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Specific regularity in bipartite graphs

Let $G(A,B)$ be a bipartite graph with $|A| = |B| = n$, where $n$ is sufficiently large(thus, $o(n)/n,o(n^2)/n^2\ll 1$). The edge density of $G$ is $d = \frac{e(A,B)}{n^2}$, where $e(A,B)$ denotes the ...
tom jerry's user avatar
  • 359
0 votes
0 answers
57 views

Does Forcing conjecture equals to assume the host graph is regular?

Given two graphs $H$ and $G$, the homomorphism density $t(H, G)$ is defined as the proportion of mappings from the vertices of $H$ to the vertices of $G$ that preserve adjacency. Formally, $$ t(H, ...
tom jerry's user avatar
  • 359
0 votes
0 answers
45 views

Another version of Sidorenko's conjecture(?)

I would like to ask a question about Sidorenko's conjecture. Here is the background of my question: Quasi-random graphs A sequence of graphs $(G_n)$ is called quasi-random if it satisfies certain ...
tom jerry's user avatar
  • 359
4 votes
1 answer
376 views

Looking for a counterexample to a strengthening of the union-closed sets conjecture

[Now crossposted at math.stackexchange] Let $\mathcal{F} = \{\{x_1, x_2\} : 1 \le x_1 \lt x_2 \le n \}$, $n \ge 8$, and let $\mathcal{G} = \{G_1, \ldots, G_n\}$ be a partition of $\mathcal{F}$ in $n$ ...
Fabius Wiesner's user avatar
0 votes
0 answers
51 views

Inverse problem of "graph limits to graphon"

A graphon is a measurable symmetric function $W: [0,1]\to [0,1].$ By Lovasz's book "Large networks and graph limits" we know for any graph sequence $G_1, G_2, \dots G_i,\dots$ there exists a ...
tom jerry's user avatar
  • 359
0 votes
0 answers
67 views

Does Sidorenko's conjecture hold when the host graph's edge density not too small?

Does the following hold? For every bipartite graph $H$ and every graph $G$ with $e(G)\geq 0.1(v(G))^2$, $$t(H,G)\geq t(K_2, G)^{e(H)}.$$ If not sure, is this a equal question as Sidorenko's conjecture ...
tom jerry's user avatar
  • 359
1 vote
2 answers
391 views

Lower bound for the size of a family of sets

Consider a family $\mathcal{G} = \{ A_1,B_1,\ldots,B_m \}$ of $m+1$ non-empty finite distinct sets with the following property: $$A_1 \cap B_k = \emptyset, 1 \le k \le m$$ Let $\mathcal{F} = \{A_1 \...
Fabius Wiesner's user avatar
0 votes
0 answers
68 views

Proving we can minimize the number of crossings by having a planar embedding of $K_{2,2}$ encircle another out of any 2 such embeddings

Say that we draw a graph in the following way: we first draw $n$ planar embeddings of $K_{2,2}$ (that is, we first draw $n$ quadrilaterals) such there are no edges which cross. Then for each of the $...
Avi's user avatar
  • 1
1 vote
0 answers
63 views

Is there any other norms besides cut norm defined on graphon?

Let $\mathcal{W}$ denote the space of all bounded symmetric measurable functions $W : [0, 1]^2 \rightarrow \mathbb{R}.$ For any $W\in\mathcal{W}$ we say it is a kernel and define its cut norm $\lVert ...
tom jerry's user avatar
  • 359
0 votes
0 answers
43 views

Locally uniformly convexity in kernels (generalized definition of graphon) with cut norm

Let $\mathcal{W}$ denote the space of all bounded symmetric measurable functions $W : [0, 1]^2 \rightarrow \mathbb{R}.$ For any $W\in\mathcal{W}$ we say it is a kernel and define its cut norm $\lVert ...
tom jerry's user avatar
  • 359
0 votes
0 answers
52 views

Does "epsilon-regular" equal to "cut distance less than epsilon"?

Let $G$ be a bipartite graph (vertex number sufficient large) with bipartition $(U,W)$ and edge density $d$. Does these two statement equal? $G$ is $\varepsilon$-regular, i.e. $\big|e_G(X,Y)-d|X||Y|\...
tom jerry's user avatar
  • 359
0 votes
0 answers
49 views

Property of edge-vertex transitive graphs

Recently I am reading a paper (https://arxiv.org/abs/1504.00858) with respect to edge-vertex transitive graphs. What is the property of the graph that is edge transitive and vertex transitive? I know ...
tom jerry's user avatar
  • 359
3 votes
1 answer
155 views

Does Sidorenko's conjecture hold when the host graph's maxdegree/mindegree is a constant?

Does the following holds? For every bipartite graph $H$ and every graph $G$ with $\frac{\Delta(G)}{\delta(G)}\leq 2$, $$t(H,G)\geq t(K_2, G)^{e(H)}.$$ If not sure, is this a equal question as ...
tom jerry's user avatar
  • 359
0 votes
0 answers
39 views

Does this "linear-approximated" version of Graph Counting Lemma hold?

