Questions tagged [pr.probability]
Questions in probability theory
231
questions
3
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Sample complexity lower bound to learn the mode (the value with the highest probability) of a distribution with finite support
Say we have a black-box access to a distribution $\mathcal{D}$ with finite support $\{1,2,...,n\}$ with probability mass function $i \mapsto p_i$. How many samples of $\mathcal{D}$ are needed to learn ...
1
vote
2
answers
108
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How to find the size of an ϵ-net of a vector space?
Taken from paper "A Universal Law of Robustness via isoperimetry" by Bubeck and Sellke.
Theorem 3. Let $\mathcal{F}$ be a class of functions from $\mathbb{R}^{d} \rightarrow \mathbb{R}$ and ...
0
votes
0
answers
24
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Minimax computation for classification problems with smooth densities functions
Fix $d=1$, $r \in (0,\infty)$ and a neigborhood $\Omega$ of $0$ in $\mathbb R^d$ and let and let $W^{1,\infty}(r)$ be the Sobolev ball continuously differentiable functions $f:\mathbb R^d \to \mathbb ...
0
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0
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53
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Does the the equivalence of Total variation distance formulas assumes that the two distributions are symmetrical?
Does the the equivalence of Total variation distance formulas presented here(https://ece.iisc.ac.in/~parimal/2019/statphy/lecture-14.pdf) assumes that the two distributions are symmetrical ?
2
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1
answer
185
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Upper bound for VCdim of $H$ in terms of subgraph$(F)$, where $H := \{S(f) | f \in F\}$, with $S(f) := \{(x,y) \in X \times \{\pm 1\} | yf(x) \le 1\}$
$\DeclareMathOperator\sg{sg}\DeclareMathOperator\VCdim{VCdim}$
Let $X$ be a measurable space and given a measurable function $f:X \to \mathbb R$, recall that the subgraph of $f$, denoted $\sg(f)$ is ...
3
votes
0
answers
104
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Outputting true with probabiltiy $P(A|B)$ given $P(B), P(B|A)$, and a function which returns true with probability $P(A)$
I have a black-box function which returns true with probability $ P(A) $, that I don't know how to calculate.
I receive evidence B, and I want to create a function which returns true with probability $...
3
votes
3
answers
471
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Evaluating asymptotic probabilities of First Order Logic Formulas?
0-1 Laws in first order logic state that the probability of a FOL sentence $\Phi$, defined as follows:
$$P(\Phi) = \frac{|\{\omega \in \Omega^{n}:\omega \models \Phi\}|}{|\Omega^{n}|} $$
where $\Omega^...
0
votes
0
answers
17
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Can I estimate the probability of a given output of the diffusion model?
I have a pretrained Grad-TTS (https://arxiv.org/abs/2105.06337) denoising diffusion model that predicts a spectrogram (an array of numerical values) $Y$ from input text $X$. If I have a text $X_0$ and ...
7
votes
2
answers
297
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Isolation Lemma over finite fields
i couldn't find the answer to the following question:
The Isolation Lemma of Mulmuley, Vazirani and Vazirani uses the weight function $w:[n] \rightarrow [m]$ and assigns a subset $S \subseteq [n]$ the ...
4
votes
0
answers
201
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Maximize the mutual information between 2 discrete random variables
I have two random variables $X$ and $Y$. $X$ follows Poisson-Binomial distribution with parameters $\{q_1, \ldots, q_k\}$. Thus, $X$ can take values in the set $\{0,1,\ldots,k\}$.
$Y$ is a binary ...
3
votes
1
answer
166
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Proof and interpretation of the No Free Lunch theorem in data privacy
This question relates to a supposed counterexample to the No Free Lunch theorem governing data privacy mechanisms, as stated by Kifer et al (Section 2.1).
Colloquially, the theorem states that no ...
4
votes
0
answers
110
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From coin flips to algebraic functions via pushdown automata
Background
We're given a coin that shows heads with an unknown probability, $\lambda$. The goal is to use that coin (and possibly also a fair coin) to build a "new" coin that shows heads ...
7
votes
0
answers
132
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Probability distributions generated by pushdown automata
Background
This question is about generating random variates, in the form of their binary expansions, on restricted computing models. Specifically, the computing model is based on pushdown automata (...
