# Questions tagged [random-graphs]

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### Random linear arrangement of a tree with constrained edge lengths

Let $T$ be a tree with $V$ and edges $E$. Let a linear arrangement $\pi$ of $T$ be a bijective mapping from nodes to integers in the range $\{1, \dots, |V|\}$. You can think of $\pi$ as defining the ...
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### Fitness model for scale free networks

In order to generate scale-free networks, we can use this algorithm, derived from Barabási–Albert model: 1) we assign every node a "weight" $\theta_i$ (or two in the direct case). 2) we place $m$ ...
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### Singleton in a simple SBM

I can't work out the solution to the following exercise: We have $2n$ vertices grouped in $2$ clusters of equal size. The probability of having an edge between $i$ and $j$ is $p$ if $i$ and $j$ are ...
951 views

### How to generate random adjacency matrix with given number of components in graph

I am building a graph package in C and a part of the work involves generating a random graph with a given number of components in the graph. For example, if I wanted to generate a graph of 50 ...
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### Given a simple graph G, what's the quickest known way to sample one of its spanning trees at random?

Let's say I have a simple graph G with an edge set E, vertex set V, and at least 1 cycle. We can determine the number of spanning trees in this graph by finding its graph Laplacian matrix, striking ...
430 views

### Probability of k-clique in a random graph

I need to find the order of the minimum k = k(n) such that the probability of having at least 1 k-clique in a random graph $G(n, \frac{1}{2}$) is $\mathcal{O}(\frac{1}{n})$. $X_k$ is the random ...
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### Mean number of edges between two equal partitions

For a random undirected graph with $n$ nodes, where each node has $k$ incident edges ($nk/2$ edges in total), the vertex set is partitioned into two sets each having $n/2$ nodes. What is the ...
Let Alice and Bob be two users chosen uniformly at random from a social network (e.g. Facebook). What is the probability that they are friends assuming that they share $k$ mutual friends? I am ...
There is a family of random graphs $G(n, p)$ with $n$ nodes (due to Gilbert). Each possible edge is independently inserted into $G(n, p)$ with probability $p$. Let $X_k$ be the number of cliques of ...