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random r-regular graph is a graph selected from G n , r {\displaystyle {\mathcal {G}}_{n,r}} , which denotes the probability space of all r-regular graphs
Random_regular_graph
Graph generated by a random process
In mathematics, random graph is the general term to refer to probability distributions over graphs. Random graphs may be described simply by a probability
Random_graph
Graph where each vertex has the same number of neighbors
In graph theory, a regular graph is a graph where each vertex has the same number of neighbors; i.e. every vertex has the same degree or valency. A regular
Regular_graph
Spectral graph theory concept
spectral graph theory, a Ramanujan graph is a regular graph whose spectral gap is almost as large as possible (see extremal graph theory). Such graphs are
Ramanujan_graph
Sparse graph with strong connectivity
random d-regular graph. The approximation is better the smaller λ is. In a random d-regular graph, as well as in an Erdős–Rényi random graph with edge probability
Expander_graph
Area of discrete mathematics
between parts are ε {\displaystyle \varepsilon } -regular. The theory of random graph focuses on graphs using probabilistic method. The subarea was founded
Graph_theory
Graph of numbers differing by a square
would in random graphs. The Paley graph of order 9 is a locally linear graph, a rook's graph, and the graph of the 3-3 duoprism. The Paley graph of order
Paley_graph
Graph with all vertices of degree 3
of graph theory, a cubic graph is a graph in which all vertices have degree three. In other words, a cubic graph is a 3-regular graph. Cubic graphs are
Cubic_graph
Decomposition of a graph into hamiltonion cycles
decomposition to exist in an undirected graph, the graph must be connected and regular of even degree. A directed graph with such a decomposition must be strongly
Hamiltonian_decomposition
Matrix representation of a graph
In the mathematical field of graph theory, the Laplacian matrix, also called the graph Laplacian, admittance matrix, Kirchhoff matrix, or discrete Laplacian
Laplacian_matrix
Influence of local substructure of a graph on global properties
{\displaystyle t(H,G)} of a graph H {\displaystyle H} in a graph G {\displaystyle G} describes the probability that a randomly chosen map from the vertex
Extremal_graph_theory
Topics referred to by the same term
Regular graph, a graph such that all the degrees of the vertices are equal Szemerédi regularity lemma, some random behaviors in large graphs Regular language
Regular
Mixing property of Markov chains and graphs
of a directed graph, in which case it can be used to analyze how quickly random walks in the graph converge. The conductance of a graph is closely related
Conductance_(graph_theory)
Linear algebra aspects of graph theory
In mathematics, spectral graph theory is the study of the properties of a graph in relationship to the characteristic polynomial, eigenvalues, and eigenvectors
Spectral_graph_theory
Undirected graph with no non-trivial symmetries
non-trivial graphs have 6 vertices. The smallest asymmetric regular graphs have ten vertices; there exist 10-vertex asymmetric graphs that are 4-regular and 5-regular
Asymmetric_graph
Graph defined from a mathematical group
In mathematics, a Cayley graph, also known as a Cayley color graph, Cayley diagram, group diagram, or color group, is a graph that encodes the abstract
Cayley_graph
Graph representing edges of another graph
In the mathematical discipline of graph theory, the line graph of an undirected graph G is another graph L(G) that represents the adjacencies between edges
Line_graph
Process forming a path from many random steps
certain contexts random walk is sometimes known as a drunkard's walk. A popular random walk model is that of a random walk on a regular lattice, where at
Random_walk
Logical formulation of graph properties
important classes of graphs. Other topics of research in the logic of graphs include investigations of the probability that a random graph has a property specified
Logic_of_graphs
Method of generating random small-world graphs
The Watts–Strogatz model is a random graph generation model that produces graphs with small-world properties, including short average path lengths and
Watts–Strogatz_model
Automated methods for the creation of mazes
the maze generation steps for a graph that is not on a rectangular grid. First, the computer creates a random planar graph G shown in blue, and its dual
