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Algebra

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Algebra

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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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Topology

Hilbert-Smith conjecture ★★

Author(s): David Hilbert; Paul A. Smith

Conjecture Let $G$ be a locally compact topological group. If $G$ has a continuous faithful group action on an $n$ -manifold, then $G$ is a Lie group.

Keywords:

Posted by porton
updated February 6th, 2011

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Graph Theory » Coloring » Vertex coloring

Let $r$ be a positive integer. We say that a graph $G$ is strongly $r$ -colorable if for every partition of the vertices to sets of size at most $r$ there is a proper $r$ -coloring of $G$ in which the vertices in each set of the partition have distinct colors.

Conjecture If $\Delta$ is the maximal degree of a graph $G$ , then $G$ is strongly $2 \Delta$ -colorable.

Keywords: strong coloring

Posted by berger
updated November 19th, 2009

5 comments

Algebra

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Geometry

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Problem Enumerate all convex uniform 5-polytopes.

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Posted by ACW
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Algebra

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Algebra

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Graph Theory » Coloring » Edge coloring

Petersen coloring conjecture ★★★

Author(s): Jaeger

Conjecture Let $G$ be a cubic graph with no bridge. Then there is a coloring of the edges of $G$ using the edges of the Petersen graph so that any three mutually adjacent edges of $G$ map to three mutually adjancent edges in the Petersen graph.

Keywords: cubic; edge-coloring; Petersen graph

Posted by mdevos
updated November 24th, 2011

2 comments

Graph Theory » Basic G.T. » Minors

Seagull problem ★★★

Author(s): Seymour

Conjecture Every $n$ vertex graph with no independent set of size $3$ has a complete graph on $\ge \frac{n}{2}$ vertices as a minor.

Keywords: coloring; complete graph; minor

Posted by mdevos
updated January 6th, 2008

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Algebra

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Algebra

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Topology

Several ways to apply a (multivalued) multiargument function to a family of filters ★★★

Author(s): Porton

Problem Let $\mathcal{X}$ be an indexed family of filters on sets. Which of the below items are always pairwise equal?

1. The funcoid corresponding to this function (considered as a single argument function on indexed families) applied to the reloidal product of filters $\mathcal{X}$ .

2. The funcoid corresponding to this function (considered as a single argument function on indexed families) applied to the starred reloidal product of filters $\mathcal{X}$ .

3. $\bigcap_{F\in\operatorname{up}^{\mathrm{FCD}}\prod^{\mathrm{Strd}}\mathcal{X}}\langle f \rangle F$ .

Keywords: funcoid; function; multifuncoid; staroid

Posted by porton
updated January 15th, 2020

2 comments

Algebra

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Algebra

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Graph Theory » Directed Graphs

Hoàng-Reed Conjecture ★★★

Author(s): Hoang; Reed

Conjecture Every digraph in which each vertex has outdegree at least $k$ contains $k$ directed cycles $C_1, \ldots, C_k$ such that $C_j$ meets $\cup_{i=1}^{j-1}C_i$ in at most one vertex, $2 \leq j \leq k$ .

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Posted by fhavet
updated March 11th, 2013

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Algebra

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Algebra

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Algebra

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Algebra

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Algebra

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Algebra

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Algebra

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Topology

Funcoidal products inside an inward reloid ★★

Author(s): Porton

Conjecture (solved) If $a \times^{\mathsf{\ensuremath{\operatorname{RLD}}}} b \subseteq \left( \mathsf{\ensuremath{\operatorname{RLD}}} \right)_{\ensuremath{\operatorname{in}}} f$ then $a \times^{\mathsf{\ensuremath{\operatorname{FCD}}}} b \subseteq f$ for every funcoid $f$ and atomic f.o. $a$ and $b$ on the source and destination of $f$ correspondingly.

A stronger conjecture:

Conjecture If $\mathcal{A} \times^{\mathsf{\ensuremath{\operatorname{RLD}}}} \mathcal{B} \subseteq \left( \mathsf{\ensuremath{\operatorname{RLD}}} \right)_{\ensuremath{\operatorname{in}}} f$ then $\mathcal{A} \times^{\mathsf{\ensuremath{\operatorname{FCD}}}} \mathcal{B} \subseteq f$ for every funcoid $f$ and $\mathcal{A} \in \mathfrak{F} \left( \ensuremath{\operatorname{Src}}f \right)$ , $\mathcal{B} \in \mathfrak{F} \left( \ensuremath{\operatorname{Dst}}f \right)$ .

Keywords: inward reloid

Posted by porton
updated January 1st, 2012

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Theoretical Comp. Sci. » Complexity

Discrete Logarithm Problem ★★★

Author(s):

If $p$ is prime and $g,h \in {\mathbb Z}_p^*$ , we write $\log_g(h) = n$ if $n \in {\mathbb Z}$ satisfies $g^n = h$ . The problem of finding such an integer $n$ for a given $g,h \in {\mathbb Z}^*_p$ (with $g \neq 1$ ) is the Discrete Log Problem.

