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{{for|'''the''' random graph|Rado graph}}
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{{Network Science}}
 
In [[mathematics]], '''random graph''' is the general term to refer to probability distributions over [[Graph (mathematics)|graphs]].  Random graphs may be described simply by a probability distribution, or by a [[random process]] which generates them.<ref name = "Random Graphs">[[Béla Bollobás]], ''Random Graphs'', 2nd Edition, 2001, Cambridge University Press</ref> The theory of random graphs lies at the intersection between [[graph theory]] and [[probability theory]].  From a mathematical perspective, random graphs are used to answer questions about the properties of ''typical'' graphs.  Its practical applications are found all areas in which [[complex network]]s need to be modeled&nbsp;– a large number of random graph models are thus known, mirroring the diverse types of complex networks encountered in different areas. In a mathematical context, ''random graph'' refers almost exclusively to the [[Erdős–Rényi model|Erdős–Rényi random graph model]].  In other contexts, any graph model may be referred to as a ''random graph''.
 
== Random graph models ==
A random graph is obtained by starting with a set of ''n'' isolated vertices and adding successive edges between them at random. The aim of the study in this field is to determine at what stage a particular property of the graph is likely to arise.<ref name = "Random Graphs2">[[Béla Bollobás]], ''Random Graphs'', 1985, Academic Press Inc., London Ltd.</ref> Different '''random graph models''' produce different [[probability distribution]]s on graphs. Most commonly studied is the one proposed by [[Edgar Gilbert]], denoted ''G''(''n'',''p''), in which every possible edge occurs independently with probability 0 < ''p'' < 1. The probability of a random graph with ''m'' edges is ''p<sup>m</sup>''(1−''p'')<sup>''N''−''m''</sup>.<ref name = "Random Graphs3">[[Béla Bollobás]], ''Probabilistic Combinatorics and Its Applications'', 1991, Providence, RI: American Mathematical Society.</ref> A closely related model, the [[Erdős–Rényi model]] denoted ''G''(''n'',''M''), assigns equal probability to all graphs with exactly ''M'' edges. With the notation <math>N = \begin{bmatrix} n\\2 \end{bmatrix},</math> with 0 ≤ ''M'' ≤ ''N'', ''G''(''n'',''p'') has <math>\begin{bmatrix} N\\M \end{bmatrix}</math> elements and every element occurs with probability <math>\begin{bmatrix} N \\ M \\ \end{bmatrix}^{-1}.</math><ref name = "Random Graphs2" /> The latter model can be viewed as a snapshot at a particular time (''M'') of the '''random graph process''' <math>\tilde{G}_n</math>, which is a [[stochastic process]] that starts with ''n'' vertices and no edges, and at each step adds one new edge chosen uniformly from the set of missing edges.
 
If instead we start with an infinite set of vertices, and again let every possible edge occur independently with probability 0 < ''p'' < 1, then we get an object ''G'' called an '''infinite random graph'''. Except in the trivial cases when ''p'' is 0 or 1, such a ''G'' [[almost surely]] has the following property:
 
<blockquote>Given any ''n'' + ''m'' elements <math>a_1,\ldots, a_n,b_1,\ldots, b_m \in V</math>, there is a vertex ''c'' in ''V'' that is adjacent to each of <math>a_1,\ldots, a_n</math> and is not adjacent to any of <math>b_1,\ldots, b_m</math>.</blockquote>
 
It turns out that if the vertex set is [[countable]] then there is, [[up to]] [[graph isomorphism|isomorphism]], only a single graph with this property, namely the [[Rado graph]]. Thus any countably infinite random graph is almost surely the Rado graph, which for this reason is sometimes called simply the '''random graph'''. However, the analogous result is not true for uncountable graphs, of which there are many (nonisomorphic) graphs satisfying the above property.
 
Another model, which generalizes Gilbert's random graph model, is the '''random dot-product model'''. A random dot-product graph associates with each vertex a [[real vector]].  The probability of an edge ''uv'' between any vertices ''u'' and ''v'' is some function of the [[dot product]] '''u''' • '''v''' of their respective vectors.
 
The [[network probability matrix]] models random graphs through edge probabilities, which represent the probability <math>p_{i,j}</math> that a given edge <math>e_{i,j}</math> exists for a specified time period. This model is extensible to directed and undirected; weighted and unweighted; and static or dynamic graphs.
 
For ''M'' ≃ ''pN'', where ''N'' is the maximal number of edges possible, the two most widely used models, ''G''(''n'',''M'') and ''G''(''n'',''p''), are almost interchangeable.<ref name ="Handbook ">[[Béla Bollobás|Bollobas, B.]] and Riordan, O.M. "Mathematical results on scale-free random graphs" in "Handbook of Graphs and Networks" (S. Bornholdt and H.G. Schuster (eds)), Wiley VCH, Weinheim, 1st ed., 2003</ref>
 
[[Random regular graph]]s form a special case, with properties that may differ from random graphs in general.
 
