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Questions tagged [random-walks]

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Divergent/Unbounded random walks techniques

I want to prove the following biased random walk will be diverge. Suppose I have a random walk $S_n = X_1 + ... + X_n$, but $X_1,...,X_n$ are dependent variables. $X_1 \sim$ Bernoulli($\sigma(\theta_1)...
Chu Thắng's user avatar
0 votes
1 answer
49 views

Probability of random walk on confined lattice with reflective boundaries

Consider a simple random walk in one dimension with reflective boundaries at $n=1$ and $n=N$. We can express it via the master equation: \begin{equation} P(n,t) = \frac{1}{2}P(n-1,t-1) + \frac{1}{2}P(...
papad's user avatar
  • 272
0 votes
0 answers
79 views

Does a 2d random walk hit 0 for increasing distances AND time spans?

Question: For a simple symmetric random walk $(Z_t)_{t\geq 0}$ in $\mathbb{Z}^2$, does $$\lim_{\beta\rightarrow 0}\mathbb{P}^{x_\beta}(Z_t=0\text{ for some }t\leq h(\beta)T)=0\quad (2.8)$$ where $|x_\...
PontyMython's user avatar
5 votes
1 answer
130 views

Dispersion of random walk with scaled step sizes

Let $Y_j$ be a sequence of independent Gaussian random variables with mean zero and unit variance ($\mathbb{E} Y_j = 0$ and $\mathbb{E} Y_j^2 = 1$) and let $\sigma:\mathbb{R}\to [1,2]$. We define the ...
felipeh's user avatar
  • 452
7 votes
5 answers
488 views

Probability of $\operatorname{Bin}(n,p)=\operatorname{Bin}(n,q)$ is decreasing when $n$ increases

$\newcommand{\Bin}{\operatorname{Bin}}$I would like to show that $\mathbb P(\operatorname{Binomial}(n,p) = \operatorname{Binomial}(n,q))$ decreases when $n$ increases for a fixed pair $(p,q)$. This ...
YuiTo Cheng's user avatar
3 votes
1 answer
232 views

Bounds on hitting time of sum of i.i.d. random variables

I have a sequence $(X_i)_{i\geq 1}$ of i.i.d. random variables taking values in $\mathbb Z$. I know that each $X_i$ has mean $0$ and finite variance $\sigma^2$. Let $S_n=X_1+\cdots+X_n$. Then I can ...
Colin Defant's user avatar
4 votes
0 answers
74 views

MGFs of sum of (Rademacher) independent variables and (hyperbolic/spherical) Pythagorean theorem

Consider a set of iid random variables $X_1, X_2, \ldots$ (distribution to-be-specified later). For real numbers $a_1, a_2, \ldots$ (with $\sum_{k} a_k^2 < \infty$) define $$X = a_1 X_1 + a_2 X_2 +...
ccriscitiello's user avatar
3 votes
1 answer
163 views

A few points of clarification on the Martin boundary

Let $\Gamma$ be a finitely generated group, and let $M$ be the Martin boundary of $\Gamma$. I was reading the article on Martin boundary on Encyclopedia of Math, and I have a few questions about what ...
SMS's user avatar
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1 vote
0 answers
126 views

Have strictly superharmonic functions on graphs been studied?

Given a graph $G$ and a function $f:G\to\mathbb R$, we say that $f$ is harmonic if $$f(x)=\frac{1}{|N(x)|}\sum_{y\in N(x)}f(y)$$ for every $x\in G$, where $N(x)$ denotes the set of neighbors of $G$. ...
confusedTurtle's user avatar
2 votes
0 answers
164 views

How to choose N policemen positions to catch a drunk driver in the most effective way (on a Cayley graph of a finite group)?

Consider a Cayley graph of some big finite group. Consider random walk on such a graph - think of it as drunk driver. Fix some number $N$ which is much smaller than group size. Question 1: How to ...
Alexander Chervov's user avatar
1 vote
1 answer
239 views

Random walk on $\mathbb{Z}^3$. Expected number of visits and probability of return

I am working with the simple symmetric random walk on $\mathbb{Z}^3$. Using the Fourier identity I have been able to prove: $$ P(S_n = 0) = \frac{1}{(2\pi)^3} \int_{-\pi}^{\pi} \int_{-\pi}^{\pi} \...
Gonzalo Chiva San Román's user avatar
2 votes
1 answer
65 views

Random pseudo-walk with 'disappearing' values

This question is a twist on a question I asked here Random pseudo-walk of Poisson variables, but with randomly 'disappearing' objects. I do not know how to generalize the (satisfactory) answer given ...
Amir Ban's user avatar
2 votes
0 answers
43 views

Random Walks on the natural numbers with self loops

I am looking at a random walk that starts at 0 and at every step, either increases or decreases by 1, or doesn't move. More specifically, $\mathbb{P} (X_{t+1} = X_t) = 1-p,\mathbb{P} (X_{t+1} = X_t +1)...
Antoine's user avatar
  • 31
3 votes
1 answer
107 views

Has this random process been studied on grid graphs?

