Questions tagged [bounds]
The bounds tag has no usage guidance.
192
questions
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18 views
Equivalence testing: Is it appropriate to set the equivalence bound such that I can reject H0 at alpha=0.05?
I have conducted a survey. One sample answered a binary question (answer A or B), once with and once without treatment. Now there does not seem to be a treatment effect as the proportions of answers ...
1
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0answers
17 views
Causal AR Model?
This questions is about necessary conditions (in form of inequality on coefficients) for the causality of autoregressive models. For instance, $|\phi_1| < 1$ is a necessary condition for an AR(1) ...
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0answers
15 views
How to derive this MAE error bound on the central limit theorem?
Is this derived from Chebyshev's inequality or a tail bound theorem? If not, how was it derived?
Does this require the existence of the third moment?
Does this bound suggest the normal approximation ...
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0answers
17 views
Factorial moment bound for discrete Binomial distribution
I need to compute the upped bound for the tail (survivor) probability $P(X \ge t)$ for the discrete Binomial random variable $X$. I could use Chernoff bounds, however according to this paper [1] the ...
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0answers
10 views
Theoretical lower limit of area contained in 1 sigma interval of a unimodal distribution
It is known that in case of a normal distribution, the interval of one standard deviation around the mean, $\mu \pm 1\sigma$, contains about $68\%$ of the data.
When considering an arbitrary ...
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0answers
7 views
Occam Bound using Relative Chernoff Bound
I'm having a bit of a trouble trying to understand one step in the proof of an Occam Bound (Theorem 1) in the paper "A PAC-Bayesian Tutorial with A Dropout Bound" (https://arxiv.org/pdf/1307.2118.pdf)
...
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20 views
Choosing constants for probabilistic bounds
I am studying probabilistic bounds and I have a question regarding how to choose constants from complexity classes.
Specifically, consider a biased coin which has the probability of one side $p = \...
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12 views
Time series ARDL-model interpretation
Anyone knows how the interpretation of these ARDL models? Bounds test & ECT are easy to interpretation. But I want to say something about the short run and long run effects of variables.
Long ...
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1answer
27 views
How to using the Markov Inequality to find the upper bound for $\mathbb{P}(X > 2)$ given I only have information about $X^4$?
Let $X$ be a nonnegative random variable that satisfies $\mathbb{E}[X^{4}]=4$ .
How should I calculate an estimate for the $\mathbb{P}(X \geq 2)$ using the Markov Inequality?
I tried to find a ...
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0answers
8 views
ARDL-model diagnostics, what if the model is unstable CUSUMSQ?
What if your model is unstable after performing diagnostics like the CUSUM and CUSUMSQ? Only cusumsq does not seem to be like it should be.. Can I still give an interpretation of the coefficients?
...
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2answers
43 views
Which Distribution functions with increasing hazard rate has x(1-F(x)) tending to 0 when x tends to infinity?
Let $F(x)$ be a cumulated distribution function and $f(x)$ the probability density function with an increasing failure rate (IFR or hazard rate), ie $h(z)=f(x)/(1-F(x))$ is increasing. Which ...
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1answer
38 views
Bounding the structural-risk-minimization (using Hoeffding's inequality twice)
tl;dr:
The main question is if I use an inequality that is true with a certain probability (confidence) twice, do I get the same confidence?
Original:
I've got the following exercise:
Where $e_p(h)...
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0answers
10 views
Bounded Model Prediction Error
I have a predictive model (not ML based, uses first principles from a science textbook) and I would like to have a confident bound on on the error of the predictions. I am able to collect many ...
2
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0answers
23 views
Rigid regression - show $||w||_2$ is $O(\lambda ^ -1)$
Relevant question: Ridge regression formulation as constrained versus penalized: How are they equivalent?
I've got an assignment to show that in rigid regression the coefficients vector $L_2 $ norm, $...
3
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1answer
62 views
Can you bound the third moment from the second moment?
Suppose $X$ is a random real variable with zero mean and finite second moment $\langle X^2\rangle$. Under what conditions can we give a bound (upper/lower) for the third moment $\langle X^3\rangle$?
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27 views
Are the following terminologies error/risk/marmgin/regret bounds related?
I recently come across papers with titles resembling "Error/Risk/Margin/Regret Bounds" and I can't help but wondering if there is any fundamental (mathematical) difference between these terminologies?
...
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1answer
29 views
How to compare the distributions of censored data?
Is there a way to test if the distributions of the two samples of censored data? As the data is not defined exactly, Kolmogorov-Smirnov test does not seem to be directly applicable.
Generally ...
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0answers
13 views
markov's inequality generalizability
Let $X : \Omega \rightarrow \mathbb{R}$ be a non-negative random
variable on probability space $(\Omega, \mathscr{A}, P)$ and let $c >
0$. Then: $$\mathrm{P}[X > c] \leq \frac{\mathbb{E}(X)}{...