Maze_generation_algorithm
Graph obeys some properties of random graphs
In graph theory, a graph is said to be a pseudorandom graph if it obeys certain properties that random graphs obey with high probability. There is no concrete
Pseudorandom_graph
Appendix:Glossary of graph theory in Wiktionary, the free dictionary. This is a glossary of graph theory. Graph theory is the study of graphs, systems of nodes
Glossary_of_graph_theory
Network with non-trivial topological features
network is a graph (network) with non-trivial topological features—features that do not occur in simple networks such as lattices or random graphs but often
Complex_network
Time to reach all states of a Markov chain
It is a random variable that depends on the Markov chain and the choice of the starting state. The cover time of a connected undirected graph is the cover
Cover_time
Petersen graph Planar graph Dual polyhedron Outerplanar graph Random graph Regular graph Scale-free network Snark (graph theory) Sparse graph Sparse graph code
List_of_graph_theory_topics
Unsolved problem in computational complexity theory
bipartite Eulerian graphs bipartite regular graphs line graphs split graphs chordal graphs regular self-complementary graphs polytopal graphs of general, simple
Graph_isomorphism_problem
Graph partition into regular subgraphs
between parts are regular (in the sense defined below). The lemma shows that certain properties of random graphs can be applied to dense graphs like counting
Szemerédi_regularity_lemma
Measurement of graph sparsity
In graph theory, a k-degenerate graph is an undirected graph in which every subgraph has at least one vertex of degree at most k {\displaystyle k} . That
Degeneracy_(graph_theory)
Computer science algorithm
computer science, graph traversal (also known as graph search) refers to the process of visiting (checking and/or updating) each vertex in a graph. Such traversals
Graph_traversal
Topic in algebraic graph theory
{\displaystyle t} . A graph is periodic if and only if its (non-zero) eigenvalues are all rational multiples of each other. Moreover, a regular graph is periodic
Continuous-time_quantum_walk
Graph that can be embedded in the plane
In graph theory, a planar graph is a graph that can be embedded in the plane, i.e., it can be drawn on the plane in such a way that its edges intersect
Planar_graph
close to the expected number of edges between them in a random d {\displaystyle d} -regular graph, namely d n | S | | T | {\displaystyle {\frac {d}{n}}|S||T|}
Expander_mixing_lemma
Graph which is isomorphic to its complement
All strongly regular self-complementary graphs with fewer than 37 vertices are Paley graphs; however, there are strongly regular graphs on 37, 41, and
Self-complementary_graph
phs (L:B) Percolation threshold / phs Random geometric graph Random regular graph Watts and Strogatz model Random matrix Circular ensemble Gaussian matrix
Catalog of articles in probability theory
Catalog_of_articles_in_probability_theory
Methodic assignment of colors to elements of a graph
In graph theory, graph coloring is a methodic assignment of labels traditionally called "colors" to elements of a graph. The assignment is subject to certain
Graph_coloring
Gewirtz graph is a strongly regular graph with 56 vertices and valency 10. It is named after the mathematician Allan Gewirtz, who described the graph in his
Gewirtz_graph
Network whose degree distribution follows a power law
scale-free. Random graph – Graph generated by a random process Erdős–Rényi model – Two closely related models for generating random graphs Non-linear preferential
Scale-free_network
Length of a shortest cycle contained in the graph
In graph theory, the girth of an undirected graph is the length of a shortest cycle contained in the graph. If the graph does not contain any cycles (that
Girth_(graph_theory)
mathematics, the concept of graph dynamical systems can be used to capture a wide range of processes taking place on graphs or networks. A major theme
Graph_dynamical_system
Graph without triples of adjacent vertices
area of graph theory, a triangle-free graph is an undirected graph in which no three vertices form a triangle of edges. Triangle-free graphs may be equivalently
Triangle-free_graph
Graph where every edge is in one triangle
Examples of locally linear graphs include the triangular cactus graphs, the line graphs of 3-regular triangle-free graphs, and the Cartesian products
Locally_linear_graph
Assignment of colors to edges of a graph