As an offshoot of a different discussion I got curious about (uniform) random spanning trees on grid graphs (torus graphs in particular, to avoid having to think about edge effects) and what their ...
Steven Stadnicki's user avatar
3 votes
2 answers
213 views

Measures with superexponential moments on finitely generated groups

Let $\Gamma$ be an infinite finitely generated group and let $\nu$ be a measure on $\Gamma$ which generates a transient random walk. I was reading this paper, and the authors prove many of their ...
Takao Hishikori's user avatar
2 votes
0 answers
67 views

Bound from above and from below the probability that a 1-D centered random walk remains at each step inside a square root boundary

Let $W_n = \sum_{i = 1}^{n}X_i$ be a random walk on $\mathbb{R}$, where the increments $X_i$ are i.i.d., symmetric around the origin ($X\sim -X$), such that $-1\leq |X(\omega)| \leq 1$ $\forall\omega\...
MathRevenge's user avatar
0 votes
1 answer
32 views

Transience of the SRW on regular graphs of exponential growth

Let $G$ be a $d$-regular graph of exponential growth. By exponential growth I mean that $$ \liminf_{r \to \infty} | B(o, r)|^{1/r} >1. $$ Here $B(o,r)$ is the ball of radius $r$ centered at a given ...
Keivan Karai's user avatar
  • 6,182
6 votes
1 answer
537 views

Balancing act for infinite walks

Think of a one-dimensional infinite walk as a map $$w\colon \mathbb{N}\to \{-1,1\}.$$ (If it is more convenient, you can think of a walk as a subset of $\mathbb{N}$, or as a binary word, or as any ...
Pace Nielsen's user avatar
  • 18.4k
6 votes
0 answers
145 views

Running minimum of exponential random walks

Let $\{X_i\}$ be a collection of i.i.d. Exp$(1)$ random variables. For $k \in \mathbb{Z}_{>0}$, define $$S_k = \sum_{i=1}^k X_i$$ and note that $\mathbb{E}[S_k] = k$. I was wondering if there is ...
Xiao's user avatar
  • 485
2 votes
0 answers
112 views

Asymptotic Independence of random walks from increments?

Suppose we have two random walks $(S_n:n\geq 1)$ and $(T_n:n\geq 1)$ building from independent identically distributed increment vectors $\{(X_k,Y_k):k\geq 1\}$, i.e. $S_n=\sum_{k=1}^n X_k, T_n=\sum_{...
MikeG's user avatar
  • 705
3 votes
1 answer
163 views

Simple linear asymptotics for leaving time of particle in open-boundary TASEP

EDIT: It appears the hypothesis may not be true - I am not sure. I therefore changed my question. ORIGINAL QUESTION: Consider a system $n$ linked discrete cells numbered $1 \ldots n$. Particles are ...
aellab's user avatar
  • 133
4 votes
3 answers
681 views

Winning game probability

At each round of a game with two players Alice and Bob, Alice can win with a fixed probability $a$ and Bob can win a fixed probability $b$, such that $a+b < 1$, otherwise there is a draw. The game ...
heartwork's user avatar
  • 383
1 vote
0 answers
163 views

Locally "unshortable" paths in graphs

Setup: Consider a connected graph G, with diameter "d". Informally: Trivially (by definition of diameter), taking any path $P$ any nodes $P(i) , P(i+k)$ for $k>d$ can be connected by a ...
Alexander Chervov's user avatar
2 votes
0 answers
192 views

If the operators $B_i'$ satisfy an inequality, prove that $B_1'+\dotsb+ B_n'$ also satisfies the same inequality

Related: On a deceptively tricky calculus problem. The way that Leonard Gross proves the log Sobolev inequality is in the following stages: He proves that for any operator $B$ that satisfies the log ...
matilda's user avatar
  • 90
1 vote
0 answers
164 views

Random walk on N-Rubik cube group is going like sqrt(number of moves) or linear (number of moves) or? "commutative" vs. "free"(like) group pattern?

