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Probability distribution on Python-dictionary-like objects?

I would like to examine information-theoretical properties of random variables that take as values objects which are akin to dictionaries in the Python programing language. That is, each sample of the ...
Lukas's user avatar
  • 11
1 vote
1 answer
75 views

Probability of correctly guessing the maximum event probability of a multinomial distribution

I have a sample from multinomial distribution with $n$ trials, and $k=3$ options. I know that one of the event probabilities $p_i$ is larger than the two others (who are equal). I'm trying to guess ...
Ted's user avatar
  • 267
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
84 views

How can one build a min-2-wise independent small sample space from min-3-wise permutations?

I have been studying a polynomial-size set of permutations from one of my lectures. The below image, taken from the lecture notes PDF, illustrates how to construct min-3-wise permutations. My ...
the_tomato's user avatar
0 votes
1 answer
231 views

Concentration inequalities for random sampling without replacement

Let a population $C$ consist of $N$ values $c_1, c_2, \cdots, c_N$, with $c_i\in \{0,1\}$. Let $X_1, X_2, \cdots, X_n$ denote a random sample without replacement from $C$ and let $Y_1, Y_2, \cdots, ...
Dotman's user avatar
  • 105
0 votes
2 answers
239 views

Computing the expectation of a quadratic matrix form involving Bernoulli and Gaussian distributed matrices

I am working with two random matrices, $Z$ and $H$: $Z$ is an $n \times K$ matrix with entries sampled i.i.d. from a Bernoulli distribution: $Z_{ij} \sim \mathrm{Bernoulli}(p)$. $H$ is a $K \times K$ ...
Dalek's user avatar
  • 37
2 votes
0 answers
56 views

Dirichlet series solution to Poisson Point Process question (repost from math.SE)

Reposting here because the bounty on the original math.SE post expired, with no solutions or comments received. For any discrete subset $S$ of $\mathbb{R}^d$, consider a digraph formed by placing an ...
Jim Ferry's user avatar
  • 121
4 votes
1 answer
197 views

On a double sum involving binomial coefficients

For natural $n$, let \begin{equation} p_n:=2^{1-n}\sum_{v=1}^l \binom l{(v+l)/2}1(v\equiv l) \sum_{u=1-v}^{v-1}\binom k{(u+k)/2}1(u\equiv k), \tag{1}\label{1} \end{equation} where $k:=\lfloor(n+1)/...
Iosif Pinelis's user avatar
3 votes
1 answer
266 views

A linearly distributed version of the balls into bins problem

Some years ago, I found a paper with all the formulas for the balls into bins problem when the "areas" (i.e., probabilities to capture a ball) of the bins are all different. However, the ...
Penelope Benenati's user avatar
17 votes
1 answer
1k views

Can this probability be obtained by a combinatorial/symmetry argument?

Suppose that $a_1,\dots,a_n,b_1,\dots,b_n$ are iid random variables each with a symmetric non-atomic distribution. Let $p$ denote the probability that there is some real $t$ such that $t a_i \ge b_i$ ...
Iosif Pinelis's user avatar
1 vote
0 answers
663 views

The distribution of hitting time in 2D-lattice random walk [closed]

Assume a particle at $(0,0)$ with the same possibility of $1/4$ for moving up/down/left/right (i.e. random walk in 2D lattice). We define the stopping time 𝑇𝑐 as it hits $(a,b)$. How can we get the ...
Chenggang Zhao's user avatar
3 votes
0 answers
516 views

The distribution of collision stopping time in 2D random walk

Assume two particles A at $(0, 0)$ and B at $(a, b)$ in 2D discrete grid, both of them have the same possibility of $\frac{1}{4}$ for moving up/down/left/right (i.e. 2D random walk). We define the ...
Chenggang Zhao's user avatar
1 vote
0 answers
176 views

Gaussian order statistics

Setup. Let $\alpha\in(0,1)$ fixed; and $\tau\in[0,1]$ (think of it very close to one). Suppose $X_1,\dots,X_n$ are i.i.d. standard normal. Let $Y_1,\dots,Y_n$ be another sequence of standard normals ...
ttteessttt's user avatar
1 vote
1 answer
207 views

Expectation of the sum of the squares of the cardinal of an inverse function

I sample a random one-to-one function $\pi:\{0\,;\,1\}^n\to\{0\,;\,1\}^n$. I define $f$ as: $$\forall x\in\left[0\,;\,2^n-1\right]\cap\mathbb{N},f(x)=x\oplus\pi(x)$$ where $\oplus$ is the bitwise XOR. ...
Tristan Nemoz's user avatar
5 votes
3 answers
601 views