Once we have a model of random graphs, every function on graphs, becomes a [[random variable]]. The study of this model is to determine, or at least estimate the probability a property may occur.<ref name = "Random Graphs3" />
 
==Terminology==
The term 'almost every' in the context of random graphs refers to a sequence of spaces and probabilities, such that the ''error probabilities'' tend to zero.<ref name = "Random Graphs3" />
 
==Properties of random graphs==
The theory of random graphs studies typical properties of random graphs, those that hold with high probability for graphs drawn from a particular distribution.  For example, we might ask for a given value of ''n'' and ''p'' what the probability is that ''G''(''n'',''p'') is [[Connection (mathematics)|connected]].  In studying such questions, researchers often concentrate on the asymptotic behavior of random graphs&mdash;the values that various probabilities converge to as ''n'' grows very large. [[Percolation theory]] characterizes the connectedness of random graphs, especially infinitely large ones.
 
Percolation is related to the robustness of the graph (called also network). Given a random graph of n nodes and an average degree <math>\langle k\rangle</math>. Next we remove randomly a fraction 1−''p'' of nodes and leave only a fraction ''p''. There exists a critical percolation threshold <math>p_c=\tfrac{1}{\langle k\rangle}</math> below which the network becomes fragmented while above ''p<sub>c</sub>'' a giant connected component exists.<ref name = "Random Graphs" /><ref name = "Random graphs" /><ref name ="Handbook " /><ref>{{cite book  |title=Networks: An Introduction |last= Newman |first=M. E. J. |year= 2010 |publisher= Oxford}}</ref>
<ref>{{cite book |title= Complex Networks: Structure, Robustness and Function |authors= Reuven Cohen and [[Shlomo Havlin]] |year= 2010 |url= http://havlin.biu.ac.il/Shlomo%20Havlin%20books_com_net.php |publisher= Cambridge University Press}}</ref><ref name ="On Random Graphs" />
 
''(threshold functions, evolution of G~)''
 
Random graphs are widely used in the [[probabilistic method]], where one tries to prove the existence of graphs with certain properties. The existence of a property on a random graph can often imply, via the [[Szemerédi regularity lemma]], the existence of that property on almost all graphs.
 
In [[random regular graph]]s, ''G''(''n'',''r''-reg) are the set of ''r''-regular graphs with ''r'' = ''r''(''n'') such that ''n'' and ''m'' are the natural numbers, 3 ≤ ''r'' < ''n'', and ''rn'' = 2''m'' is even.<ref name = "Random Graphs2" />
 
The degree sequene of a graph ''G'' in ''G<sup>n</sup>'' depends only on the number of edges in the sets<ref name = "Random Graphs2" />
:<math>V_n^{(2)} = \left \{ij \ : \ 1 \leq j \leq n, i \neq j \right \} \subset V^{(2)}, \qquad  i=1, \cdots, n.</math>
 
If edges, ''M'' in a random graph, ''G<sub>M</sub>'' is large enough to ensure that almost every ''G<sub>M</sub>'' has minimum degree at least 1, then almost every ''G<sub>M</sub>'' is connected and, if ''n'' is even, almost every ''G<sub>M</sub>'' has a perfect matching. In particular, the moment the last isolated vertex vanishes in almost every random graph, the graph becomes connected.<ref name = "Random Graphs2" />
 
Almost every graph process on an even number of vertices with the edge raising the minimum degree to 1 or a random graph with slightly more than (''n''/4)log(''n'') edges and with probability close to 1 ensures that the graph has a complete matching, with exception of at most one vertex.
 
For some constant ''c'', almost every labelled graph with ''n'' vertices and at least ''cn''log(''n'') edges is [[Hamiltonian cycle|Hamiltonian]]. With the probability tending to 1, the particular edge that increases the minimum degree to 2 makes the graph Hamiltonian.
 
== Coloring of Random Graphs ==
Given a random graph ''G'' of order ''n'' with the vertex ''V''(''G'') = {1, ..., ''n''}, by the [[greedy algorithm]] on the number of colors, the vertices can be colored with colors 1, 2, ... (vertex 1 is colored 1, vertex 2 is colored 1 if it is not adjacent to vertex 1, otherwise it is colored 2, etc).<ref name = "Random Graphs2" />
 
== Random trees ==
{{main|random tree}}
A [[random tree]] is a [[tree (graph theory)|tree]] or [[Arborescence (graph theory)|arborescence]] that is formed by a [[stochastic process]]. In a large range of random graphs of order ''n'' and size ''M''(''n'') the distribution of the number of tree components of order ''k'' is asymptotically [[Siméon Denis Poisson|Poisson]]. Types of random trees include [[uniform spanning tree]], [[random minimal spanning tree]], [[random binary tree]], [[treap]], [[rapidly exploring random tree]], [[Brownian tree]], and [[random forest]].
 
