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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 $\sum_{e \in E^+(v)}\phi(e) = \sum_{e \in E^-(v)}\phi(e), \textrm{ for all } v \in V(G)$ .

A $(2t+1)$ -regular graph $G$ is a $(2t+1)$ -graph if $|\partial_G(X)| \geq 2t+1$ for every $X \subseteq V(G)$ with $|X|$ odd.

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

Keywords: flow conjectures; nowhere-zero flows

Posted by Eckhard Steffen
updated August 6th, 2015

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Graph Theory

Do any three longest paths in a connected graph have a vertex in common? ★★

Author(s): Gallai

Conjecture Do any three longest paths in a connected graph have a vertex in common?

Keywords:

Posted by fhavet
updated October 14th, 2023

1 comment

Algebra

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Posted by tigris35711
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Algebra

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Posted by tigris35711
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Number Theory

Chowla's cosine problem ★★★

Author(s): Chowla

Problem Let $A \subseteq {\mathbb N}$ be a set of $n$ positive integers and set $m(A) = - \min_x \sum_{a \in A} \cos(ax).$ What is $m(n) = \min_A m(A)$ ?

Keywords: circle; cosine polynomial

Posted by mdevos
updated February 22nd, 2008

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Number Theory » Combinatorial N.T.

Gao's theorem for nonabelian groups ★★

Author(s): DeVos

For every finite multiplicative group $G$ , let $s(G)$ ( $s'(G)$ ) denote the smallest integer $m$ so that every sequence of $m$ elements of $G$ has a subsequence of length $>0$ (length $|G|$ ) which has product equal to 1 in some order.

Conjecture $s'(G) = s(G) + |G| - 1$ for every finite group $G$ .

Keywords: subsequence sum; zero sum

Posted by mdevos
updated May 23rd, 2007

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Algebra

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Posted by tigris35711
updated August 19th, 2024

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Graph Theory » Basic G.T. » Cycles

Cycle double cover conjecture ★★★★

Author(s): Seymour; Szekeres

Conjecture For every graph with no bridge, there is a list of cycles so that every edge is contained in exactly two.

Keywords: cover; cycle

Posted by mdevos
updated February 7th, 2012

3 comments

Logic » Finite Model Theory

MSO alternation hierarchy over pictures ★★

Author(s): Grandjean

Question Is the MSO-alternation hierarchy strict for pictures that are balanced, in the sense that the width and the length are polynomially (or linearly) related.

Keywords: FMT12-LesHouches; MSO, alternation hierarchy; picture languages

Posted by dberwanger
updated May 18th, 2012

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Graph Theory » Coloring » Nowhere-zero flows

Circular flow number of regular class 1 graphs ★★

Author(s): Steffen

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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Algebra

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Algebra

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Number Theory » Analytic N.T.

Distribution and upper bound of mimic numbers ★★

Author(s): Bhattacharyya

Problem

Let the notation $a|b$ denote '' $a$ divides $b$ ''. The mimic function in number theory is defined as follows [1].

Definition For any positive integer $\mathcal{N} = \sum_{i=0}^{n}\mathcal{X}_{i}\mathcal{M}^{i}$ divisible by $\mathcal{D}$ , the mimic function, $f(\mathcal{D} | \mathcal{N})$ , is given by,

$f(\mathcal{D} | \mathcal{N}) = \sum_{i=0}^{n}\mathcal{X}_{i}(\mathcal{M}-\mathcal{D})^{i}$

By using this definition of mimic function, the mimic number of any non-prime integer is defined as follows [1].

Definition The number $m$ is defined to be the mimic number of any positive integer $\mathcal{N} = \sum_{i=0}^{n}\mathcal{X}_{i}\mathcal{M}^{i}$ , with respect to $\mathcal{D}$ , for the minimum value of which $f^{m}(\mathcal{D} | \mathcal{N}) = \mathcal{D}$ .

Given these two definitions and a positive integer $\mathcal{D}$ , find the distribution of mimic numbers of those numbers divisible by $\mathcal{D}$ .

Again, find whether there is an upper bound of mimic numbers for a set of numbers divisible by any fixed positive integer $\mathcal{D}$ .

Keywords: Divisibility; mimic function; mimic number

Posted by facility_cttb@i...
updated June 20th, 2009

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Algebra

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Posted by tigris35711
updated August 19th, 2024

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Graph Theory » Directed Graphs

Long directed cycles in diregular digraphs ★★★

Author(s): Jackson

Conjecture Every strong oriented graph in which each vertex has indegree and outdegree at least $d$ contains a directed cycle of length at least $2d+1$ .

Keywords:

Posted by fhavet
updated March 1st, 2013

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Graph Theory

Shannon capacity of the seven-cycle ★★★

Author(s):

Problem What is the Shannon capacity of $C_7$ ?

Keywords:

Posted by tchow
updated February 19th, 2009

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Algebra

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Algebra

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updated August 19th, 2024

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Graph Theory

Switching reconstruction conjecture ★★

Author(s): Stanley

Conjecture Every simple graph on five or more vertices is switching-reconstructible.

Keywords: reconstruction

Posted by fhavet
updated March 7th, 2013

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Geometry

Chromatic number of associahedron ★★

Author(s): Fabila-Monroy; Flores-Penaloza; Huemer; Hurtado; Urrutia; Wood

Conjecture Associahedra have unbounded chromatic number.

Keywords: associahedron, graph colouring, chromatic number

Posted by David Wood
updated June 2nd, 2015

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Theoretical Comp. Sci. » Algorithms

P vs. NP ★★★★

Author(s): Cook; Levin

Problem Is P = NP?