Convergence speed of a random dyadic rational generator

We are given a multiset $M$ of real numbers which initially is equal to $\{0,1\}$. In a sequential fashion, at each round $r\in\mathbb{N}$ two distinct instances $x_r$ and $y_r$ of $M$'s numbers are ...
Penelope Benenati's user avatar
6 votes
0 answers
156 views

Distribution of iid hypergeometric random variables conditioned on the sum

Let $X_1,X_2,\ldots,X_n$ be iid random variables with hypergeometric distribution. To be specific, $$ \mathrm{Prob}(X_1=i) = \frac{\binom{N}{i}\binom{M-N}{m-i}}{\binom{M}{m}}.$$ Let $S=X_1+\cdots+X_n$....
Brendan McKay's user avatar
3 votes
1 answer
206 views

Random planes separating points in $\mathbb{R}^3$

We are given a unit origin-centered sphere $S$ in $\mathbb{R}^3$, and three points $\mathbf{x},\mathbf{y},\mathbf{z}\in S$. Let $\mathbf{h}$ be a point selected uniformly at random from $S$ and let $H$...
Penelope Benenati's user avatar
3 votes
1 answer
153 views

Randomized version of Turán's theorem II

$\newcommand{\om}{\omega}$Let $\om(G)$ denote the number of vertices in a largest clique of an (undirected) graph $G$ with the set $[n]:=\{1,\dots,n\}$ of vertices. Then \begin{equation} \om(G)\ge\...
Iosif Pinelis's user avatar
5 votes
1 answer
209 views

Randomized version of Turán's theorem

Turán's theorem says the following. Take any natural $n$ and $r$. Suppose that \begin{equation*} |G|>\Big(1-\frac1r\Big)\frac{n^2}2, \tag{0} \end{equation*} where $|G|$ is the number of edges of ...
Iosif Pinelis's user avatar
3 votes
1 answer
315 views

Distribution of the first occurrence of a maximum (record) run of zeros in the digits of a normal number (say $\pi$)

If the question was stated to appeal to the general public, it would be something like this. For a number such as $\pi$ or $\sqrt{2}$, the digits in base $b$ appear to be randomly distributed. We are ...
Vincent Granville's user avatar
5 votes
0 answers
130 views

Random process on a sequence of rolls of an $n$-sided die

Let $\ X:=X_{k\,n}\ $ be a random variable of a $n$-sided die where $\Pr(X=i)=\frac{1}{n}$ for each $i\in\{1,2,\ldots,n\},\ $ where $\ k\in\{1, 2, \ldots,n\}\ $ and $\ n\ $ are fixed. Let $t$ be a ...
Let101's user avatar
  • 83
1 vote
2 answers
163 views

Coupling a binomial - parity conditioning

If I have a binomial $X \sim B(n,p)$, and another binomial $X' \sim B(n,p)$ conditioned on $X'$ being of even parity. Is it true that there always exists a coupling for $(X,X')$ with $|X-X'| \le 1$? (...
DJA's user avatar
  • 435
2 votes
0 answers
164 views

Finding an optimal strategy for a combinatorial sequential game

We are given a set $\{p_1, p_2, \ldots, p_n\}$ of players and a set of $\{\ell_1, \ell_2, \ldots, \ell_n\}$ of locations, where $n\in\mathbb{N}$. Each location can be either free or occupied, and each ...
Let101's user avatar
  • 83
1 vote
3 answers
339 views

Coupon collector targeting a collection among many

I am interested in the following problem: We are given a universe $U$ of $n$ coupons, partitioned into $k$ collections, $C_1,\dots C_k$. At each time step $t$, a coupon $X_t$ is selected uniformly at ...
GBathie's user avatar
  • 111
2 votes
2 answers
379 views

Probabilistic combinatorial optimization problem on the distances between pairs of points in $[0,1]$

Let $S$ be a set of $n \gg 1$ points lying on the interval $[0,1]$. Given a point $p\in[0,1]$, let $S_p\subseteq S\times S$ be the set formed by all pairs of points $(x,y)$ with $x,y\in S$, such that ...
Penelope Benenati's user avatar
0 votes
1 answer
340 views

Expectation of the ratio of two discrete random variables with combinatorial constraints

