# Questions tagged [pr.probability]

Questions in probability theory

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### Concentration bounds for hypergeometric distribution

I asked a similar question a while back. I have reformulated the question. My original intention was to ask this question. Suppose we have an urn containing $N$ balls, $M$ of which are red, rest are ...
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### A variant of “hypergeometric” distribution

This is already posted here. We all are aware of Hypergeometric distribution. Let me first briefly discuss what it is. Suppose we have an urn containing $N$ balls, $M$ of which are red, rest are blue. ...
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### Theorem on non-decreasing probability of success of an algorithm

Question: What's a standard name/framework for the following, or some variant? Stated briefly for a probabilistic algorithm: define $p_n$ as the conditional probability of success of a fork of the ...
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### Conditioning Probability on a Language With Measure 0

Let $\Sigma = \{ 1, 2, \ldots, n\}$ be some alphabet. Assume that you have a coin with n-sides (each side corresponds to a letter in $\Sigma$), and we get each letter with equal probability. Now you ...
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### Are there any known Chernoff/Hoeffding bounds for the case of “almost independence”?

The usual statement of a Hoeffding bound (e.g. https://sites.math.washington.edu/~morrow/335_17/ineq.pdf) requires independent random variables. My question is: Do there exist bounds similar to ...
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### Effect of self loops on mixing time?

Consider 2 graphs G1 and G2. G1: Any non-regular graph. G2: Same graph but with added self-loops such that degree of each node is the same (either some $\Delta$, or maximum '$n$', where $n$ is the ...
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### Rademacher complexity of k-fold maxima of hyperplanes

Aryeh Kontorovich wrote a technical report on 'Rademacher complexity of k-fold maxima of hyperplanes.' But its link (https://www.cs.bgu.ac.il/~karyeh/rademacher-max-hyperplane.pdf) is not accessible ...
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### Power law for degree distribution of random KNN graphs?

Setup Sample random points from say standard Gaussian (or uniform) distribution in $R^{d}$ for some "d" and consider a KNN (K-nearest neigbour) graph for some K. Look at the degree ...
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### Mapping of entire balls using Locality Sensitive Hashing (LSH)

LSH functions are useful for approximate nearest neighbor search. They are usually defined, for distance metric $d$ and $c>1$ as follows: A family of hash functions is $(r, cr, p_1, p_2)$-LSH ...
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### If I know pretty well '(a,b)', I know pretty well 'a', or 'b', or 'a xor b'

I've a quite simple problem: let's imagine I have a couple of bits $(a,b) \in \{0,1\}^2$ sampled uniformly at random. Then, I give a function of these bits $f(a,b)$ (it can be any function, including ...
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### Probability of detecting small bias of a die in the low confidence regime / balls and bins

We are given a biased $m$-sided die: one of the sides has probability $\frac{1}{m} + \gamma$ and all the rest have probability $\frac{1}{m} - \frac{\gamma}{m-1}$ each. The goal is to figure out which ...
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### Statistical Distance Growth Given K Independent Copies

Let $X$ and $Y$ be distributions with statistical distance (total variation distance) at most $d$. What is the best upper bound you can give on the statistical distance between $k$ independent copies ...
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### Infinite process balls in bins problem

Given $n$ balls and $m$ bins, let us consider an infinite process, where in each time slot we throw a ball at a random bin. When all $n$ balls are thrown, we take the balls from the bin with the ...
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### Are there any continuous-time stochastic processes in which transition probabilities are discontinuous functions over time? [closed]

In stochastic processes, like homogeneous Markov processes, Poisson processes, Queueing systems etc., the functions that represent (transition) probabilities are continuous over time. This is also ...
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### Tighter Probability Bounds

Let $\mathcal{F}$ be a class of binary functions on a probability space $\Omega$. For $f \in \mathcal{F}$, let $P(f) =\mathbb{E}(f(Z))$ and $P_n(f) = \frac{1}{n} \sum_{i=1}^n f(Z_i)$ where $Z_i$'s are ...
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### Application of the inequality with expectations

Let $\Vert\cdot\Vert$ is a norm in $R^n$. Let $x_1,\dots,x_N$ non-independent Rademacher random variables random variables (variables which are uniform on $\{-1, 1\}$). . By $E$ we denote an ...