Conjecture There does not exist a polynomial time algorithm to solve the Discrete Log Problem.

Keywords: discrete log; NP

Posted by cplxphil
updated February 25th, 2013

3 comments

Graph Theory » Coloring » Homomorphisms

Circular choosability of planar graphs ★

Author(s): Mohar

Let $G = (V, E)$ be a graph. If $p$ and $q$ are two integers, a $(p,q)$ -colouring of $G$ is a function $c$ from $V$ to $\{0,\dots,p-1\}$ such that $q \le |c(u)-c(v)| \le p-q$ for each edge $uv\in E$ . Given a list assignment $L$ of $G$ , i.e.~a mapping that assigns to every vertex $v$ a set of non-negative integers, an $L$ -colouring of $G$ is a mapping $c : V \to N$ such that $c(v)\in L(v)$ for every $v\in V$ . A list assignment $L$ is a $t$ - $(p,q)$ -list-assignment if $L(v) \subseteq \{0,\dots,p-1\}$ and $|L(v)| \ge tq$ for each vertex $v \in V$ . Given such a list assignment $L$ , the graph G is $(p,q)$ - $L$ -colourable if there exists a $(p,q)$ - $L$ -colouring $c$ , i.e. $c$ is both a $(p,q)$ -colouring and an $L$ -colouring. For any real number $t \ge 1$ , the graph $G$ is $t$ - $(p,q)$ -choosable if it is $(p,q)$ - $L$ -colourable for every $t$ - $(p,q)$ -list-assignment $L$ . Last, $G$ is circularly $t$ -choosable if it is $t$ - $(p,q)$ -choosable for any $p$ , $q$ . The circular choosability (or circular list chromatic number or circular choice number) of G is $cch(G) := \inf\{t \ge 1 : G \text{ is circularly $t$-choosable}\}.$

Problem What is the best upper bound on circular choosability for planar graphs?

Keywords: choosability; circular colouring; planar graphs

Posted by rosskang
updated August 23rd, 2012

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Graph Theory » Directed Graphs » Tournaments

Decomposing k-arc-strong tournament into k spanning strong digraphs ★★

Author(s): Bang-Jensen; Yeo

Conjecture Every k-arc-strong tournament decomposes into k spanning strong digraphs.

Keywords:

Posted by fhavet
updated March 15th, 2013

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Graph Theory » Coloring » Vertex coloring

Hedetniemi's Conjecture ★★★

Author(s): Hedetniemi

Conjecture If $G,H$ are simple finite graphs, then $\chi(G \times H) = \min \{ \chi(G), \chi(H) \}$ .

Here $G \times H$ is the tensor product (also called the direct or categorical product) of $G$ and $H$ .

Keywords: categorical product; coloring; homomorphism; tensor product

Posted by mdevos
updated March 1st, 2020

5 comments

Algebra

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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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Analysis

$C^r$ Stability Conjecture ★★★★

Author(s): Palis; Smale

Conjecture Any $C^r$ structurally stable diffeomorphism is hyperbolic.

Keywords: diffeomorphisms,; dynamical systems

Posted by m n
updated December 20th, 2007

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Graph Theory » Basic G.T. » Cycles

4-connected graphs are not uniquely hamiltonian ★★

Author(s): Fleischner

Conjecture Every $4$ -connected graph with a Hamilton cycle has a second Hamilton cycle.

Keywords:

Posted by fhavet
updated March 11th, 2013

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Algebra

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Algebra

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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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Algebra

Rendezvous on a line ★★

Author(s):

Rendezvous on a line

Keywords:

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Graph Theory » Topological G.T. » Crossing numbers

The Crossing Number of the Complete Graph ★★★

Author(s):

The crossing number $cr(G)$ of $G$ is the minimum number of crossings in all drawings of $G$ in the plane.

Conjecture $\displaystyle cr(K_n) = \frac 14 \floor{\frac n2} \floor{\frac{n-1}2} \floor{\frac{n-2}2} \floor{\frac{n-3}2}$

Keywords: complete graph; crossing number

Posted by Robert Samal
updated July 28th, 2008

3 comments

Algebra

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Graph Theory » Directed Graphs

Directed path of length twice the minimum outdegree ★★★

Author(s): Thomassé

Conjecture Every oriented graph with minimum outdegree $k$ contains a directed path of length $2k$ .

Keywords:

Posted by fhavet
updated February 28th, 2013

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Theoretical Comp. Sci. » Complexity

Subset-sums equality (pigeonhole version) ★★★

Author(s):

Problem Let $a_1,a_2,\ldots,a_n$ be natural numbers with $\sum_{i=1}^n a_i < 2^n - 1$ . It follows from the pigeon-hole principle that there exist distinct subsets $I,J \subseteq \{1,\ldots,n\}$ with $\sum_{i \in I} a_i = \sum_{j \in J} a_j$ . Is it possible to find such a pair $I,J$ in polynomial time?