On Testability of First-Order Properties in Bounded-Degree Graphs and Connections to Proximity-Oblivious Testing

SIAM Journal on Computing, Volume 53, Issue 4, Page 825-883, August 2024.
Abstract. We study property testing of properties that are definable in first-order logic (FO) in the bounded-degree graph and relational structure models. We show that any FO property that is defined by a formula with quantifier prefix [math] is testable (i.e., testable with constant query complexity), while there exists an FO property that is expressible by a formula with quantifier prefix [math] that is not testable. In the dense graph model, a similar picture has long been known [N. Alon, E. Fischer, M. Krivelevich, and M. Szegedy, Combinatorica, 20 (2000), pp. 451–476] despite the very different nature of the two models. In particular, we obtain our lower bound by an FO formula that defines a class of bounded-degree expanders, based on zig-zag products of graphs. We expect this to be of independent interest. We then use our class of FO definable bounded-degree expanders to answer a long-standing open problem for proximity-oblivious testers (POTs). POTs are a class of particularly simple testing algorithms, where a basic test is performed a number of times that may depend on the proximity parameter, but the basic test itself is independent of the proximity parameter. In their seminal work, Goldreich and Ron [STOC 2009; SIAM J. Comput., 40 (2011), pp. 534–566] show that the graph properties that are constant-query proximity-oblivious testable in the bounded-degree model are precisely the properties that can be expressed as a generalized subgraph freeness (GSF) property that satisfies the non-propagation condition. It is left open whether the non-propagation condition is necessary. Indeed, calling properties expressible as a generalized subgraph freeness property GSF-local properties, they ask whether all GSF-local properties are non-propagating. We give a negative answer by showing that our FO definable property is GSF-local and propagating. Hence, in particular, our property does not admit a POT, despite being GSF-local. For this result we establish a new connection between FO properties and GSF-local properties via neighborhood profiles.