0
votes
1
answer
80
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Differential privacy definition: subset of range of values vs. equals a value in the range
Consider only $\epsilon$-differential privacy. The textbook definition for this is:
Definition 1: "A randomized algorithm $\mathcal{M}$ with domain $\mathbb{N}^{|\chi|}$ is $\epsilon$-...
8
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0
answers
146
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What is the least compressible probability distribution? (under entropy constraint, for an expected squared error metric)
Consider a distribution $\mathcal D$ over the reals, a real parameter $H\in\mathbb R^+$, and an integer parameter $k\in\mathbb N$.
The Entropy-Constrained Quantization problem asks what is the best ...
8
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0
answers
157
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"Looking for help understanding a proof by Gossner (1998)."
Although there is no use of cryptographic protocols in Gossner (1998), the author refers to protocols of communication and he has a main result that I struggle to prove, because he does not use a ...
1
vote
1
answer
178
views
Young Diagrams and distinguishing between two distributions
Introduction:
The reference for everything is this paper.
The Robinson–Schensted–Knuth (RSK) algorithm is a well-known
combinatorial algorithm with diverse applications throughout
mathematics, ...
1
vote
0
answers
169
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Converse form of Chernoff bound
Suppose $X_1,\ldots,X_n$ are i.i.d. random variables, all with mean $p$, and we have the statement that $\Pr\left[\sum_i X_i\geq 0.8n\right]\geq 0.9$, can we use this to conclude anything about $p$ (...
0
votes
0
answers
102
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Using the probabilistic method to fill the gaps in a proof of set disjointness
In the 2-party $k$-sparse set disjointness problem, we have a set $U$ of size $n$ and there are two parties: Alice, who gets a set $X \subseteq U$ and Bob who gets a string $Y \subseteq U$, and it ...
0
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0
answers
105
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Does this sum-product algorithm make more sense?
Recall the belief propagation "sum-product" algorithm (from wikipedia):
$\forall x_v\in Dom(v),\;$
$\mu_{v \to a} (x_v) = \prod_{a^* \in N(v)\setminus\{a\} } \mu_{a^* \to v} (x_v)$
$ \mu_{...
6
votes
5
answers
350
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Relationship between Random Graph Theory and TCS
Sorry for this large and vague question. I am a new grad probability student recently interested in random graph theory(RG). I heard from someone in math department that RG has close relationship to ...
4
votes
1
answer
130
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What is tightest known (VC-style) sample complexity bound for uniform convergence of empirical means?
The following result is adapted from Anthony and Bartlett, 1999 (Theorem 4.9).
Theorem There exist positive constants $m_0 \le 400$, $c_1 \le 8$, $c_2 \le 41$, $c_3 \ge 1/576$ such that, if $(\Omega,\...
1
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0
answers
54
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Prune length distribution of random binary tree
Consider a random binary tree with $N$ leaves. Each node (except the root node) has a degree of exactly three (two children and one parent). No further restriction is placed on the structure of the ...
2
votes
0
answers
148
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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 ...
3
votes
1
answer
100
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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 ...
4
votes
0
answers
123
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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 ...
1
vote
1
answer
176
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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 ...
0
votes
0
answers
44
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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 ...
3
votes
0
answers
210
views
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 ...
2
votes
0
answers
133
views
Can a tractable sequence distribution prefer satisfying to unsatisfying assignments?
Let $p(x)$ be a Boolean circuit on $n$ bits $x \in \{0,1\}^n$. Consider a program that computes a probability distribution over all sequences $x$, autoregressively factored as
$$\pi(x | p) = \prod_{0 ...
6
votes
0
answers
112
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Is there a known notion of "stochastic dependent pair"?
I came upon this when thinking about the semantics of probabilistic programs. Say you have a generative model
N ~ Poisson()
for n = 1:N
X[i] ~ Normal()
Then the ...
5
votes
1
answer
179
views
Complexity of finding the most likely edge
Consider a connected, unweighted, undirected graph $G$. Let $m$ be the number of edges and $n$ be the number of nodes.
Now consider the following random process. First sample a uniformly random ...
-1
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1
answer
106
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Required sample size to hit certain subset of a ground set
Suppose $X$ is a set of $n$ points in $\mathbb{R}^d$ and $N_1,\cdots,N_k$ are k disjoint (unknown)subsets of $X$. There is a probability distribution $\phi$ on $X$ defined as $\phi(p) = \frac{\lvert\...
