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Graph Theory » Coloring » Nowhere-zero flows

Circular flow number of regular class 1 graphs ★★

Author(s): Steffen

A nowhere-zero $r$ -flow $(D(G),\phi)$ on $G$ is an orientation $D$ of $G$ together with a function $\phi$ from the edge set of $G$ into the real numbers such that $1 \leq |\phi(e)| \leq r-1$ , for all $e \in E(G)$ , and $\sum_{e \in E^+(v)}\phi(e) = \sum_{e \in E^-(v)}\phi(e), \textrm{ for all } v \in V(G)$ . The circular flow number of $G$ is inf $\{ r | G$ has a nowhere-zero $r$ -flow $\}$ , and it is denoted by $F_c(G)$ .

A graph with maximum vertex degree $k$ is a class 1 graph if its edge chromatic number is $k$ .

Conjecture Let $t \geq 1$ be an integer and $G$ a $(2t+1)$ -regular graph. If $G$ is a class 1 graph, then $F_c(G) \leq 2 + \frac{2}{t}$ .

Keywords: nowhere-zero flow, edge-colorings, regular graphs

Posted by Eckhard Steffen
updated August 5th, 2015

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Graph Theory » Directed Graphs

Cyclic spanning subdigraph with small cyclomatic number ★★

Author(s): Bondy

Conjecture Let $D$ be a digraph all of whose strong components are nontrivial. Then $D$ contains a cyclic spanning subdigraph with cyclomatic number at most $\alpha(D)$ .

Keywords:

Posted by fhavet
updated June 2nd, 2013

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Graph Theory » Infinite Graphs

Unfriendly partitions ★★★

Author(s): Cowan; Emerson

If $G$ is a graph, we say that a partition of $V(G)$ is unfriendly if every vertex has at least as many neighbors in the other classes as in its own.

Problem Does every countably infinite graph have an unfriendly partition into two sets?

Keywords: coloring; infinite graph; partition

Posted by mdevos
updated October 22nd, 2007

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Wide partition conjecture ★★

Author(s): Chow; Taylor

Conjecture An integer partition is wide if and only if it is Latin.

Keywords:

Posted by tchow
updated September 24th, 2008

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updated August 19th, 2024

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KPZ Universality Conjecture ★★★

Author(s):

Conjecture Formulate a central limit theorem for the KPZ universality class.

Keywords: KPZ equation, central limit theorem

Posted by Tomas Kojar
updated October 3rd, 2020

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updated August 19th, 2024

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Logic » Finite Model Theory

Fixed-point logic with counting ★★

Author(s): Blass

Question Can either of the following be expressed in fixed-point logic plus counting:

$M$

$M$

Keywords: Capturing PTime; counting quantifiers; Fixed-point logic; FMT03-Bedlewo

Posted by dberwanger
updated May 18th, 2012

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Graph Theory » Basic G.T. » Cycles

Geodesic cycles and Tutte's Theorem ★★

Author(s): Georgakopoulos; Sprüssel

Problem If $G$ is a $3$ -connected finite graph, is there an assignment of lengths $\ell: E(G) \to \mathb R^+$ to the edges of $G$ , such that every $\ell$ -geodesic cycle is peripheral?

Keywords: cycle space; geodesic cycles; peripheral cycles

Posted by Agelos
updated August 4th, 2007

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Matching cut and girth ★★

Author(s):

Question For every $d$ does there exists a $g$ such that every graph with average degree smaller than $d$ and girth at least $g$ has a matching-cut?

Keywords: matching cut, matching, cut

Posted by w
updated November 30th, 2011

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Number Theory » Combinatorial N.T.

The 3n+1 conjecture ★★★

Author(s): Collatz

Conjecture Let $f(n) = 3n+1$ if $n$ is odd and $\frac{n}{2}$ if $n$ is even. Let $f(1) = 1$ . Assume we start with some number $n$ and repeatedly take the $f$ of the current number. Prove that no matter what the initial number is we eventually reach $1$ .

Keywords: integer sequence

Posted by dododododo
updated July 11th, 2014

Special Primes ★

Author(s): George BALAN

Conjecture Let $p$ be a prime natural number. Find all primes $q\equiv1\left(\mathrm{mod}\: p\right)$ , such that $2^{\frac{\left(q-1\right)}{p}}\equiv1\left(\mathrm{mod}\: q\right)$ .

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Posted by maththebalans
updated February 7th, 2013

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Graph Theory » Hypergraphs

Simultaneous partition of hypergraphs ★★

Author(s): Kühn; Osthus

Problem Let $H_1$ and $H_2$ be two $r$ -uniform hypergraph on the same vertex set $V$ . Does there always exist a partition of $V$ into $r$ classes $V_1, \dots , V_r$ such that for both $i=1,2$ , at least $r!m_i/r^r -o(m_i)$ hyperedges of $H_i$ meet each of the classes $V_1, \dots , V_r$ ?