==History==
Random graphs were first defined by [[Paul Erd&#337;s]] and [[Alfréd Rényi]] in their 1959 paper "On Random Graphs"<ref name ="On Random Graphs">[[Paul Erd&#337;s|Erdős, P.]] [[Alfréd Rényi|Rényi, A]] (1959) "On Random Graphs I" in Publ. Math. Debrecen 6, p.&nbsp;290&ndash;297 [http://www.renyi.hu/~p_erdos/1959-11.pdf]</ref> and independently by Gilbert in his paper "Random graphs".<ref name = "Random graphs">{{citation |last= Gilbert |first= E. N. |authorlink=Edgar Gilbert|year=1959 |title=Random graphs |journal=Annals of Mathematical Statistics |volume= 30|pages=1141–1144|doi=10.1214/aoms/1177706098 }}.</ref>
 
==See also==
* [[Bose–Einstein condensation: a network theory approach]]
* [[Cavity method]]
* [[Complex networks]]
* [[Erdős–Rényi model]]
* [[Exponential random graph model]]
* [[Graph theory]]
* [[Network science]]
* [[Percolation]]
* [[Semilinear response]]
 
==References==
{{reflist}}
 
{{Stochastic processes}}
 
{{DEFAULTSORT:Random Graph}}
[[Category:Graph theory]]
[[Category:Random graphs|*]]
 
[[nl:Complexe netwerken#Random netwerken]]

Latest revision as of 18:44, 30 December 2014

When it comes to web hosting leaders, HostGator is clearly a top tier choice. We easily admit here at Internet Host Mentor, that HostGator ranks as a leading favorite within our group. Now HostGator didn't pay us to say that.
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In order to earn the count on of customers it is crucial that you develop trustworthy hosting services, otherwise your business will tumble. Similar to the various other hosting services we suggest, HostGator has a cutting-edge data center with backup power generators and all of the techno goodies to make her hum. They flaunt a 99.9 % uptime record. HostGator likewise went an action further and introduced a Gigabit Uplink with a Guaranteed 20mbit connection. This guarantees that there will be no failures in any network. HostGator has actually also implemented a number of layers of network safety guaranteeing the wellness of all your info. We can go on and on about their technology, but its reasonable to state that all the 5 hosting services that met our requirements, stand out in this location. Together with impressive consumer support, the reliability of the innovation is a green charge to even being considered for this evaluation.

Rate

In in our book, when it concerns webhosting, rate is a huge offer. It is one of the crucial differentiators. Consumers like to know their hosting platform is trustworthy and has lots of attributes and exceptional client support, but they do not desire to pay an arm and a leg. In our opinion, to be successful in this extremely competitive field, you finest offer to your clients an attractive value proposition. Regrettably, that is not always the case. A few of the hosting business struggle with efficiently juggling reliability, services/tools, client relations, and cost. HostGator is most likely the closest thing that you will find to pulling the rabbit out of the hat. For simply $4.95 a month they offer a long list of functions, devices, and services. Each hosting account comes geared up with well over 4,500 website templates. HostGator is also populared for the outstanding limitless diskspace and bandwidth they provide. They provide an extremely flexible and individual friendly control panel, endless sub domains, FTP accounts, and email accounts and simply a laundry list of various other attributes. Go have a look for yourself. Not to mention the $50 free in Goggle AdWords credit. Let me beware right here so as not to let bias creep into my review. These guys offer a really robust value proposal when comparing every little thing that is important to the webmaster. That is the conservative method of explaining it.

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One of the reasons HostGator has been so successful is the reality that they offer quality client service. I know, it seems like a busted record, however it is what it is. All 5 of our advised internet hosts excel in this location and they better as we consider this one of the testimonial differentiators. HostGator provides honor winning support 24/7/365. They provide a 45 day cash back guarantee. The gator crew can be reached via email, phone or live chat. For more info in regards to Hostgator 1 cent coupon take a look at our own web-page. They want to address any problem that may trouble you. Because a some of our web designers have an extensive body of experience with HostGator, we can talk to how excellent the customer support has actually been when we should reach out. They don't dissatisfy. HostGator's aim it to solve any web hosting problem you have and offer suggestions that can conserve you a great deal of money and time. They likewise provide over 500+ Video Tutorials and 680+ Help Articles. Yes, they have their act together.

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