Runtime accuracy alterable approximate floatingpoint multipliers

Mi Lu
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Abstract

Modern systems demand high computational power within limited resources. Approximate computing is a promising approach to design arithmetic units with tight resources for error-tolerant applications such as image and signal processing and computer vision. A floating-point multiplier is one of the arithmetic units with the highest complexity in such applications. Designing a floating-point multiplier based on the approximate computing technique can reduce its complexity as well as increase performance and energy efficiency. However, an unknown error rate for upcoming input data is problematic to design appropriate approximate multipliers. The existing solution is to utilize an error estimator relying on statistical analysis. In this paper, we propose new approximate floating-point multipliers based on an accumulator and reconfigurable adders with an error estimator. Unlike previous designs, our proposed designs are able to change the levels of accuracy at runtime. Thus, we can make errors distributed more evenly. In contrast to other designs, our proposed design can maximize the performance gain since reconfigurable multipliers are able to operate two multiplications in parallel once the low accuracy mode is selected. Furthermore, we apply a simple rounding technique to approximate floating-point multipliers for additional improvement. Our simulation results reveal that our new method can reduce area by 70.98% when error tolerance margin of our target application is 5%, and when its error tolerance margin is 3%, our rounding enhanced simple adders-based approximate multiplier can save area by 65.9%, and our reconfigurable adder-based approximate multiplier with rounding can save the average delay and energy by 54.95% and 46.67% respectively compared to an exact multiplier.
运行时精度可变近似浮点乘法器
现代系统需要在有限的资源内获得高计算能力。近似计算是一种很有前途的算法单元设计方法,用于容错应用,如图像和信号处理以及计算机视觉。浮点乘法器是这类应用程序中复杂度最高的算术单元之一。基于近似计算技术设计浮点乘法器可以降低其复杂度,提高性能和能效。然而,即将到来的输入数据的未知错误率是设计适当的近似乘法器的问题。现有的解决方案是利用依赖于统计分析的误差估计器。本文提出了一种基于累加器和带误差估计器的可重构加法器的近似浮点乘法器。与以前的设计不同,我们提出的设计能够在运行时改变精度级别。因此,我们可以使误差分布更均匀。与其他设计相比,我们提出的设计可以最大限度地提高性能增益,因为一旦选择低精度模式,可重构乘法器能够并行操作两个乘法。此外,我们应用一个简单的四舍五入技术来近似浮点乘数,以获得额外的改进。仿真结果表明,当目标应用的容错裕度为5%时,新方法可减少70.98%的面积,当容错裕度为3%时,基于舍入增强简单加法器的近似乘法器可节省65.9%的面积,基于舍入的可重构加法器的近似乘法器可比精确乘法器分别节省54.95%和46.67%的平均延迟和能量。
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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