@article{6884fc7cd38344eaa17948c059ec9a55,
title = "On the benefits of adaptivity in property testing of dense graphs",
abstract = "We consider the question of whether adaptivity can improve the complexity of property testing algorithms in the dense graphs model. It is known that there can be at most a quadratic gap between adaptive and non-adaptive testers in this model, but it was not known whether any gap indeed exists. In this work we reveal such a gap. Specifically, we focus on the well studied property of bipartiteness. Bogdanov and Trevisan (IEEE Symposium on Computational Complexity, pp. 75-81, 2004) proved a lower bound of Ω(1/∈ 2) on the query complexity of non-adaptive testing algorithms for bipartiteness. This lower bound holds for graphs with maximum degree O(∈n). Our main result is an adaptive testing algorithm for bipartiteness of graphs with maximum degree O(∈n) whose query complexity is 1 {\~o}(1/∈ 3/ 2). A slightly modified version of our algorithm can be used to test the combined property of being bipartite and having maximum degree O(∈n). Thus we demonstrate that adaptive testers are stronger than non-adaptive testers in the dense graphs model. We note that the upper bound we obtain is tight up-to polylogarithmic factors, in view of the Ω(1/ε 3/ 2) lower bound of Bogdanov and Trevisan for adaptive testers. In addition we show that {\~o}(1/∈ 3/ 2) queries also suffice when (almost) all vertices have degree Ω(√∈.n). In this case adaptivity is not necessary.",
keywords = "Adaptivity, Bipartiteness, Property testing",
author = "Mira Gonen and Dana Ron",
note = "Funding Information: This work was supported by the Israel Science Foundation (grant number 89/05).",
year = "2010",
month = dec,
doi = "10.1007/s00453-008-9237-4",
language = "אנגלית",
volume = "58",
pages = "811--830",
journal = "Algorithmica",
issn = "0178-4617",
publisher = "Springer New York",
number = "4",
}