多值对称函数的romdd中的平面性

Proceedings of 26th IEEE International Symposium on Multiple-Valued Logic (ISMVL'96) Pub Date : 1996-01-19 DOI:10.1109/ISMVL.1996.508364

J. T. Butler, J. Nowlin, Tsutomu Sasao

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引用次数: 4

摘要

我们证明了多值对称函数具有平面ROMDD(降阶多值决策图)当且仅当它是伪投票函数。我们证明了这样的函数的个数是(r-1)(n+r, n+1)，其中r是逻辑值的个数，n是变量的个数。由此可以得出，当n趋于无穷时，具有平面romdd的对称多值函数的分数趋于0。进一步证明，当n较大时，对称函数平面ROMDDs的最坏情况和平均节点数分别为n/sup 2/(1/2-1/2r)和n/sup 2/(1/2-1/2r)。

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Planarity in ROMDDs of multiple-valued symmetric functions

We show that a multiple-valued symmetric function has a planar ROMDD (reduced ordered multiple-valued decision diagram) if and only if it is a pseudo-voting function. We show that the number of such functions is (r-1)(n+r, n+1) where r is the number of logic values and n is the number of variables. It follows from this that the fraction of symmetric multiple-valued functions that have planar ROMDDs approaches 0 as n approaches infinity. Further, we show that the worst case and average number of nodes in planar ROMDDs of symmetric functions is n/sup 2/(1/2-1/2r) and n/sup 2/(1/2-1/(r+1)), respectively, when n is large.

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Proceedings of 26th IEEE International Symposium on Multiple-Valued Logic (ISMVL'96)

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