Ranking with Ties based on Noisy Performance Data

arXiv - CS - Performance Pub Date : 2024-05-28 DOI:arxiv-2405.18259

Aravind Sankaran, Lars Karlsson, Paolo Bientinesi

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Abstract

We consider the problem of ranking a set of objects based on their performance when the measurement of said performance is subject to noise. In this scenario, the performance is measured repeatedly, resulting in a range of measurements for each object. If the ranges of two objects do not overlap, then we consider one object as 'better' than the other, and we expect it to receive a higher rank; if, however, the ranges overlap, then the objects are incomparable, and we wish them to be assigned the same rank. Unfortunately, the incomparability relation of ranges is in general not transitive; as a consequence, in general the two requirements cannot be satisfied simultaneously, i.e., it is not possible to guarantee both distinct ranks for objects with separated ranges, and same rank for objects with overlapping ranges. This conflict leads to more than one reasonable way to rank a set of objects. In this paper, we explore the ambiguities that arise when ranking with ties, and define a set of reasonable rankings, which we call partial rankings. We develop and analyse three different methodologies to compute a partial ranking. Finally, we show how performance differences among objects can be investigated with the help of partial ranking.

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基于噪声性能数据的并列排名

我们考虑的问题是，在对一组对象的性能进行测量时，如果测量结果受到噪声影响，如何根据这些对象的性能对其进行排序。在这种情况下，性能会被反复测量，从而得出每个对象的测量范围。如果两个对象的测量范围没有重叠，那么我们认为其中一个对象比另一个 "更好"，我们希望它获得更高的排名；但是，如果两个对象的测量范围重叠，那么它们就是不可比的，我们希望它们获得相同的排名。不幸的是，范围的不可比关系一般不具有传递性；因此，一般来说，这两个要求不能同时满足，也就是说，不可能同时保证范围分开的对象有不同的等级，而范围重叠的对象有相同的等级。这种冲突导致对一组对象进行排序的合理方法不止一种。在本文中，我们探讨了有属性排序时出现的歧义，并定义了一组合理的排序，我们称之为部分排序。我们开发并分析了三种不同的方法来计算部分排序。最后，我们展示了如何借助部分排序来研究对象之间的性能差异。

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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arXiv - CS - Performance

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