Upper Transversals in Linear Hypergraphs

Let $r\geq 1$ be an integer. An $h$-hypergraph $H$ is said to be $r$-quasi-linear (linear for $r=1$) if any two edges of $H$ intersect in 0 or $r$ vertices. In this paper it is shown that $r$-quasi-linear paths $P_{m}^{h,r}$ of length $m\geq 1$ and cycles $C_{m}^{h,r}$ of length $m\geq 3$ are chromatically unique in the set of $h$-uniform $r$-quasi-linear hypergraphs provided $r\geq 2$ and $h\geq 3r-1$.

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Constructive Packings by Linear Hypergraphs

Combinatorics Probability Computing ◽

10.1017/s0963548313000291 ◽

2013 ◽

Vol 22 (6) ◽

pp. 829-858 ◽

Cited By ~ 1

Author(s):

JILL DIZONA ◽

BRENDAN NAGLE

Keyword(s):

Maximum Size ◽

Np Hard ◽

Edge Disjoint ◽

Analogous Algorithm ◽

Linear Hypergraphs

For k-graphs F0 and H, an F0-packing of H is a family $\mathscr{F}$ of pairwise edge-disjoint copies of F0 in H. Let νF0(H) denote the maximum size |$\mathscr{F}$| of an F0-packing of H. Already in the case of graphs, computing νF0(H) is NP-hard for most fixed F0 (Dor and Tarsi [6]).In this paper, we consider the case when F0 is a fixed linear k-graph. We establish an algorithm which, for ζ > 0 and a given k-graph H, constructs in time polynomial in |V(H)| an F0-packing of H of size at least νF0(H) − ζ |V(H)|k. Our result extends one of Haxell and Rödl, who established the analogous algorithm for graphs.

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The existence problem for colour critical linear hypergraphs

Acta Mathematica Academiae Scientiarum Hungaricae ◽

10.1007/bf01902363 ◽

1978 ◽

Vol 32 (3-4) ◽

pp. 273-282 ◽

Cited By ~ 8

Author(s):

H. L. Abbott ◽

A. C. Liu

Keyword(s):

Existence Problem ◽

Linear Hypergraphs

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Supersaturation of even linear cycles in linear hypergraphs

Combinatorics Probability Computing ◽

10.1017/s0963548320000206 ◽

2020 ◽

Vol 29 (5) ◽

pp. 698-721

Author(s):

Tao Jiang ◽

Liana Yepremyan

Keyword(s):

Random Graph ◽

Classical Result ◽

Independent Interest ◽

Multiplicative Constant ◽

Vertex Graph ◽

Linear Hypergraphs

AbstractA classical result of Erdős and, independently, of Bondy and Simonovits [3] says that the maximum number of edges in an n-vertex graph not containing C2k, the cycle of length 2k, is O(n1+1/k). Simonovits established a corresponding supersaturation result for C2k’s, showing that there exist positive constants C,c depending only on k such that every n-vertex graph G with e(G)⩾ Cn1+1/k contains at least c(e(G)/v(G))2k copies of C2k, this number of copies tightly achieved by the random graph (up to a multiplicative constant).In this paper we extend Simonovits' result to a supersaturation result of r-uniform linear cycles of even length in r-uniform linear hypergraphs. Our proof is self-contained and includes the r = 2 case. As an auxiliary tool, we develop a reduction lemma from general host graphs to almost-regular host graphs that can be used for other supersaturation problems, and may therefore be of independent interest.

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