Consider higher (NxNxN) Rubik's cube group, with specific set of generators described below. What is important - that there are huge COMMUTING subsets of generators. Question: Consider a random walk ...
Alexander Chervov's user avatar
1 vote
0 answers
92 views

Conditioned random walk over a graph

I want to solve for a conditioned random walk over a graph. I have a directed graph $G$. The random walkers start at a fixed node, Source. They all need to end up at fixed node, Sink. So the random ...
highBandWidth's user avatar
3 votes
0 answers
129 views

An analogue of Kolmogorov's law of the iterated logarithm

Let $X_1,\dots,X_n$ be independent random variables, each with mean zero and finite variance. Let $S_n = \sum\limits_{k=1}^n X_k$ and $s_n^2=ES_n^2$. We say the sequence obey the law of iterated ...
graham's user avatar
  • 153
3 votes
1 answer
369 views

Random pseudo-walk of Poisson variables

Suppose there is a pool that can contain any non-negative number of objects. At time $t$ it contains $n_t$ objects. Time is discrete. Before time $t+1$ two things happen, in this order: Unless the ...
Amir Ban's user avatar
1 vote
3 answers
357 views

Probability that a 1-D zero mean random walk remains at each step inside a square root boundary

Let $W_n = \sum_{i = 1}^{n}X_i$ be a random walk on $\mathbb{R}$, where the increments $X_i$ are i.i.d., symmetric around the origin ($X\sim -X$), such that $-1\leq |X(\omega)| \leq 1$ $\forall\omega\...
MathRevenge's user avatar
3 votes
0 answers
140 views

How to sample uniformly over a polytope knowing its vertex presentation?

Say that a convex polytope $P$ is presented as $P = \mathrm{Conv}(v_1, \dots , v_m)$. I would like to sample over $P$, without generating the facet presentation of the polytope. How can I do that? I ...
giulio bullsaver's user avatar
2 votes
0 answers
119 views

Random walk with same directions and different step sizes

Let $X\sim e^{iU}$, where $U$ is uniformly distributed on $(0, 2\pi]$. Define $\chi_1, \cdots, \chi_t$ as i.i.d. random variables with the same distribution as $X$. Consider the following two random ...
Farzad Aryan's user avatar
0 votes
1 answer
282 views

How far does a random walker travel before returning to the origin?

Consider a (continuous time) simple symmetric random walk on $\mathbb Z$, starting from the origin. Let us denote this random walk by $\{X_t: t\geq 0\} $. It is well known that this random walk is ...
Tiago's user avatar
  • 59
2 votes
0 answers
77 views

A question on the convex hull of independent random walks

Consider $m$ independent random walks $X^1_n, \dots, X^m_n$ driven by a probability measure $\mu$ in $ \mathbb{Z}^d$. Assume that the $\mu$ has no drift, that is, the expected value of a $\mu$-...
Keivan Karai's user avatar
  • 6,182
4 votes
0 answers
72 views

Small angles between independent centred random walks in $ \mathbb{Z}^d$

Let $W_n$ and $W'_n$ denote two independent random walks in $ \mathbb{Z}^d$ defined using a finitely supported centred (mean zero) probability measure on $\mathbb{Z}^d$. For $N \ge 1$, let $\theta_n$ ...
Keivan Karai's user avatar
  • 6,182
4 votes
1 answer
183 views

Sign of error in the central limit theorem

Let $X_n$ and $Y_n$ be independent copies of two random variables $X$ and $Y$ with domain $\{-1,0,1\}$ for $n\in \mathbb{N}$. For a given $k\in \mathbb{N}$, I would like to find conditions on $X$ and $...
Flo Dorner's user avatar
5 votes
2 answers
392 views

A coupon collector-ish question

Imagine we are in the coupon collector setting: every time step we get independently one coupon out of $n$ coupons uniformly at random. However, unlike the coupon collector problem, we stop the at the ...
DeepC's user avatar
  • 63
2 votes
0 answers
98 views

Defining a metric on $\mathbb Z^n$ using Green's function for the simple random walk

Let $G$ be Green's function for the simple random walk on $\mathbb Z^n$ for $n\ge 3$, i.e., $G(x)$ is the expected number of visits to $x$ when the walk starts at the origin. Define $d(x,y)=G(x-y)^{1/(...
Alexander Pruss's user avatar
13 votes
2 answers
1k views