We are given a set $S=\{1, 2, \ldots, n\}$ where $n\gg 1$, and for all indices $1\le i \le n$, $i$ is associated with a real value $\alpha_i\!\cdot\! v_i$, where $\alpha_i\in[0,1]$ and $v_i\in(0,1]$. ...
Penelope Benenati's user avatar
3 votes
1 answer
395 views

Symmetric distribution optimization problem of distances between points in $[0,1]$

Let $\mathcal{D}$ be a probability distribution with support $[0,1]$. Let $x, y, z$ the outcomes of three i.i.d. random variables $X, Y, Z$ with distribution $\mathcal{D}$, sorted in increasing order, ...
Penelope Benenati's user avatar
2 votes
1 answer
218 views

Probability distribution optimization problem of distances between points in $[0,1]$

Let $\mathcal{D}$ be a probability distribution with support $[0,1]$. Let $X, Y, Z$ three i.i.d. random variables with distribution $\mathcal{D}$, and $T$ a random variable uniformly distributed in $[...
Penelope Benenati's user avatar
3 votes
3 answers
2k views

Probability of a given string being a substring of another string

I am in interested into the following problem. We are given an alphabet $\Sigma$ of $k$ letters and a fixed string $S_1$ of length $l$ defined over $\Sigma$. Given a probability distribution $D$ over $...
catbow's user avatar
  • 41
2 votes
1 answer
195 views

Average number of elements of a subset S of a matrix A after inducing the rows and columns of m randomly selected elements from subset S

Let $A_{N{\times}N}$ be an $N{\times}N$ matrix and $\mathcal{S_{k}}$ be a subset of elements in $A$ such that exactly $k$ elements from every row and column in $A$ are in $\mathcal{S_{k}}$. Thus, $\...
Carlos A. Astudillo Trujillo's user avatar
2 votes
2 answers
185 views

Independence depth of linearly dependent random variables

Suppose, $\Xi$ is a collection of random variables. We call $\Xi$ $k$-independent, iff any $k$ distinct elements of $\Xi$ are mutually independent. For example, $2$-independence is pairwise ...
Chain Markov's user avatar
  • 2,618
2 votes
0 answers
85 views

How fast does a sum of Bernoulli distributions (of different parameters) decrease after its mean?

Let $X=\sum_{i=1}^nX_i$, where each $X_i$ is a random variable following a Bernoulli distribution of parameter $p_i$. All $X_i$ are independent, and for all $i$, $p_i<p$ for some small $p$. I'm ...
Ted's user avatar
  • 267
4 votes
1 answer
272 views

How far do I have to go for the tail of a binomial distribution with small $p$ to be $O(1/n)$?

Let $n$ be a large integer, $p$ be a small number (say, $p=C/n$ for some constant $C \ll n$), and consider the tail of the binomial distribution $B(n,p)$, after $T$: $$ \delta = \sum_{s=T}^{n} p^s (1-...
Ted's user avatar
  • 267
1 vote
1 answer
134 views

Random optimization problem

Let $V$ be a set of $n$-dimensional vectors such that, for each ${\bf v}\in V$ and for each index $i\in [n-1]$, we have $0\le v_{i+1}\le v_i$. Let $P(\cdot)$ be a discrete probability distribution ...
Penelope Benenati's user avatar
1 vote
0 answers
221 views

Different balls in bins: What is the probability distribution of the sum of the minimum of the two types of balls over all bins?

Assume that there are $N$ different bins and two different kinds of balls, $R$ red balls and $W$ white balls. The red balls and the white balls are randomly distributed across the bins (that is, for ...
Matze's user avatar
  • 53
2 votes
1 answer
106 views

How to efficiently sample uniformly from the set of $p$-equipartitions of an $n$-set?

I have a question related to this one. For $n,p \in \mathbb{N}_+$ such that $p\mid n$, let $\mathcal{P}^{\rm eq}$ be the set of all equipartitions of $n$ in $p$ sets; i.e., in sets of equal size $\...
Clement C.'s user avatar
  • 1,372
8 votes
1 answer
171 views

On the existence of a particular type of finite measure on $\mathbb N$

Let $\mathbb N$ denote the set of all positive integers. Does there exist a countably additive measure $\mu : \mathcal P(\mathbb N) \to [0,\infty)$ such that $\mu(\mathbb N)<\infty$ and $\mu(\{nk: ...
user521337's user avatar
  • 1,209
3 votes
1 answer
167 views

Lower bound on the sum of pmf squared of a hypergeometric distribution

I am working on a proof of correctness for an algorithm I came up with. I encountered the following problem en route. I would appreciate if anyone had some idea or could point me to the relevant ...
User93's user avatar
  • 33
4 votes
1 answer
648 views

What is the probability for a Binomial to be greater than other?

