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تسجيل مستخدم جديدNear-linear Size Hypergraph Cut Sparsifiers
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Cuts in graphs are a fundamental object of study, and play a central role in the study of graph algorithms. The problem of sparsifying a graph while approximately preserving its cut structure has been extensively studied and has many applications. In a seminal work, Benczur and Karger (1996) showed that given any $n$-vertex undirected weighted graph $G$ and a parameter $varepsilon in (0,1)$, there is a near-linear time algorithm that outputs a weighted subgraph $G$ of $G$ of size $tilde{O}(n/varepsilon^2)$ such that the weight of every cut in $G$ is preserved to within a $(1 pm varepsilon)$-factor in $G$. The graph $G$ is referred to as a {em $(1 pm varepsilon)$-approximate cut sparsifier} of $G$. A natural question is if such cut-preserving sparsifiers also exist for hypergraphs. Kogan and Krauthgamer (2015) initiated a study of this question and showed that given any weighted hypergraph $H$ where the cardinality of each hyperedge is bounded by $r$, there is a polynomial-time algorithm to find a $(1 pm varepsilon)$-approximate cut sparsifier of $H$ of size $tilde{O}(frac{nr}{varepsilon^2})$. Since $r$ can be as large as $n$, in general, this gives a hypergraph cut sparsifier of size $tilde{O}(n^2/varepsilon^2)$, which is a factor $n$ larger than the Benczur-Karger bound for graphs. It has been an open question whether or not Benczur-Karger bound is achievable on hypergraphs. In this work, we resolve this question in the affirmative by giving a new polynomial-time algorithm for creating hypergraph sparsifiers of size $tilde{O}(n/varepsilon^2)$.
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Graph sparsification has been studied extensively over the past two decades, culminating in spectral sparsifiers of optimal size (up to constant factors). Spectral hypergraph sparsification is a natural analogue of this problem, for which optimal bou
nds on the sparsifier size are not known, mainly because the hypergraph Laplacian is non-linear, and thus lacks the linear-algebraic structure and tools that have been so effective for graphs. Our main contribution is the first algorithm for constructing $epsilon$-spectral sparsifiers for hypergraphs with $O^*(n)$ hyperedges, where $O^*$ suppresses $(epsilon^{-1} log n)^{O(1)}$ factors. This bound is independent of the rank $r$ (maximum cardinality of a hyperedge), and is essentially best possible due to a recent bit complexity lower bound of $Omega(nr)$ for hypergraph sparsification. This result is obtained by introducing two new tools. First, we give a new proof of spectral concentration bounds for sparsifiers of graphs; it avoids linear-algebraic methods, replacing e.g.~the usual application of the matrix Bernstein inequality and therefore applies to the (non-linear) hypergraph setting. To achieve the result, we design a new sequence of hypergraph-dependent $epsilon$-nets on the unit sphere in $mathbb{R}^n$. Second, we extend the weight assignment technique of Chen, Khanna and Nagda [FOCS20] to the spectral sparsification setting. Surprisingly, the number of spanning trees after the weight assignment can serve as a potential function guiding the reweighting process in the spectral setting.
Let $G$ be a graph and $S, T subseteq V(G)$ be (possibly overlapping) sets of terminals, $|S|=|T|=k$. We are interested in computing a vertex sparsifier for terminal cuts in $G$, i.e., a graph $H$ on a smallest possible number of vertices, where $S c
up T subseteq V(H)$ and such that for every $A subseteq S$ and $B subseteq T$ the size of a minimum $(A,B)$-vertex cut is the same in $G$ as in $H$. We assume that our graphs are unweighted and that terminals may be part of the min-cut. In previous work, Kratsch and Wahlstrom (FOCS 2012/JACM 2020) used connections to matroid theory to show that a vertex sparsifier $H$ with $O(k^3)$ vertices can be computed in randomized polynomial time, even for arbitrary digraphs $G$. However, since then, no improvements on the size $O(k^3)$ have been shown. In this paper, we draw inspiration from the renowned Bollobass Two-Families Theorem in extremal combinatorics and introduce the use of total orderings into Kratsch and Wahlstroms methods. This new perspective allows us to construct a sparsifier $H$ of $Theta(k^2)$ vertices for the case that $G$ is a DAG. We also show how to compute $H$ in time near-linear in the size of $G$, improving on the previous $O(n^{omega+1})$. Furthermore, $H$ recovers the closest min-cut in $G$ for every partition $(A,B)$, which was not previously known. Finally, we show that a sparsifier of size $Omega(k^2)$ is required, both for DAGs and for undirected edge cuts.
The problem of sparsifying a graph or a hypergraph while approximately preserving its cut structure has been extensively studied and has many applications. In a seminal work, Benczur and Karger (1996) showed that given any $n$-vertex undirected weigh
ted graph $G$ and a parameter $varepsilon in (0,1)$, there is a near-linear time algorithm that outputs a weighted subgraph $G$ of $G$ of size $tilde{O}(n/varepsilon^2)$ such that the weight of every cut in $G$ is preserved to within a $(1 pm varepsilon)$-factor in $G$. The graph $G$ is referred to as a {em $(1 pm varepsilon)$-approximate cut sparsifier} of $G$. Subsequent recent work has obtained a similar result for the more general problem of hypergraph cut sparsifiers. However, all known sparsification algorithms require $Omega(n + m)$ time where $n$ denotes the number of vertices and $m$ denotes the number of hyperedges in the hypergraph. Since $m$ can be exponentially large in $n$, a natural question is if it is possible to create a hypergraph cut sparsifier in time polynomial in $n$, {em independent of the number of edges}. We resolve this question in the affirmative, giving the first sublinear time algorithm for this problem, given appropriate query access to the hypergraph.
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