Learning Low Degree Hypergraphs

February 21, 2022 Β· Declared Dead Β· πŸ› Annual Conference Computational Learning Theory

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Authors Eric Balkanski, Oussama Hanguir, Shatian Wang arXiv ID 2202.09989 Category cs.DS: Data Structures & Algorithms Cross-listed cs.LG Citations 4 Venue Annual Conference Computational Learning Theory Last Checked 4 months ago
Abstract
We study the problem of learning a hypergraph via edge detecting queries. In this problem, a learner queries subsets of vertices of a hidden hypergraph and observes whether these subsets contain an edge or not. In general, learning a hypergraph with $m$ edges of maximum size $d$ requires $Ξ©((2m/d)^{d/2})$ queries. In this paper, we aim to identify families of hypergraphs that can be learned without suffering from a query complexity that grows exponentially in the size of the edges. We show that hypermatchings and low-degree near-uniform hypergraphs with $n$ vertices are learnable with poly$(n)$ queries. For learning hypermatchings (hypergraphs of maximum degree $ 1$), we give an $O(\log^3 n)$-round algorithm with $O(n \log^5 n)$ queries. We complement this upper bound by showing that there are no algorithms with poly$(n)$ queries that learn hypermatchings in $o(\log \log n)$ adaptive rounds. For hypergraphs with maximum degree $Ξ”$ and edge size ratio $ρ$, we give a non-adaptive algorithm with $O((2n)^{ρΔ+1}\log^2 n)$ queries. To the best of our knowledge, these are the first algorithms with poly$(n, m)$ query complexity for learning non-trivial families of hypergraphs that have a super-constant number of edges of super-constant size.
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