A function f is AND bi-decomposable if it can be written as f(X/sub 1/,X/sub 2/)=h/sub 1/(X/sub 1/)h/sub 2/(X/sub 2/). In this case, a sum-of-products expression (SOP) for f is obtained from minimum SOPs (MSOP) for h/sub 1/ and h/sub 2/ by applying the law of distributivity. If the result is an MSOP, then the complexity of minimization is reduced. However, the application of the law of distributivity to MSOPs for h/sub 1/ and h/sub 2/ does not always produce an MSOP for f. We show an incompletely specified function of n(n-1) variables that requires at most n products in an MSOP, while 2/sup n-1/ products are required by minimizing the component functions separately. We introduce a new class of logic functions, called orthodox functions, where the application of the law of distributivity to MSOPs for component functions of f always produces an MSOP for f. We show that orthodox functions include all functions with three of fewer variables, all symmetric functions, all unate functions, many benchmark functions, and few random functions with many variables.
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机译:如果函数f可以写成f(X / sub 1 /,X / sub 2 /)= h / sub 1 /(X / sub 1 /)h / sub 2 /(X / sub 2 /)。在这种情况下,通过应用分布定律,从h / sub 1 /和h / sub 2 /的最小SOP(MSOP)获得f的乘积和表达式(SOP)。如果结果是MSOP,则最小化的复杂性将降低。但是,对h / sub 1 /和h / sub 2 /适用于MSOP的分布定律并不总是能得出f的MSOP。我们显示了n(n-1)变量的不完全指定函数,在MSOP中最多需要n个乘积,而通过分别最小化组件函数,则需要2 / sup n-1 /个乘积。我们引入了一类新的逻辑函数,称为正统函数,其中f的分量函数对MSOP的分布定律的应用始终会为f产生MSOP。我们证明了正统函数包括具有较少三个变量的所有函数,所有对称函数,所有unate函数,许多基准函数以及很少具有多个变量的随机函数。
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