Let $0\leq d\ll\varepsilon,\frac{1}{e},\frac{1}{v}\leq 1.$ Let $G$ be a $n$-vertices graph ($n$ is sufficient large, $1/n\ll d$) and for any $A,B\subseteq V(G)$, the edge density $d(A,B)\geq d.$ Then ...
tom jerry's user avatar
  • 359
1 vote
1 answer
75 views

Lower bound for the sum of the number of vertices of some subgraphs of a directed graph

Let $G$ be any simple weakly connected directed graph with vertices $V$, $\vert V \vert = n$. Let $V_1, \ldots, V_m$, $m = \binom{n}{k}$ be all subsets of $V$ of size $k$. Let $C(V_i)$ be the union of ...
Fabius Wiesner's user avatar
4 votes
0 answers
113 views

What properties do graphs avoiding large regular subgraphs have?

Fix a positive integer $r$ and real $\delta \in (0,1)$. Let $G$ be an undirected graph on $n$ vertices. Suppose that $G$ does not contain an $r$-regular subgraph on at least $\delta n$ vertices (i.e., ...
Naysh's user avatar
  • 557
2 votes
2 answers
143 views

Regarding a specific Turán number of graphs

I wish to know the latest bound on the number of edges a graph of girth greater than or equal to $t$ can have. Specifically, I heard somewhere that a graph of girth greater than or equal to $t$ can ...
vidyarthi's user avatar
  • 2,089
4 votes
0 answers
241 views

Weight transfer proof of Turán’s theorem

Turán’s theorem, which states that a $K_{p+1}$-free graph contains at most $(1-1/p)\frac{N^2}{2}$ edges, can be proven in many different ways, as pointed out, for example in M. Aigner, G. M. Ziegler, ...
Martin Leshko's user avatar
1 vote
1 answer
125 views

Extremal graph theory - many copies of $K_r$ imply a copy of $r$-chromatic $H$

I know that it must be a simple consequence of the Kővári–Sós–Turán (and Erdős–Stone) theorem, but I am struggling to formulate a proof: Let $H$ be a fixed-size $r$-chromatic graph. Then there exists $...
Yevgeny Levanzov's user avatar
6 votes
1 answer
234 views

Graphs without short cycles and with linear number of edges

Let $f : \mathbb{N} \rightarrow \mathbb{N}$ be a non-decreasing function and let $X_f$ be the class of graphs where every $n$-vertex graph $G$ is $(C_3, C_4, \ldots, C_{f(n)})$-free, i.e. $G$ contains ...
Victor's user avatar
  • 655
11 votes
0 answers
195 views

Number of triangle-free graphs with prescribed number of edges

This question is posted from StackExchange since it received no answer there. Let $f(n, e)$ be the number of triangle-free graphs on $n$ vertices and $e$ edges. From empirical evidence, I am motivated ...
abacaba's user avatar
  • 384
3 votes
2 answers
276 views

Ramsey-Turán density function is well defined

Define $$RT(n,K_l,f(n))=ex_l(n,f(n))=\max_G\{e(G): K_l \not\subset G, v(G)=n, \alpha(G)\leq f(n)\}$$ and the Ramsey-Turán density function $f_l:(0,1] \to \mathbb{R}$ as $$f_l(\alpha)=\lim_{n\to \infty}...
JPMarciano's user avatar
7 votes
0 answers
177 views

Szemerédi's regularity lemma for binary operations

Szemerédi's regularity lemma is an approximate structure theorem for all large graphs (symmetric binary relations). There are versions for multicolored graphs and directed graphs. Is there an ...
Richard Stanley's user avatar
3 votes
0 answers
70 views

Boundary differences in two graphs

Let $\Gamma, \Xi$ be two graphs with the same set of vertices $V$ with $n$ elements. Assume $\Gamma$ is connected. Write $\Gamma\cup \Xi$ (or $\Gamma\cap \Xi$) for the graph whose set of edges is the ...
H A Helfgott's user avatar
  • 20.2k
2 votes
1 answer
300 views

Do sparse graphs contain a single regular pair?

An easy corollary of the Szemerédi Regularity Lemma is that dense graphs contain linear sized $\varepsilon$-regular bipartite subgraphs whose density is similar to that of the parent graph. As noted ...
alpmu's user avatar
  • 805
4 votes
0 answers
104 views

Maximal number of smallest circuits in a matroid

It is known (see here for example) that, in a simple graph of odd genus $g$ with $n$ vertices and $m$ edges, the number of cycles of lenght $g$ is at most $\frac{n(m-n+1)}{g}$. Since this can be be ...
Antoine Labelle's user avatar
0 votes
0 answers
102 views

4-cycles vs eigenvalue information on quasi-random graphs

My (philosophical) question arises from reading the wonderful paper of Chung-Graham-Wilson where the authors introduces the notion of quasi-random graphs. The main purpose of the paper is to show ...
Johnny Cage's user avatar
  • 1,561
7 votes
1 answer
514 views

