Realizing expression graphs using table-lookup FPGAs

Proceedings of EURO-DAC 93 and EURO-VHDL 93- European Design Automation Conference Pub Date : 1993-09-20 DOI:10.1109/EURDAC.1993.410655

I. Levin, R. Pinter

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引用次数: 16

Abstract

The authors consider the problem of mapping an expression graph (which represents a combinational network) to a minimal number of programmable functional elements connected by a configurable network (e.g., Xilinx elements). Since each element can realize any function of a fixed arity, they look only at the topological aspect of the mapping, i.e., no algebraic (or other) simplifications are considered (this could have been done at the earlier stage which produced the expression itself). Two analytic results are presented: (1) trees (of arbitrary degree) can be mapped optimally in linear time to elements of four inputs and one output each; and (2) the problem becomes NP-complete for DAGs even if they have only one root and the maximal in-degree of nodes is three. The first result can be easily generalized to elements with any other fixed number of inputs (that is known a priori) and which are used uniformly in the circuit. In light of the second result, the authors present three heuristics for mapping DAGs to networks and discuss their performance both on the ISCAS benchmark and on randomly generated graphs.<>

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使用查找表的fpga实现表达式图

作者考虑将表达图(表示组合网络)映射到由可配置网络(例如Xilinx元素)连接的最小数量的可编程功能元素的问题。由于每个元素都可以实现固定密度的任何函数，因此它们只关注映射的拓扑方面，即不考虑代数(或其他)简化(这可以在生成表达式本身的早期阶段完成)。给出了两个分析结果:(1)任意程度的树可以在线性时间内最优地映射到四个输入和一个输出的元素上;(2)即使dag只有一个根，且节点的最大in度为3，问题仍然是np完全的。第一个结果可以很容易地推广到具有任何其他固定数量输入的元件(这是先验已知的)，并且在电路中均匀使用。根据第二个结果，作者提出了三种启发式方法将dag映射到网络，并讨论了它们在ISCAS基准测试和随机生成图上的性能。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Proceedings of EURO-DAC 93 and EURO-VHDL 93- European Design Automation Conference

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