Dimensioning of the Vertical Earth Grounding with Rectangular Contour through Minimizing the Investments Costs

Claudiu Ciorca, V. Maier, S. Pavel, Horia G. Beleiu
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引用次数: 2

Abstract

The design of earth grounding (EGR) on optimal criteria has relaunched the seemingly stagnant problem of their dimensioning. The perspective opened by the formulation of technical or economic aim functions becomes engaging for designers, having now the opportunity to argue for the established solutions. If the application of the first three criteria has already been dealt with, such as the ground footprint, the EGR total volume and the total metal mass, the total investment criterion is addressed in the paper. The research also brings a methodological improvement to the case of EGR with vertical electrodes placed after a rectangular contour by fixing the number of electrodes to pare numbers greater than four and looking for correlations between the distance between the electrodes and the length of the electrodes, in order to achieve the chosen rated dispersion resistance. During the searches, identifying a simple, parabolic arc function for the real nonlinear dependence between the vertical electrode dispersion resistance and the electrode length has proven to be a real benefit because it has replaced the solving of transcendental equations with solving second-degree equations. The minimum total investment has different coordinates from the minima of the other optimal criteria, proving once again that they are distinct.
降低投资成本的矩形等高线垂直接地的尺寸确定
基于最优准则的接地设计(EGR)重新引发了看似停滞不前的尺寸问题。技术或经济目标功能的形成所打开的视角对设计师来说很有吸引力,现在有机会为既定的解决方案争论。如果已经处理了前三个标准的应用,如地面足迹、EGR总量和总金属质量,那么本文将讨论总投资标准。该研究还对在矩形轮廓后放置垂直电极的EGR情况进行了方法改进,通过固定电极数量以减少大于4的数量,并寻找电极之间的距离与电极长度之间的相关性,以实现所选的额定分散电阻。在搜索过程中,为垂直电极色散电阻与电极长度之间的真正非线性关系确定一个简单的抛物线弧函数已被证明是一个真正的好处,因为它用求解二阶方程取代了求解超越方程。最小总投资与其他最优准则的最小值具有不同的坐标,再次证明它们是不同的。
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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