Keywords: Complexity Class; Computational Complexity; Millenium Problems; NP; P; polynomial algorithm

Posted by zitterbewegung
updated October 18th, 2007

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Algebra

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updated August 19th, 2024

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Algebra

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Posted by tigris35711
updated August 19th, 2024

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Topology

Infinite distributivity of meet over join for a principal funcoid ★★

Author(s): Porton

Conjecture $f \sqcap \bigsqcup S = \bigsqcup \langle f \sqcap \rangle^{\ast} S$ for principal funcoid $f$ and a set $S$ of funcoids of appropriate sources and destinations.

Keywords: distributivity; principal funcoid

Posted by porton
updated July 27th, 2016

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Algebra

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Posted by tigris35711
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Algebra

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updated August 19th, 2024

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Graph Theory » Directed Graphs

The Bermond-Thomassen Conjecture ★★

Author(s): Bermond; Thomassen

Conjecture For every positive integer $k$ , every digraph with minimum out-degree at least $2k-1$ contains $k$ disjoint cycles.

Keywords: cycles

Posted by JS
updated October 1st, 2007

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Geometry

Dense rational distance sets in the plane ★★★

Author(s): Ulam

Problem Does there exist a dense set $S \subseteq {\mathbb R}^2$ so that all pairwise distances between points in $S$ are rational?

Keywords: integral distance; rational distance

Posted by mdevos
updated July 4th, 2008

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Group Theory

Burnside problem ★★★★

Author(s): Burnside

Conjecture If a group has $r$ generators and exponent $n$ , is it necessarily finite?

Keywords:

Posted by dlh12
updated April 11th, 2008

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Graph Theory » Algebraic G.T.

57-regular Moore graph? ★★★

Author(s): Hoffman; Singleton

Question Does there exist a 57-regular graph with diameter 2 and girth 5?

Keywords: cage; Moore graph

Posted by mdevos
updated March 18th, 2007

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Algebra

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updated August 19th, 2024

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Graph Theory » Coloring » Nowhere-zero flows

Jaeger's modular orientation conjecture ★★★

Author(s): Jaeger

Conjecture Every $4k$ -edge-connected graph can be oriented so that ${\mathit indegree}(v) - {\mathit outdegree}(v) \cong 0$ (mod $2k+1$ ) for every vertex $v$ .

Keywords: nowhere-zero flow; orientation

Posted by mdevos
updated March 7th, 2007

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Topology

Strict inequalities for products of filters ★

Author(s): Porton

Conjecture $\mathcal{A} \times^{\mathsf{\ensuremath{\operatorname{RLD}}}}_F \mathcal{B} \subset \mathcal{A} \ltimes \mathcal{B} \subset \mathcal{A} \times^{\mathsf{\ensuremath{\operatorname{RLD}}}} \mathcal{B}$ for some filter objects $\mathcal{A}$ , $\mathcal{B}$ . Particularly, is this formula true for $\mathcal{A} = \mathcal{B} = \Delta \cap \uparrow^{\mathbb{R}} \left( 0 ; + \infty \right)$ ?

A weaker conjecture:

Conjecture $\mathcal{A} \times^{\mathsf{\ensuremath{\operatorname{RLD}}}}_F \mathcal{B} \subset \mathcal{A} \ltimes \mathcal{B}$ for some filter objects $\mathcal{A}$ , $\mathcal{B}$ .

Keywords: filter products

Posted by porton
updated August 9th, 2011

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Graph Theory

Covering powers of cycles with equivalence subgraphs ★

Author(s):

Conjecture Given $k$ and $n$ , the graph $C_{n}^k$ has equivalence covering number $\Omega(k)$ .

Keywords:

Posted by Andrew King
updated July 7th, 2011

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Algebra

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updated August 15th, 2024

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Graph Theory » Graph Algorithms

A gold-grabbing game ★★

Author(s): Rosenfeld

Setup Fix a tree $T$ and for every vertex $v \in V(T)$ a non-negative integer $g(v)$ which we think of as the amount of gold at $v$ .

2-Player game Players alternate turns. On each turn, a player chooses a leaf vertex $v$ of the tree, takes the gold at this vertex, and then deletes $v$ . The game ends when the tree is empty, and the winner is the player who has accumulated the most gold.

Problem Find optimal strategies for the players.

Keywords: game; tree

Posted by mdevos
updated October 4th, 2009

1 comment

Geometry

Point sets with no empty pentagon ★

Author(s): Wood

Problem Classify the point sets with no empty pentagon.

Keywords: combinatorial geometry; visibility graph

Posted by David Wood
updated March 25th, 2019

2 comments

Graph Theory » Basic G.T. » Cycles

Decomposing an eulerian graph into cycles. ★★

Author(s): Hajós

Conjecture Every simple eulerian graph on $n$ vertices can be decomposed into at most $\frac{1}{2}(n-1)$ cycles.

Keywords:

Posted by fhavet
updated March 4th, 2013

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Graph Theory » Basic G.T. » Cycles

Decomposing an eulerian graph into cycles with no two consecutives edges on a prescribed eulerian tour. ★★

Author(s): Sabidussi

Conjecture Let $G$ be an eulerian graph of minimum degree $4$ , and let $W$ be an eulerian tour of $G$ . Then $G$ admits a decomposition into cycles none of which contains two consecutive edges of $W$ .

Keywords:

Posted by fhavet
updated March 4th, 2013

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Algebra

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Algebra

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Graph Theory » Infinite Graphs

Characterizing (aleph_0,aleph_1)-graphs ★★★

Author(s): Diestel; Leader

Call a graph an $(\aleph_0,\aleph_1)$ -graph if it has a bipartition $(A,B)$ so that every vertex in $A$ has degree $\aleph_0$ and every vertex in $B$ has degree $\aleph_1$ .