In graph theory, a proper edge coloring of a graph is an assignment of "colors" to the edges of the graph so that no two incident edges have the same color
Edge_coloring
Graph related to another graph by a covering map
In the mathematical discipline of graph theory, a graph C is a covering graph of another graph G if there is a covering map from the vertex set of C to
Covering_graph
statistics Random regular graph Random sample Random sampling Random sequence Random variable Random variate Random walk Random walk hypothesis Randomization Randomized
List_of_statistics_articles
Class of graphs
In graph theory, a forcing graph is one whose density determines whether a graph sequence is quasi-random. The term was first coined by Chung, Graham,
Forcing_graph
Type of computer science algorithm
a randomized algorithm. For example, if one wishes to know if two vertices in a graph of n vertices are in the same connected component of the graph, there
In-place_algorithm
Theorem in graph theory
Intuitively, a regular pair ( X , Y ) {\displaystyle (X,Y)} with density d {\displaystyle d} should behave like a random Erdős–Rényi-like graph, where every
Graph_removal_lemma
Mathematical theory on behavior of connected clusters in a random graph
since then. In a slightly different mathematical model for obtaining a random graph, a site is "occupied" with probability p or "empty" (in which case its
Percolation_theory
-minor-free graph is an apex graph Does a Moore graph with girth 5 and degree 57 exist? Do there exist infinitely many strongly regular geodetic graphs, or any
List of unsolved problems in mathematics
List_of_unsolved_problems_in_mathematics
Unrelated vertices in graphs
In graph theory, an independent set, stable set, coclique or anticlique is a set of vertices in a graph, no two of which are adjacent. That is, it is a
Independent set (graph theory)
Independent_set_(graph_theory)
Generalization of graph theory
hypergraph is a generalization of a graph in which an edge can join any number of vertices. In contrast, in an ordinary graph, an edge connects exactly two
Hypergraph
Study of graphs defined by geometric means
Geometric graph theory in the broader sense is a large and amorphous subfield of graph theory, concerned with graphs defined by geometric means. In a stricter
Geometric_graph_theory
Trees with additional directed half edges
embedding of a planar graph. Blossom trees can be used to sample random planar graphs. A blossom tree is constructed from a rooted tree embedded in the
Blossom_tree_(graph_theory)
On coloring the edges of graphs
showed that almost all graphs are of class one. That is, in the Erdős–Rényi model of random graphs, in which all n-vertex graphs are equally likely, let
Vizing's_theorem
Type of biased random walk on a graph
A maximal entropy random walk (MERW) is a popular type of biased random walk on a graph, in which transition probabilities are chosen accordingly to the
Maximal_entropy_random_walk
Type of crystal structure
involves the removal of some of the edges from a three-dimensional grid graph. In this coordinatization, which has a distorted geometry from the standard
Diamond_cubic
Theoretical computer scientist
Wormald, N. (1996). Generating and counting Hamilton cycles in random regular graphs. Journal of Algorithms, 21, 176–198. Mark Jerrum home page at Queen
Mark_Jerrum
Least-weight tree connecting graph vertices
tree is a subset of the edges of a connected, edge-weighted undirected graph that connects all the vertices together, without any cycles and with the
Minimum_spanning_tree
Graph formed by subdivision of triangles
planar 3-trees, the maximal planar chordal graphs, the uniquely 4-colorable planar graphs, and the graphs of stacked polytopes. They are named after Apollonius
Apollonian_network
Natural number
included. Seventeen is the minimum number of vertices on a two-dimensional graph such that, if the edges are colored with three different colors, there is
17_(number)
Quantum algorithm
marked node in a graph. The concept of a quantum walk is inspired by classical random walks, in which a walker moves randomly through a graph or lattice. In
Quantum_walk_search
Geometrical structure
of the volume. A random packing of equal spheres generally has a density around 63.5%. A lattice arrangement (commonly called a regular arrangement) is
Sphere_packing
Text-structure representation using graph models
graphs Applications of label propagation algorithms, etc. New graph-based methods for NLP applications Random walk methods in graphs Spectral graph clustering
