Title :
Neural algorithms of data performing in finite fields GF(2m )
Author_Institution :
Sci. Res. Inst. ´´Kvant´´, Moscow, Russia
Abstract :
Neural networks realizing finite-field arithmetic are presented. The neural algorithms of addition and multiplication are exploited to develop a neural network realizing Zhegalkin´s polynomial of the Boolean function. Neural algorithms for addition and exponentiation computation were used for solving linear equation systems and for evaluating logarithms in finite fields. The author presents the operations´ run-time expressions in finite fields with neural networks and a comparative estimation of existing multiplication and exponentiation algorithms
Keywords :
Boolean functions; digital arithmetic; equations; neural nets; polynomials; Boolean function; Zhegalkin´s polynomial; addition; exponentiation; finite-field arithmetic; linear equation systems; logarithms; multiplication; neural algorithms; neural network; run-time expressions; Communication switching; Galois fields; Intelligent networks; Neural networks; Neurons; Very large scale integration;
Conference_Titel :
Neuroinformatics and Neurocomputers, 1992., RNNS/IEEE Symposium on
Conference_Location :
Rostov-on-Don
Print_ISBN :
0-7803-0809-3
DOI :
10.1109/RNNS.1992.268601
