proceedings 2011 world congress on Engineering and Technology (CET 2011), 2011

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