Testing of Index-Invariant Properties in the Huge Object Model

Sourav Chakraborty, E. Fischer, Arijit Ghosh, Gopinath Mishra, Sayantan Sen
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引用次数: 3

Abstract

The study of distribution testing has become ubiquitous in the area of property testing, both for its theoretical appeal, as well as for its applications in other fields of Computer Science. The original distribution testing model relies on samples drawn independently from the distribution to be tested. However, when testing distributions over the $n$-dimensional Hamming cube $\left\{0,1\right\}^{n}$ for a large $n$, even reading a few samples is infeasible. To address this, Goldreich and Ron [ITCS 2022] have defined a model called the huge object model, in which the samples may only be queried in a few places. In this work, we initiate a study of a general class of properties in the huge object model, those that are invariant under a permutation of the indices of the vectors in $\left\{0,1\right\}^{n}$, while still not being necessarily fully symmetric as per the definition used in traditional distribution testing. We prove that every index-invariant property satisfying a bounded VC-dimension restriction admits a property tester with a number of queries independent of n. To complement this result, we argue that satisfying only index-invariance or only a VC-dimension bound is insufficient to guarantee a tester whose query complexity is independent of n. Moreover, we prove that the dependency of sample and query complexities of our tester on the VC-dimension is tight. As a second part of this work, we address the question of the number of queries required for non-adaptive testing. We show that it can be at most quadratic in the number of queries required for an adaptive tester of index-invariant properties. This is in contrast with the tight exponential gap for general non-index-invariant properties. Finally, we provide an index-invariant property for which the quadratic gap between adaptive and non-adaptive query complexities for testing is almost tight.
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大型对象模型中索引不变性的检验
分布测试的研究在性能测试领域已经变得无处不在,这不仅是因为它的理论吸引力,也因为它在计算机科学的其他领域的应用。原始的分布测试模型依赖于从待测试分布中独立抽取的样本。然而,当测试n维汉明立方体(Hamming cube)上的分布$\左\{0,1\右\}^{n}$时,对于较大的$n$,即使读取几个样本也是不可实现的。为了解决这个问题,Goldreich和Ron [ITCS 2022]定义了一个称为巨大对象模型的模型,其中样本只能在少数地方查询。在这项工作中,我们开始研究巨大对象模型中的一类一般性质,这些性质在$\left\{0,1\right\}^{n}$中向量的索引的排列下是不变的,但仍然不一定是按照传统分布测试中使用的定义完全对称的。我们证明了每一个满足有界vc维约束的索引不变属性都允许一个具有若干独立于n的查询的属性测试仪。为了补充这一结果,我们认为仅满足索引不变或仅满足一个vc维约束不足以保证一个查询复杂度独立于n的测试仪。此外,我们证明了我们的测试仪的样本和查询复杂度对vc维的依赖是紧密的。作为这项工作的第二部分,我们解决了非自适应测试所需查询数量的问题。我们表明,对于索引不变属性的自适应测试器,查询次数最多可以是二次的。这与一般非指数不变性质的紧密指数间隙形成对比。最后,我们提供了一个索引不变的性质,对于该性质,用于测试的自适应和非自适应查询复杂性之间的二次差距几乎是紧密的。
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