0
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0
answers
45
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understanding generalized coupon collector for distributions or learning mixture of distribution
Lets suppose we have a set $S=\{1,\ldots,n\}$ and $P$ is the uniform distribution over two subsets $T_1,T_2\subseteq S$, each of size $m\leq n/100$. Now, suppose somehow is given uniform samples from ...
-1
votes
1
answer
61
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Notation in proof for Asymptotic Equipartition Property
In the following lecture notes chapter 3, page 12-13, they state the following
We begin by introducting some important notation:
- For a set $\mathcal{S},|\mathcal{S}|$ denotes its cardinality (...
3
votes
1
answer
158
views
Binary search on coin heads probability
Let $f:[0,1] \to [0,1]$ be a smooth, monotonically increasing function. I want to find the smallest $x$ such that $f(x) \ge 1/2$.
If I had a way to compute $f(x)$ given $x$, I could simply use ...
11
votes
3
answers
2k
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"Almost all objects have property P" vs. "It is easy to test whether an object has property P"
I am interested in any relation between "almost all objects(from a universe) possessing a particular property P" versus "testing whether an object has property P being poly. time decidable".
My guess ...
4
votes
0
answers
89
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Strong data-processing inequality: bound $TV(T_{\#}P_0,T_{\#}P_1)$ if $\|T(x)-x\|_\infty \le \varepsilon;\forall x \in \mathbb R^p$
Disclaimer. I've moved this question from MO hoping that here is the right venue. Also, this is my first post on this channel, so please have some patience.
So, Iet $X = (X,d)$ be a Polish space, ...
1
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0
answers
102
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Weighted circular balls into bins
I would like to ask you for a help about modified balls into bins problem.
Consider $n$ weighted balls such that each ball has a weight $w_i$ that is at most $W$. Furthermore, each of $m$ bins has a ...
5
votes
0
answers
116
views
Majority function stability under deletion and addition of entries
It is well known that the majority function is stable under random flipping of bits. That is, if $v$ is a random binary vector, and then we re-sample each bit of $v$ with probability $\delta$ and get $...
4
votes
1
answer
410
views
Maximization of Mutual Information
Let $X\in\{0,1\}^d$ be a Boolean vector and $Y, Z\in\{0,1\}$ are Boolean variables. Assume that there is a joint distribution $\mathcal{D}$ over $Y, Z$ and we'd like to find a joint distribution $\...
4
votes
1
answer
258
views
How tight is the XOR lemma?
The XOR lemma states that if you have a distribution $D$ on $\{0,1\}^n$, and all the Fourier coefficients of $2^n D$ are small, then it is close in $L_1$ to the uniform distribution. Specifically, ...
3
votes
1
answer
111
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Reconstruction of a sequence generated by a Markov chain - reference request
Let S be a finite sequence of symbols from a finite alphabet, with gaps - that is on some known locations an unknown number of symbols are missing. Assuming that the sequence , including the symbols ...
4
votes
1
answer
200
views
Why is differential privacy defined over the exponential function?
For adjacent database $D,D'$, a randomized algorithm $A$ is $\varepsilon$-differential private when the following satisfies
$$\frac{\Pr(A(D) \in S)}{\Pr(A(D') \in S)} \leq e^\varepsilon,$$ where $S$ ...
6
votes
1
answer
287
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Big-O bounds on the k-th largest element of iid Gaussians
I'm interested in the following problem. Let $X_1, \dots, X_n$ be iid samples with a $N(0,1)$ distribution. Let $X_{[k]}$ be the $k$-th largest element of $\{X_1, \dots, X_n\}$, so e.g. $X_{[1]} = \...
1
vote
1
answer
99
views
How to play the following game? (placing balls into bins)
Let $n,\ell\in\mathbb N$ for some $n\gg \ell\gg 1$.
The goal is to pick two sequences of numbers, $x_1,\ldots,x_\ell$ and $y_1,\ldots,y_\ell$ such that $$\Sigma_{i=1}^\ell x_i = n\quad{}\mbox{and}\...
1
vote
0
answers
66
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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 ...
4
votes
2
answers
176
views
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 ...
3
votes
0
answers
59
views
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 ...
5
votes
2
answers
146
views
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 ...