DocumentCode
1660407
Title
Lagrangian method for satisfiability problems of propositional calculus
Author
Nagamatu, Masahiro ; Yanaru, Torao
Author_Institution
Dept. of Electr., Electron. & Comput. Eng., Kyushu Inst. of Technol., Fukuoka, Japan
fYear
1995
Firstpage
71
Lastpage
74
Abstract
Hopfield type neural networks for solving difficult combinatorial optimization problems have used gradient descent algorithms to solve constrained optimization problems via penalty functions. However, it is well known that the convergence to local minima is inevitable in these approaches. Lagrange programming neural networks have been proposed. They differ from the gradient descent algorithms by using anti-descent terms in their dynamical differential equations. We analyze the stability and the convergence property of the Lagrangian method when it is applied to a satisfiability problem of propositional calculus
Keywords
algorithm theory; calculus; computability; convergence of numerical methods; differential equations; neural nets; numerical stability; optimisation; Hopfield type neural networks; Lagrange programming neural networks; Lagrangian method; anti-descent terms; combinatorial optimization problems; constrained optimization problems; convergence property; dynamical differential equations; gradient descent algorithms; penalty functions; propositional calculus; satisfiability problems; stability; Calculus; Constraint optimization; Convergence; Differential equations; Electronic mail; Hopfield neural networks; Lagrangian functions; Neural networks; Page description languages; Stability analysis;
fLanguage
English
Publisher
ieee
Conference_Titel
Artificial Neural Networks and Expert Systems, 1995. Proceedings., Second New Zealand International Two-Stream Conference on
Conference_Location
Dunedin
Print_ISBN
0-8186-7174-2
Type
conf
DOI
10.1109/ANNES.1995.499442
Filename
499442
Link To Document