Morgan & Claypool Publishers
Boolean Differential Equations
Boolean Differential Equations
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Generally speaking, a Boolean differential equation (BDE) is an equation in which elements of the BDC appear. It includes variables, functions, and derivative operations of these functions. The solution of such a BDE is a set of Boolean functions. This is a significant extension of Boolean equations, which have sets of Boolean vectors as solutions. In the simplest BDE a derivative operation of the BDC on the left-hand side is equal to a logic function on the right-hand side. The solution of such a simple BDE means to execute an operation which is inverse to the given derivative. BDEs can be applied in the same fields as the BDC, however, their possibility to express sets of Boolean functions extends the application field significantly.
Table of Contents: Basics of the Binary Boolean Algebra / Summary of the Boolean Differential Calculus / Boolean Differential Equations / Solutions of the Exercises / Bibliography / Authors' Biographies / Index
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