Can You Link Up With Treewidth?
October 03, 2024 Β· Declared Dead Β· π Symposium on Theoretical Aspects of Computer Science
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Authors
Radu Curticapean, Simon DΓΆring, Daniel Neuen, Jiaheng Wang
arXiv ID
2410.02606
Category
cs.DS: Data Structures & Algorithms
Cross-listed
cs.CC
Citations
5
Venue
Symposium on Theoretical Aspects of Computer Science
Last Checked
4 months ago
Abstract
In a fundamental paper in parameterized complexity theory, Marx [ToC '10] constructed $k$-vertex graphs $H$ of maximum degree $3$ such that $n^{o(k /\log k)}$ time algorithms for detecting colorful $H$-subgraphs would refute the Exponential-Time Hypothesis (ETH). This result is widely used to obtain almost-tight conditional lower bounds for parameterized problems under ETH. We give a new and fully self-contained proof of this result that further simplifies a recent work by Karthik et al. [SOSA 2024]. In our proof, we introduce a novel graph parameter of independent interest, the linkage capacity $Ξ³(H)$, and show that detecting colorful $H$-subgraphs in time $n^{o(Ξ³(H))}$ refutes ETH. Then, we use a simple construction of communication networks credited to BeneΕ‘ to obtain $k$-vertex graphs of maximum degree $3$ and linkage capacity $Ξ©(k / \log k)$, avoiding arguments involving expander graphs, which were required in previous papers. We also show that every graph $H$ of treewidth $t$ has linkage capacity $Ξ©(t / \log t)$, thus recovering a stronger result shown by Marx [ToC '10] with a simplified proof. Additionally, we obtain new tight lower bounds on the complexity of colorful subgraph detection for certain types of patterns by analyzing their linkage capacity: We prove that almost all $k$-vertex graphs of polynomial average degree $Ξ©(k^Ξ²)$ for $Ξ²> 0$ have linkage capacity $Ξ(k)$, which implies tight lower bounds for finding such patterns $H$. As an application of these results, we also obtain tight lower bounds for counting small induced subgraphs having a fixed property $Ξ¦$, improving bounds from, e.g., [Roth et al., FOCS 2020].
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