Optimal search puzzle

Consider the following puzzle: On the integer line from 1 to $t$ (top, let's say 1000 for this example), you have two operators: uniform random on 1 to $t$, and subtract 1. What is the optimal ...
jackisquizzical's user avatar
4 votes
1 answer
509 views

Probability to return to the origin for a uniform random walk

Consider a uniform random walk on $\mathbb{R}$, with stepsize chosen uniformly from the interval $(-1,1)$. The random walk start at $x=0$. Denote by $\rho_p dx$ the probability that the random walk ...
Carlo Beenakker's user avatar
-1 votes
1 answer
143 views

Strong law of large numbers for a sequence of random variables in different probability spaces

Is it known whether the following version of the strong law of large numbers holds? For each $k\in\mathbb{N}$, let $\Omega_k$ be a finite set and $\mu_k$ be a probability measure on $\Omega_k$. Let $(...
Aleksi's user avatar
  • 1
3 votes
2 answers
203 views

Random walk to visible lattice points

Consider a random walk from the $\mathbb{Z}^2$ origin $(0,0)$ to visible (not blocked) lattice points $p$, with a parameter $r$ a given radius of a circle centered on $p$. With $p$ the previous point, ...
Joseph O'Rourke's user avatar
2 votes
2 answers
142 views

Example of random walk in a random environment (RWRE) saying things on the environment

I was wondering if anyone is aware of works/articles/examples where random walks in a random environment (RWRE) are actually used for obtaining information on the random environment. To clarify a bit, ...
Cal's user avatar
  • 59
8 votes
0 answers
160 views

Random walk on matrix until singularity

Consider a random walk on matrices, where one starts with the matrix $M=I_n$ and at each step randomly chooses an entry of $M$ to increase by $1$. I’m interested in two things about this walk: What’s ...
TheBestMagician's user avatar
1 vote
1 answer
255 views

Rate of convergence to uniform distribution

Let $p=(p(1),\ldots,p(N))$ be a discrete distribution on $[N]:=\{1,2,\ldots,N\}$ with full support (i.e all the $p(i)$'s are strictly positive and sum to $1$). Let $i_1,i_2,\ldots,i_T$ be an iid ...
dohmatob's user avatar
  • 6,843
7 votes
1 answer
359 views

Diameter bound for graphs: spectral and random walk versions

This question can be phrased in different settings. I will discuss a spectral formulation and the equivalent random walk version. The question came up naturally in recent work with Devriendt and ...
Stefan Steinerberger's user avatar
4 votes
1 answer
249 views

Does a subset with small cardinality represent the whole set?

Assume that we have heavy-tailed distribution $F(x)$ such that \begin{align} F(x)=\mathbb{P}[X\geq x]=x^{-0.5}. \end{align} Then, we produce $N$ independent samples $X_1,X_2,\ldots,X_N$ from this ...
Math_Y's user avatar
  • 311
2 votes
1 answer
177 views

A question about convergence of stochastic processes converging to a random walk

Consider the following random walk $(y_t)_{t \in \mathbb Z_+}$: $$y_t = y_{t-1} + u_t,\quad (u_t)_{t \in \mathbb Z_+} \overset{iid}{\sim} N(0,1), \quad (t \in \mathbb Z_+)$$ where $y_0, u_1, u_2,...$ ...
PSE's user avatar
  • 13
2 votes
1 answer
108 views

Randomly chosen walk of fixed length

Let $G=(V, E)$ be the graph on vertices $V = \{0, \cdots, k\}^n$, where vertices $(v_1, \cdots, v_n)$ and $(w_1, \cdots, w_n)$ share an edge iff $\lvert v_i - w_i\rvert \leq 1$ for all $i$. A walk of ...
S. M. Roch's user avatar
1 vote
0 answers
72 views

Reference for the asymptotic mixing time of the random walk on the cycle

In Diaconis's book Group Representations in Probability and Statistics, Chapter 3C, there are explicit computations for the mixing time of the random walk on the cycle graph $\mathbb{Z}_{p}$, with $p$ ...
Austin80's user avatar
  • 111
5 votes
1 answer
172 views

counting fixed-area closed walks on square 2d lattice

I want to count the number $N(n,A)$ of closed walks of length $2n$ on the square $2d$ lattice enclosing a signed area of $A$. These numbers refine $\sum_A N(n,A) = \left(\begin{array}{c}2n\\n\end{...
Eric Zaslow's user avatar

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