Text_graph
Australian mathematician
Mathematicians in Rio de Janeiro. Nicholas C. Wormald (1999). "Models of random regular graphs" (PDF). London Mathematical Society Lecture Note Series. Cambridge
Nick_Wormald
Threshold of percolation theory models
worlds it generally refers to simplified lattice models of random systems or networks (graphs), and the nature of the connectivity in them. The percolation
Percolation_threshold
Finite-state machine
Shi; Devroye, Luc (October 2017). "The graph structure of a deterministic automaton chosen at random". Random Structures & Algorithms. 51 (3): 428–458
Deterministic finite automaton
Deterministic_finite_automaton
Basic method for pseudo-random number sampling
transform) is a basic method for pseudo-random number sampling, i.e., for generating sample numbers at random from any probability distribution given
Inverse_transform_sampling
Shortest network connecting points
From these graphs, the minimum spanning tree itself may be constructed in linear time, by using a randomized linear time algorithm for graph minimum spanning
Euclidean minimum spanning tree
Euclidean_minimum_spanning_tree
Conjecture in graph theory
problem in mathematics Are graphs uniquely determined by their subgraphs? More unsolved problems in mathematics In graph theory, informally, the reconstruction
Reconstruction_conjecture
Problem in network theory
statistics, generative random graph models such as stochastic block models propose an approach to generate links between nodes in a random graph. For social networks
Link_prediction
Algebraic encoding of graph connectivity
is a graph polynomial. It is a polynomial in two variables which plays an important role in graph theory. It is defined for every undirected graph G {\displaystyle
Tutte_polynomial
Experiments examining the average path length for social networks
random graph Personal network – Set of human contacts known to an individual Random walk – Process forming a path from many random steps Random graph –
Small-world_experiment
Undirected graph with 11 nodes and 27 edges
In the mathematical field of graph theory, the Goldner–Harary graph is a simple undirected graph with 11 vertices and 27 edges. It is named after Anita
Goldner–Harary_graph
Unsolved problem in the mathematics of graph coloring
) {\displaystyle (d+2)} -colorings of a d {\displaystyle d} -degenerate graph be transformed into each other by quadratically many steps that change the
Cereceda's_conjecture
Binary operation in graph theory
In graph theory, the zig-zag product of regular graphs G , H {\displaystyle G,H} , denoted by G ∘ H {\displaystyle G\circ H} , is a binary operation which
Zig-zag_product
Graph without four-vertex star subgraphs
In graph theory, an area of mathematics, a claw-free graph is a graph that does not have a claw as an induced subgraph. A claw is another name for the
Claw-free_graph
Type of graph in mathematics
subsets are regular (the edges connecting the pair behave in certain ways like a random graph of some particular density). If the half graph is partitioned
Half_graph
Important lemma in extremal graph theory
important result in extremal graph theory, particularly within the context of the regularity method. It states that the regular pairs in the statement of
Blow-up_lemma
game Acyclic pebble game One-player pebble game Token on acyclic directed graph games: Quantified boolean formulas First-order logic of equality Provability
List of PSPACE-complete problems
List_of_PSPACE-complete_problems
Type of matrix in algebraic graph theory
In the mathematical field of algebraic graph theory, the degree matrix of an undirected graph is a diagonal matrix which contains information about the
Degree_matrix
Second-largest eigenvalue lower bound
eigenvalue of the adjacency matrix of a d {\displaystyle d} -regular graph, meaning a graph in which every vertex has degree d {\displaystyle d} . The reason
Alon–Boppana_bound
Family of random graph models
In network science, the Configuration Model is a family of random graph models designed to generate networks from a given degree sequence. Unlike simpler
Configuration_model
Complexity class (logarithmic space)
whether there exists a path between two vertices in a given undirected graph, is in L, showing that L = SL, since USTCON is SL-complete. One consequence
L_(complexity)
Type of random mathematical object
Poisson random measure, Poisson random point field and Poisson point field) is a type of mathematical object that consists of points randomly located
