Abstract
A set of simultaneous equations in the MVL (multivalued logic) algebraic system is transformed into a set of simultaneous equations in the MTB (multivalued-to-binary) algebraic system by replacing each expression and each unknown function in the former by its respective logical decomposition. Using the available method for solving a set of simultaneous Boolean equations, a method has been developed and presented for solving a given set of simultaneous equations in the MVL algebraic system. The necessary and sufficient conditions for the existence of one or more solutions of the set under no constraints as well as under some constraints are given. >
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