Keywords:

Posted by fhavet
updated March 6th, 2013

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Posted by tigris35711
updated August 19th, 2024

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Graph Theory » Algebraic G.T.

Ramsey properties of Cayley graphs ★★★

Author(s): Alon

Conjecture There exists a fixed constant $c$ so that every abelian group $G$ has a subset $S \subseteq G$ with $-S = S$ so that the Cayley graph ${\mathit Cayley}(G,S)$ has no clique or independent set of size $> c \log |G|$ .

Keywords: Cayley graph; Ramsey number

Posted by mdevos
updated June 10th, 2007

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Number Theory » Computational N.T.

Magic square of squares ★★

Author(s): LaBar

Question Does there exist a $3\times 3$ magic square composed of distinct perfect squares?

Keywords:

Posted by maxal
updated November 23rd, 2008

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The 4x5 chessboard complex is the complement of a link, which link? ★★

Author(s): David Eppstein

Problem Ian Agol and Matthias Goerner observed that the 4x5 chessboard complex is the complement of many distinct links in the 3-sphere. Their observation is non-constructive, as it uses the resolution of the Poincare Conjecture. Find specific links that have the 4x5 chessboard complex as their complement.

Keywords: knot theory, links, chessboard complex

Posted by rybu
updated September 4th, 2010

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Graph Theory » Coloring » Vertex coloring

Oriented chromatic number of planar graphs ★★

Author(s):

An oriented colouring of an oriented graph is assignment $c$ of colours to the vertices such that no two arcs receive ordered pairs of colours $(c_1,c_2)$ and $(c_2,c_1)$ . It is equivalent to a homomorphism of the digraph onto some tournament of order $k$ .

Problem What is the maximal possible oriented chromatic number of an oriented planar graph?

Keywords: oriented coloring; oriented graph; planar graph

Posted by Robert Samal
updated August 4th, 2007

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Posted by tigris35711
updated August 19th, 2024

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Graph Theory » Coloring » Nowhere-zero flows

5-flow conjecture ★★★★

Author(s): Tutte

Conjecture Every bridgeless graph has a nowhere-zero 5-flow.

Keywords: cubic; nowhere-zero flow

Posted by mdevos
updated March 7th, 2007

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Graph Theory » Coloring » Edge coloring

Goldberg's conjecture ★★★

Author(s): Goldberg

The overfull parameter is defined as follows: $w(G) = \max_{H \subseteq G} \left\lceil \frac{ |E(H)| }{ \lfloor \tfrac{1}{2} |V(H)| \rfloor} \right\rceil.$

Conjecture Every graph $G$ satisfies $\chi'(G) \le \max\{ \Delta(G) + 1, w(G) \}$ .

Keywords: edge-coloring; multigraph

Posted by mdevos
updated June 5th, 2013

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updated August 19th, 2024

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Graph Theory » Hypergraphs

Frankl's union-closed sets conjecture ★★

Author(s): Frankl

Conjecture Let $F$ be a finite family of finite sets, not all empty, that is closed under taking unions. Then there exists $x$ such that $x$ is an element of at least half the members of $F$ .

Keywords:

Posted by tchow
updated December 17th, 2009

Edge-Colouring Geometric Complete Graphs ★★

Author(s): Hurtado

Question What is the minimum number of colours such that every complete geometric graph on $n$ vertices has an edge colouring such that:

\item[Variant A] crossing edges get distinct colours, \item[Variant B] disjoint edges get distinct colours, \item[Variant C] non-disjoint edges get distinct colours, \item[Variant D] non-crossing edges get distinct colours.

Keywords: geometric complete graph, colouring

Posted by David Wood
updated October 19th, 2009

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Graph Theory » Algebraic G.T.

Laplacian Degrees of a Graph ★★

Author(s): Guo

Conjecture If $G$ is a connected graph on $n$ vertices, then $c_k(G) \ge d_k(G)$ for $k = 1, 2, \dots, n-1$ .

Keywords: degree sequence; Laplacian matrix

Posted by Robert Samal
updated February 29th, 2008

Graph Theory » Coloring

4-regular 4-chromatic graphs of high girth ★★

Author(s): Grunbaum

Problem Do there exist 4-regular 4-chromatic graphs of arbitrarily high girth?

