Title :
Neural networks and rational Lukasiewicz logic
Author :
Amato, Paolo ; Nola, Antonio Di ; Gerla, Brunella
Author_Institution :
ST Microelectron., Agrate Brianza, Italy
Abstract :
We describe a correspondence between rational Lukasiewicz formulas and neural networks in which the activation function is the truncated identity and synaptic weights are rational numbers. On one hand, having a logical representation (in a given logic) of neural networks could widen the interpretability, amalgamability and reuse of these objects. On the other hand, neural networks could be used to learn formulas from data and as circuital counterparts of (functions represented by) formulas.
Keywords :
formal logic; learning (artificial intelligence); neural nets; Rational Lukasiewicz Logic; activation function; formula learning; neural networks; rational Lukasiewicz formulas; rational numbers; synaptic weights; truncated identity; Calculus; Circuits; Computer networks; Informatics; Logic; Mathematics; Neural networks; Pattern analysis; Pattern recognition; Time series analysis;
Conference_Titel :
Fuzzy Information Processing Society, 2002. Proceedings. NAFIPS. 2002 Annual Meeting of the North American
Print_ISBN :
0-7803-7461-4
DOI :
10.1109/NAFIPS.2002.1018111
