Title :
Matrix method for solving multivalued logic differential equations
Author :
Yanushkevich, S.N.
Author_Institution :
Inst. of Comput. Sci. & Inf. Syst., Tech. Univ. Szczecin, Poland
fDate :
9/1/1997 12:00:00 AM
Abstract :
A method to solve logic differential equations, i.e. equations containing logic derivatives of multivalued logic (MVL) functions (with k values) is proposed. An initial differential equation is represented by a system of k logic equations of k variables given as 0-polarity Reed-Muller canonical expansion. This system is solved by means of a truncated orthogonal transform algorithm
Keywords :
Reed-Muller codes; differential equations; logic design; matrix algebra; multivalued logic; transforms; 0-polarity Reed-Muller canonical expansion; k-valued logic functions; logic derivatives; logic design; matrix method; multivalued logic differential equations; truncated orthogonal transform algorithm;
Journal_Title :
Computers and Digital Techniques, IEE Proceedings -
DOI :
10.1049/ip-cdt:19971368
