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3 votes
0 answers
81 views

Can we remove the restriction on a parameter in Talagrand concentration inequality?

Recently I am trying to use Talagrand concentration inequality to do something on graphs. I find a version from the book of Molloy and Reed ''Graph Colouring and Probabilistics Method''. I attached a ...
Xin Zhang's user avatar
  • 1,190
1 vote
0 answers
89 views

Gamma and Poisson distributions and their relations to the randomness

I'm reading the following paper: https://academic.oup.com/bioinformatics/article/32/1/122/1743683 and in Figure 3 (Section 4.4) the authors have shown some vertex degree distributions: enter image ...
Statistics student's user avatar
1 vote
0 answers
68 views

A one-sided/monotone version of min/max-stable distributions -- does this have a name?

In a couple of papers I am working on (in random graph theory) I have encountered the following property of certain probability distributions, which I will describe shortly, and I am wondering if this ...
Joel Ottar's user avatar
1 vote
1 answer
602 views

Hammersley-Clifford theorem

The paper spatial interaction and the statistical analysis of lattice systems by Besag (1974) presents an alternative proof for the Hammersley-Clifford theorem. In order to prove the HM theorem, Besag ...
BelwarDissengulp's user avatar
1 vote
0 answers
105 views

Understanding the finale of the proof of Komlós' and Szemerédi's limit distribution of Hamiltonian random graphs

My question is about the end of the proof of Theorem 1 in [Komlós, Szemerédi (1983)], more precisely the arguments in Subsection 2.3. Let me state the beautiful theorem I am trying to understand in my ...
Nils Rosehr's user avatar
-2 votes
1 answer
82 views

Ensemble averaging in a random graph (or network) in the large $N$ limit [closed]

I have a random graph/network described by the adjacency matrix $(a_{ij})_{N\times N}$ where $a_{ij}=1$ with probability $p$. Each node in the graph is associated with a continuous quantity $\eta_i=\...
maurizio's user avatar
  • 137
2 votes
1 answer
900 views

Asymptotically tight concentration of norms of subgaussian random vectors with independent coordinates, as the dimension $n \to \infty?$

Let $X=(X_1 \dots X_n)\in \mathbb{R}^n,$ be a subgaussian random vector so that $X_i$'s are independent, $\mathbb{E}X_i = 0, \mathbb{E}X_i^2=1.$ Before we pose our question, let's state the following: ...
Learning math's user avatar
1 vote
1 answer
104 views

Limit of normalized sum of Dirac measures at first $\lfloor p/2\rfloor$ eigenvalues of the sample covariance matrix, with Marcenko-Pastur assumptions?

Let $\lfloor{*}\rfloor$ denotes the nearest integer $\le *$. I'm asking myself the question what's the limit of the part of the empirical spectral distribution corresponding to the first $\lfloor{p/2}...
Learning math's user avatar
1 vote
0 answers
166 views

Expected number of perfect matchings in bounded degree bipartite graphs

Consider collection $\mathcal C_{n,n,\Delta}$ of every $2n$ vertex balanced bipartite graph of average degree $\Delta$. What is the expected number of perfect matching a graph in $\mathcal C_{n,n,\...
Turbo's user avatar
  • 13.9k
1 vote
0 answers
255 views

Multiple Bipartite graphs and matchings

I've been told recently that it's better i just for help regarding my 'specific' problem rather than lots of little questions around the same topic which appear somewhat unclear. I would first like to ...
Pavan Sangha's user avatar
0 votes
0 answers
216 views

Computation on Random Bipartite graphs

I'm looking at a random bipartite graph $K_{\omega(n)}*K_{\omega(n)}$ where $\mathrm{log}(n)\leq \omega(n) \leq n^{1/2}$, in which each of the $\omega(n)^{2}$ edges is placed randomly with probability ...
Pavan Sangha's user avatar
4 votes
0 answers
183 views

Concentration inequality for function of independent Bernoulli r.v.'s (related to random graph)

Consider a random undirected graph on a set of $n$ nodes, say $\{1,2,\ldots,n\}$, such that the probability of edge between nodes $i$ and $j$ is $p_{ij}$ (we may assume $p_{ij}=o(1)$ for all $i,j$, i....
adas's user avatar
  • 163