Poisson_point_process
Branch of discrete mathematics
property for a random discrete object, such as a random graph? For instance, what is the average number of triangles in a random graph? Probabilistic
Combinatorics
algorithm for constructing maximum-cardinality matching on graphs. Coloring algorithm: algorithms for graph (vertex or edge) coloring (subject to constraints,
List_of_algorithms
dimension of a complex network or graph. For example, metric dimension is defined in terms of the resolving set for a graph. Dimension has also been defined
Complex_network_zeta_function
Social structure made up of a set of social actors
the addition of autonomous agents to the groups. Randomly distributed networks: Exponential random graph models of social networks became state-of-the-art
Social_network
Statement in mathematical combinatorics
its graph-theoretic forms, states that one will find monochromatic cliques in any edge labelling (with colours) of a sufficiently large complete graph. As
Ramsey's_theorem
imply independent Pairwise independence of random variables need not imply mutual independence. Petersen graph Sierpinski space Simple example of Azuma's
List_of_mathematical_examples
Regular infinite tree structure used in statistical mechanics
introduced into the physics literature by Hans Bethe in 1935. In such a graph, each node is connected to z neighbors; the number z is called either the
Bethe_lattice
Polytope
equivalent results in the languages of projective configurations and of regular bipartite graph matchings, respectively, were shown much earlier in 1894 in Ernst
Birkhoff_polytope
Unsolved problem on graph query complexity
{n}{2}}=n(n-1)/2} tests are needed for a graph with n {\displaystyle n} vertices. Versions of the problem for randomized algorithms and quantum algorithms have
Aanderaa–Karp–Rosenberg conjecture
Aanderaa–Karp–Rosenberg_conjecture
Mathematical graph theorem
mathematical discipline of graph theory, Petersen's theorem, named after Julius Petersen, is one of the earliest results in graph theory and can be stated
Petersen's_theorem
Type of discrete calculus
mathematics, calculus on finite weighted graphs is a discrete calculus for functions whose domain is the vertex set of a graph with a finite number of vertices
Calculus on finite weighted graphs
Calculus_on_finite_weighted_graphs
Network that allows computers to share resources and communicate with each other
themselves, such as the technical exploitation of clients, poor quality random number generators, or key escrow. E2EE also does not address traffic analysis
Computer_network
Branch of geometry that studies combinatorial properties and constructive methods
polytope, unit disk graphs, and visibility graphs. Topics in this area include: Graph drawing Polyhedral graphs Random geometric graphs Voronoi diagrams
Discrete_geometry
similarity of their ties to a member of the set "mother"). In the graph there are three regular equivalence classes. The first is actor A; the second is composed
Similarity_(network_science)
2003 mathematics text
of sorting networks, and the derandomization of randomized algorithms. For these applications, the graph must be constructed explicitly, rather than merely
Elementary Number Theory, Group Theory and Ramanujan Graphs
Elementary_Number_Theory,_Group_Theory_and_Ramanujan_Graphs
RANDOM REGULAR-GRAPH
RANDOM REGULAR-GRAPH
Surname or Lastname
English
English : variant of Ransom.
Surname or Lastname
English
English : variant of Brandon.
Male
Hungarian
 Variant spelling of Hungarian András, ANDOR means "man; warrior." Compare with another form of Andor.
Surname or Lastname
English
English : variant of Rand 1, from the Old French oblique case.
Male
Norwegian
 Norwegian form of Old Norse Arnþórr, ANDOR means "eagle of Thor." Compare with another form of Andor.
Surname or Lastname
English
English : unexplained; perhaps a variant of Francom.
Surname or Lastname
English
English : patronymic from Rand 1.
Surname or Lastname
English
English : probably a variant of Crandon, a habitational name from Crandon in Somerset or Crandean in Falmer, Sussex. Compare Grandin.
Boy/Male
English American
Son of Rand.
Female
English
Variant spelling of English Randy, RANDI means "worthy of admiration."
Female
English
Short form of English Miranda, RANDA means "worthy of admiration."Â
Male
English
Pet form of English Randall and Randolph, both RANDY means "shield-wolf." Compare with feminine Randy.