Let $X = B(n, p)$ and $Y = B(k, q)$ be two random variables with binomial distribution and, let $s$ be a positive integer. Assume that $n > k+s$ and $np \geq kq+s$. What is the probability for $X$ ...
Mohamad Latifian's user avatar
3 votes
1 answer
227 views

Density of a somewhat random set

The density of a set $X\subseteq\omega$ refers to: $\limsup\limits_{n\rightarrow\infty}\dfrac{C\cap n}{n}$. Given a set of positive integers $F= \{m_0<\cdots<m_{k-1}\}$, let $C\subseteq \omega$...
Jiayi Liu's user avatar
  • 909
-1 votes
1 answer
76 views

Transforming random variables for having good property?

For arbitrary functions $A$ and $B$ and independent random variables $X$ and $Y$, assume that \begin{align} \Omega&\triangleq \{(x,y): A(x,y)=1\},\\ \Lambda&\triangleq \{x: B(x)=1\}. \end{...
Math_Y's user avatar
  • 287
3 votes
0 answers
116 views

Trace of Symmetric matrices in fixed rank

I am solving some problem related to symmetric matrices over a finite field $\mathbb{F}_q$ and I am stuck at the following problem: For every $a\in\mathbb{F}_q $, let $S_a(t,m)$ be the set of all $m\...
Singh's user avatar
  • 179
2 votes
1 answer
266 views

A question about finite free convolution

For any square matrix $Y$ let $\chi_x(Y) = det(xI -Y)$ denote its characteristic polynomial. Say $A$ and $B$ are two $n-$dimensional symmetric matrices with constant row sums $a$ and $b$. Lets ...
gradstudent's user avatar
  • 2,246
8 votes
1 answer
198 views

Tail bound of a distribution

Let $X_1, X_2, \ldots, X_n, Y_1, Y_2, \ldots, Y_n$ be independent binary random variables each being $1$ with probability $\frac{1}{k}$. Let $Z = X_1(Y_1 + \cdots + Y_k) + X_2(Y_2 + \cdots + Y_{k+1})...
user47772's user avatar
  • 305
1 vote
1 answer
357 views

Does CLT hold for joint distribution of two dependent binomial variables?

Let $S_n$ and $T_m$ be two binomial variables satisfying $S_n\sim B(n,\frac12)$ and $T_m\sim B(m,\frac12)$. Define $\tilde{S}_n=\frac{2S_n-n}{\sqrt{n}}$ and define $\tilde{T}_m$ similarly. For any ...
Eric Yau's user avatar
  • 111
13 votes
2 answers
669 views

An inequality for expected value of normally distributed variables

Question. Let $X_1,\dots,X_n$ be random variables with normal distribution. Is it true that $$\mathbb E \prod_{i=1}^nX_i^{2k}\ge\prod_{i=1}^n\mathbb E X_i^{2k}$$for any $k\in\mathbb N$? (The ...
Lviv Scottish Book's user avatar
6 votes
0 answers
133 views

Random Balanced Assignment

A balanced assignment from from $N$ objects to $K$ classes is a mapping $\sigma\colon \{ 1, \ldots, N\} \rightarrow \{ 1, \ldots, K\}$ such that $$ \textrm{Card}( \sigma^{-1} \{j \} ) = \textrm{Card} ...
Steve's user avatar
  • 1,127
7 votes
3 answers
345 views

Concentration Bound of $0/1$ permanent

If I pick a random $0/1$ $n\times n$ matrix with $0$ occuring with probability $p$ then what does the distribution of the permanent look like?
Turbo's user avatar
  • 13.9k
3 votes
1 answer
190 views

Solution for Moment problem

I want to invert a sequence of moments and find a function f(x) satisfying: $$m_r=\int x^{r}f(x) dx=\int x^{r} dF(x)$$ The sequence of moments is given by: $m_{2s+1}=0$ $m_{2s}=\sum_{k=1}^{s}\binom{...
LuHell's user avatar
  • 333
10 votes
1 answer
263 views

q-versions of the geometric distribution and their names

I'm trying to set straight various $q$-deformations of the standard geometric distribution. The geometric distribution on $\left\{ 0,1,\ldots \right\}$ is well-known, it has $$ \mu_1(X=j)=(1-p)p^j,\...
Leonid Petrov's user avatar