Analytic approach for error masking elimination in on-line multipliers

Proceedings of the 12th Symposium on Computer Arithmetic Pub Date : 1995-07-19 DOI:10.1109/ARITH.1995.465380

H. Bederr, M. Nicolaidis, A. Guyot

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引用次数: 1

Abstract

Several systematic design approaches are known to be representatives of the techniques well adapted for testing sequential circuits (partial and full scan, LSSD...). However in some cases, like for the test of on-line operators, ad-hoc DFT (design for testability) schemes become more suitable. Indeed, on-line arithmetic are used for high precision numbers resulting on high length operators. Thus the length of a test sequence for a scan design approach can grow quite large due to the shift in (shift out) of test values (test responses) and therefore the test application time would become prohibitive. Moreover, the arithmetic nature of these operators imply that some errors detected locally are masked before their observation at the primary outputs. In this paper we describe an analytic approach for testing on-line multipliers that allows to avoid error masking without adding extra hardware for internal state observability while maintaining a 100% fault coverage. Compared to a DFT approach using parity trees, this method leads to a reduction of the area overhead from 7% to 1% and of the extra pins count from 6 to 3 in the case of the on-line multipliers considered in this paper.<>

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在线乘法器中误差掩蔽消除的解析方法

几种系统的设计方法被认为是适合于测试顺序电路的技术的代表(部分和完全扫描，LSSD…)。然而，在某些情况下，如在线运营商的测试，ad-hoc DFT(可测试性设计)方案变得更合适。实际上，在线算法用于由高长度运算符产生的高精度数字。因此，由于测试值(测试响应)的移进(移出)，扫描设计方法的测试序列的长度可能会变得相当大，因此测试应用时间将变得令人望而却步。此外，这些运算符的算术性质意味着局部检测到的一些错误在它们在主输出处观察到之前被掩盖。在本文中，我们描述了一种测试在线乘法器的分析方法，该方法允许避免错误屏蔽，而无需为内部状态可观察性添加额外的硬件，同时保持100%的故障覆盖率。与使用奇偶树的DFT方法相比，该方法将面积开销从7%减少到1%，并且在本文中考虑的在线乘法器的情况下，将额外的引脚计数从6减少到3。

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 the 12th Symposium on Computer Arithmetic

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