Keywords: coloring; girth

Posted by mdevos
updated January 29th, 2012

Graph Theory » Coloring

Total Colouring Conjecture ★★★

Author(s): Behzad

Conjecture A total coloring of a graph $G = (V,E)$ is an assignment of colors to the vertices and the edges of $G$ such that every pair of adjacent vertices, every pair of adjacent edges and every vertex and incident edge pair, receive different colors. The total chromatic number of a graph $G$ , $\chi''(G)$ , equals the minimum number of colors needed in a total coloring of $G$ . It is an old conjecture of Behzad that for every graph $G$ , the total chromatic number equals the maximum degree of a vertex in $G$ , $\Delta(G)$ plus one or two. In other words, $\chi''(G)=\Delta(G)+1\ \ or \ \ \Delta(G)+2.$

Keywords: Total coloring

Posted by Iradmusa
updated June 4th, 2008

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Graph Theory » Extremal G.T.

Triangle-packing vs triangle edge-transversal. ★★

Author(s): Tuza

Conjecture If $G$ has at most $k$ edge-disjoint triangles, then there is a set of $2k$ edges whose deletion destroys every triangle.

Keywords:

Posted by fhavet
updated March 6th, 2013

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A conjecture on iterated circumcentres ★★

Author(s): Goddyn

Conjecture Let $p_1,p_2,p_3,\ldots$ be a sequence of points in ${\mathbb R}^d$ with the property that for every $i \ge d+2$ , the points $p_{i-1}, p_{i-2}, \ldots p_{i-d-1}$ are distinct, lie on a unique sphere, and further, $p_i$ is the center of this sphere. If this sequence is periodic, must its period be $2d+4$ ?

Keywords: periodic; plane geometry; sequence

Posted by mdevos
updated June 8th, 2007

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Graph Theory » Coloring » Vertex coloring

Graphs with a forbidden induced tree are chi-bounded ★★★

Author(s): Gyarfas

Say that a family ${\mathcal F}$ of graphs is $\chi$ -bounded if there exists a function $f: {\mathbb N} \rightarrow {\mathbb N}$ so that every $G \in {\mathcal F}$ satisfies $\chi(G) \le f (\omega(G))$ .

Conjecture For every fixed tree $T$ , the family of graphs with no induced subgraph isomorphic to $T$ is $\chi$ -bounded.

Keywords: chi-bounded; coloring; excluded subgraph; tree

Posted by mdevos
updated May 16th, 2009

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Polignac's Conjecture ★★★

Author(s): de Polignac

Conjecture Polignac's Conjecture: For any positive even number n, there are infinitely many prime gaps of size n. In other words: There are infinitely many cases of two consecutive prime numbers with difference n.

In particular, this implies:

Conjecture Twin Prime Conjecture: There are an infinite number of twin primes.

Keywords: prime; prime gap

Posted by Hugh Barker
updated June 18th, 2013

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Graph Theory » Coloring » Nowhere-zero flows

Antichains in the cycle continuous order ★★

Author(s): DeVos

If $G$ , $H$ are graphs, a function $f : E(G) \rightarrow E(H)$ is called cycle-continuous if the pre-image of every element of the (binary) cycle space of $H$ is a member of the cycle space of $G$ .

Problem Does there exist an infinite set of graphs $\{G_1,G_2,\ldots \}$ so that there is no cycle continuous mapping between $G_i$ and $G_j$ whenever $i \neq j$ ?

Keywords: antichain; cycle; poset

Posted by mdevos
updated May 12th, 2007

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Logic » Finite Model Theory

Vertex Cover Integrality Gap ★★

Author(s): Atserias

Conjecture For every $\varepsilon > 0$ there is $\delta > 0$ such that, for every large $n$ , there are $n$ -vertex graphs $G$ and $H$ such that $G \equiv_{\delta n}^{\mathrm{C}} H$ and $\mathrm{vc}(G) \ge (2 - \varepsilon) \cdot \mathrm{vc}(H)$ .

Keywords: counting quantifiers; FMT12-LesHouches

Posted by dberwanger
updated October 2nd, 2012

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Edge-Unfolding Convex Polyhedra ★★

Author(s): Shephard

Conjecture Every convex polyhedron has a (nonoverlapping) edge unfolding.

Keywords: folding; nets

Posted by Erik Demaine
updated June 18th, 2019

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Graph Theory » Coloring » Vertex coloring

Bounding the chromatic number of triangle-free graphs with fixed maximum degree ★★

Author(s): Kostochka; Reed

Conjecture A triangle-free graph with maximum degree $\Delta$ has chromatic number at most $\ceil{\frac{\Delta}{2}}+2$ .

Keywords: chromatic number; girth; maximum degree; triangle free

Posted by Andrew King
updated May 16th, 2020

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