A proper definition of connectivity for hypergraphs

For usual graphs on $n$ vertices, a edge-minimal connected graph is nothing but a spanning tree of this graph. It is well-known that any spanning tree has $n-1$ edges. I would like to know whether ...
Yanjun Han's user avatar
3 votes
1 answer
121 views

The least number of edges to add to a tree that would force a certain number of edge-disjoint cycles

Let $c(n,k)$ be the least integer such that if $G$ is a simple graph on $n$ vertices with $n + c(n,k) - 1$ edges then $G$ has $k$ edge-disjoint cycles. Clearly, $c(n, 1) = 1$ and it not very hard to ...
hbm's user avatar
  • 1,034
1 vote
2 answers
205 views

Extremal density of a graph without a non-backtracking $2k$-cycle

The current best bound for the maximum possible density of an $n$-node graph with girth (shortest cycle length) $>2k$ is of the form $$ex(n \ \mid \ C_{\le 2k}) = O(n^{1 + 1/k}),$$ while the ...
GMB's user avatar
  • 1,389
3 votes
0 answers
66 views

An extremal problem in directed path systems

The following is a common rephrasing of the well-known open problem in extremal graph theory to (asymptotically) determine $ex(n, C_8)$: What is the asymptotically maximum $L = L(n)$ such that ...
GMB's user avatar
  • 1,389
3 votes
1 answer
289 views

Graph properties that imply a bounded number of edges

Many combinatorial problems can be reduced to bounding the number of edges in a given graph with $n$ vertices. Each time I encounter such a problem, I check whether the corresponding graph has a ...
Adam Sheffer's user avatar
  • 1,072
4 votes
1 answer
220 views

Maximal number of perfect matchings that pairwise form a Hamiltonian cycle

Definition: Let $MH(n)$ be the maximal number of perfect matchings (1-regular graphs) on $n$ vertices where the union of any two perfect matchings is a Hamiltonian cycle. Question: Is it true that $MH(...
Daniel Soltész's user avatar
0 votes
0 answers
153 views

A Non-trivial intersecting set system problem

Liven large enough $k\in\Bbb N$ fix $m\in\{2,3,\dots,k\}$ and fix $4k$ cardinality set $K_{4k}$. What is the maximum $n\in\Bbb N$ such that at some $t\geq2n-1$ there are $$\mbox{ subsets }L_1,L_2,\...
user avatar
0 votes
0 answers
47 views

Possible Number of Repetation of a Submatrix

Notation: $H$ is the adjacency matrix of graph $H'$ respectively. $H_k$ is the block or sub-matrix of matrix $H$. The adjacency matrix of graph $H_k \cup H_e$ (subgraphs of $H'$) is $M_{(k,e)}$ ...
Michael's user avatar
  • 267
4 votes
1 answer
976 views

What is the minimum number of independent sets for a graph with fixed numbers of vertices and edges?

Fix integers $V$ and $E_{\text{max}}$, and consider graphs $G$ with $V$ vertices and at most $E_{\text{max}}$ edges. What is the best lower bound that one can give on the number of distinct ...
blt's user avatar
  • 1,233
1 vote
2 answers
360 views

Tight bound of Turan number for K_{1,t,t}

I'm looking for a tight bound for Turan number $ex_2(n,K_{1,t,t})$, where $K_{1,t,t}$ is the complete 3-partite graph with parts of size 1, t, and t. The motivation is that we now $ex_2(n,K_{t,t})=O(...
Connor's user avatar
  • 281
0 votes
1 answer
1k views

Vertex cover of regular graph

(1.) How small can set $S$ of vertices in any regular undirected graph $G$ on $n$ vertices with degree $\Omega(n^\alpha)$ where $\alpha\in(0,1)$ can be such that every edge in the graph is incident on ...
user avatar
2 votes
1 answer
356 views

Extremal combinatorics on bipartite graphs

One open question in extremal graph Theory is the so-called Zarankiewicz problem (see for instance the wikipedia page), which ask for the maximum number of edges in a bipartite graph with a fixed ...
Johnny Cage's user avatar
  • 1,561
6 votes
2 answers
349 views

extremal bipartite graph

I'm facing the following question: Given a bipartite graph $G = (L \cup R, E)$. Let $n = |L|$, $m = |R|$, and a parameter $k \in \mathbb{N}$, $n > m > k$. What is a minimal possible number of ...
Gilad's user avatar
  • 161
23 votes
3 answers
3k views

Cauchy-Schwarz proof of Sidorenko for 3-edge path (Blakley-Roy inequality)

Is there a "Cauchy-Schwarz proof" of the following inequality? Theorem. Given $f \colon [0,1]^2 \to [0,1]$, one has $$ \int_{[0,1]^4} f(x,y)f(z,y)f(z,w) \, dxdydzdw \geq \left(\int_{[0,1]^2} f(x,y) \,...
Yufei Zhao's user avatar
4 votes
1 answer
887 views

Existence of triangle-free graphs for regular graphs of degree at most n/2

It is known that for triangle-free graphs, if they are $d$-regular, then $2d\leq n$, where $n$ is the number of vertices. In words, the degree is less than or equal to half the number of vertices (...
Gizem's user avatar
  • 43