Male
English
Medieval form of English Randolf, RANDAL means "shield-wolf."
Boy/Male
English
Son of Rand.
Surname or Lastname
Hungarian (Lándor)
Hungarian (Lándor) : from the old secular personal name Lándor.English : possibly a variant spelling of Lander.
Male
Scandinavian
 Scandinavian form of Old Norse Randolfr, RANDOLF means "shield-wolf." Compare with another form of Randolf.
Surname or Lastname
English
English : variant spelling of Randall.Americanized spelling of Randel.
Surname or Lastname
English (chiefly East Anglia)
English (chiefly East Anglia) : patronymic from the Middle English personal name Rand(e) (see Rand 1).
Male
English
 Variant spelling of Middle English Randulf, RANDOLF means "shield-wolf." Compare with other forms of Randolf.
Boy/Male
Hindu, Indian, Tamil
Regular Winner
RANDOM REGULAR-GRAPH
RANDOM REGULAR-GRAPH
Boy/Male
Muslim
The loving
Boy/Male
German Teutonic
Victorious.
Girl/Female
Arabic
Loves her Husband
Boy/Male
Bengali, Hindu, Indian, Kannada, Marathi, Telugu
Youngest
Female
English
Variant spelling of English Roxie, ROXY means "dawn."
Boy/Male
African, Arabic, Australian, French, German, Muslim, Teutonic
Precious; Nobel
Girl/Female
Muslim
Guiding light lighthouse
Boy/Male
Hindu
Surname or Lastname
English
English : occupational name for a blacksmith (see Ferrier).
Boy/Male
Hindu
RANDOM REGULAR-GRAPH
RANDOM REGULAR-GRAPH
RANDOM REGULAR-GRAPH
RANDOM REGULAR-GRAPH
RANDOM REGULAR-GRAPH
a.
Not regular; not bound by monastic vows or rules; not confined to a monastery, or subject to the rules of a religious community; as, a secular priest.
n.
Random.
a.
Thorough; complete; unmitigated; as, a regular humbug.
a.
Governed by rule or rules; steady or uniform in course, practice, or occurence; not subject to unexplained or irrational variation; returning at stated intervals; steadily pursued; orderlly; methodical; as, the regular succession of day and night; regular habits.
a.
Belonging to a monastic order or community; as, regular clergy, in distinction dfrom the secular clergy.
n.
The release of a captive, or of captured property, by payment of a consideration; redemption; as, prisoners hopeless of ransom.
n.
Distance to which a missile is cast; range; reach; as, the random of a rifle ball.
pl.
of Tegula
n.
One who is not regular; especially, a soldier not in regular service.
a.
Going at random or by chance; done or made at hazard, or without settled direction, aim, or purpose; hazarded without previous calculation; left to chance; haphazard; as, a random guess.
n.
A roving motion; course without definite direction; want of direction, rule, or method; hazard; chance; -- commonly used in the phrase at random, that is, without a settled point of direction; at hazard.
a.
Having all the parts of the same kind alike in size and shape; as, a regular flower; a regular sea urchin.
adv.
In a random manner.
v. i.
To go or stray at random.
n.
To exact a ransom for, or a payment on.
a.
Constituted, selected, or conducted in conformity with established usages, rules, or discipline; duly authorized; permanently organized; as, a regular meeting; a regular physican; a regular nomination; regular troops.
a.
Not regular; not conforming to a law, method, or usage recognized as the general rule; not according to common form; not conformable to nature, to the rules of moral rectitude, or to established principles; not normal; unnatural; immethodical; unsymmetrical; erratic; no straight; not uniform; as, an irregular line; an irregular figure; an irregular verse; an irregular physician; an irregular proceeding; irregular motion; irregular conduct, etc. Cf. Regular.
a.
Conformed to a rule; agreeable to an established rule, law, principle, or type, or to established customary forms; normal; symmetrical; as, a regular verse in poetry; a regular piece of music; a regular verb; regular practice of law or medicine; a regular building.
pl.
of Regulus