Title :
Recurrent neural networks for solving linear inequalities and equations
Author :
Xia, Youshen ; Wang, Jun ; Hung, Donald L.
Author_Institution :
Dept. of Mech. & Autom. Eng., Chinese Univ. of Hong Kong, Shatin, Hong Kong
fDate :
4/1/1999 12:00:00 AM
Abstract :
This paper presents two types of recurrent neural networks, continuous-time and discrete-time ones, for solving linear inequality and equality systems. In addition to the basic continuous-time and discrete-time neural-network models, two improved discrete-time neural networks with faster convergence rate are proposed by use of scaling techniques. The proposed neural networks can solve a linear inequality and equality system, can solve a linear program and its dual simultaneously, and thus extend and modify existing neural networks for solving linear equations or inequalities. Rigorous proofs on the global convergence of the proposed neural networks are given. Digital realization of the proposed recurrent neural networks are also discussed
Keywords :
convergence of numerical methods; linear algebra; linear programming; recurrent neural nets; continuous-time networks; convergence rate; discrete-time networks; global convergence; linear equations; linear inequalities; linear program; recurrent neural networks; scaling techniques; Artificial neural networks; Convergence; Equations; Iterative methods; Linear matrix inequalities; Neural networks; Recurrent neural networks; Relaxation methods; Time factors; Very large scale integration;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
