Testing k-submodularity
摘要
We initiate the study of property testing for -submodular functions, a higher-dimensional analogue of submodular functions defined on partial partitions of a ground set. While -submodularity retains the diminishing-returns flavor of ordinary submodularity, it also introduces a pairwise monotonicity constraint comparing competing assignments of the same element. This additional local structure makes the testing problem qualitatively different from the classical case. Our results show a sharp contrast between distance regimes. In the regime for , we prove that every bounded -submodular function is close to a junta on the hypergrid. Combined with an implicit-learning tester for hypergrid domains, this yields a constant-query tester for -submodularity. In the Hamming distance regime, -submodularity admits two qualitatively different local witnesses -- violated squares for diminishing marginal gains, and violated triangles for pairwise-monotonicity failures -- and the latter has no counterpart at . We prove density theorems for both witness types via repair on filters and ideals of partial partitions, yielding non-adaptive, one-sided sub-exponential-query testers for the two component properties of -submodularity. We then exhibit a configuration in which the two repair directions are forced into opposition on a shared vertex, identifying a structural barrier to combining these into a tester for the full property. Finally, for bounded-range functions, we give an adaptive tester for monotone -submodularity via a pseudo-DNF representation and learning on the hypergrid. Several of the structural and learning tools developed here may be useful for testing other properties over product domains.
引用
@article{arxiv.2606.30433,
title = {Testing k-submodularity},
author = {Themistoklis Haris and Diptaksho Palit},
journal= {arXiv preprint arXiv:2606.30433},
year = {2026}
}