0
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1answer
55 views
the approximation of the variance of MLE (Cramer-Rai Lower Bound)
This is in In Casella's Statistical Inferenceļ¼page 473, the approximation of the variance of MLE (Cramer-Rao Lower Bound). I really confused with the conclusion:
$Var_{\hat{\theta}}h(\hat{\theta})$ ...
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0answers
19 views
Lower bound for regression task
I have a dataset $\mathbf{X} = \{ \mathbf{x_1},\mathbf{x_2},...,\mathbf{x_n} \}, x\in\mathcal{R}$ with length $n$ and dimension $d$ along with corresponding labels $\mathbf{y}, y \in \mathcal{R}^+$.
...
3
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1answer
38 views
Upper Bound on the Wasserstein Distance
I'm interested to know if it's possible to construct an upper bound on the Wasserstein distance in terms of the Kolgomorov distance.
The Wasserstein distance can we written as
$$W_{1}\left(F, G\...
1
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1answer
46 views
Fourth moment bound for unit-variance distribution
Given that a random real variable $X$ has zero mean and variance equal to 1, can we bound its fourth moment $\langle X^4\rangle$ (assuming it exists)?
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0answers
29 views
Comparing numerical stability and computing bounds on the condition number of learned weights
I have an empirical risk minimization problem with two equivalent losses that solves it, $f_1(x; \theta_1)$ and $f_2(x ; \theta_2)$, where $x$ is the data and $\theta$ are the model parameters (in ...
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18 views
Exact inference in an approximate model as opposed to approximate inference in an exact model?
I remember hearing a while ago that it was more rigorous to perform approximate inference in an exact model as opposed to exact inference in an approximate model. I canāt now remember the reasoning ...
0
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1answer
40 views
Changing only one point of a discrete distribution to maximize variance augmentation
X has a discrete distribution with support $x1, x2, ...$ in $ {]}0,1{[}$. You have the right to change only one of the $xi$ to lead to the highest increase in variance (or, at least, a systematic ...
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0answers
33 views
Lower bound/ upper bound of standard deviation
The attached screenshot is from the 2 page of following publication
Dissolution test results.
The upper bound for standard deviation is calculated in cell B7. The formula for the calculation is also ...
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0answers
15 views
Bound on sample size- Hoeffdings inequality
Studying for my upcoming statistics exam I tried to solve the following:
In some population, each individual likes exactly one out of 30 possible music genres. In some survey, n people are drawn ...
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0answers
19 views
Sampling a proposed value with a limited range target when running MCMC [duplicate]
I want to do an MCMC algorithm and need to sample a proposed value from a proposed distribution. In the Metropolis algorithm, people usually use a normal distribution as proposal. But if the prior ...
1
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1answer
18 views
Is a range of values from an exponential distribution still exponentially distributed?
I have to generate numbers of two different exponential distribution ($e_1, e_2$) with parameters respectively $\lambda_1$ and $\lambda_2 = k \lambda_1$, with $0<k<1$.
But I also want to ...
1
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0answers
13 views
Rate of convergence of variance of kernel averages
I'm reading Hansen's (2008, p. 729) Theorem 1 where he bounds the variance of averages of the form
$$\hat\Psi(x)=\frac{1}{Th}\sum_{t=1}^T Y_t K\bigg(\frac{x-X_t}{h}\bigg)$$
given that $\{(Y_t,X_t)\}_{...
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0answers
25 views
Bounding variance of noise in a noisy voting scheme
I am looking at the accuracy of a method of human yes/no voting.
Essentially, I have the vote totals for a number of binomial processes, which represent different "elections" this method was ran on. ...
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0answers
18 views
Markov inequality and Boundness in probability
Let $\{X_n\}$ and $\{a_n\}$ be sequences of random variables and real numbers, respectively.
Say that $X_n=O_P(a_n)$ iff $\forall\epsilon>0$, $\exists N,M>0$ such that for all $n>N$, we ...
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0answers
29 views
Calculate bounds of the sum of means of a normal distribution [closed]
I am not sure whether this question really belongs on this StackExchange or whether I should post it on a different one. Please indicate if this is the case.
I am programming an algorithm (A1) and I ...
0
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1answer
28 views
Definitions of VaR (Value at Risk)
Here is the definition of VaR (Value at Risk) taken from McNeil, Alexander J., RĆ¼diger Frey and Paul Embrechts (2015), Quantitative risk
management: Concepts, techniques and tools:
$$
\textrm{VaR}_{\...
6
votes
1answer
107 views
Bounds on $P(Y, X)$ with $P(Y)$ and $P(X)$ known, as well as $X \geq Y$
Suppose you know the marginal distribution of two random variables, $P(Y)$ and $P(X)$. There are well-known bounds on the joint distribution $P(X, Y)$ that use this information.
However, suppose you ...
4
votes
1answer
43 views
Bounding data by two parallel lines with minimum distance between them
I have a set of data samples that approximately follow a straight line in 2D. I need to find two parallel lines that are spaced as close as possible such that all of the samples lie between the lines.
...
3
votes
1answer
34 views
Model/link function to deal with dependent variable in range [-1,1]?
My dependent variable, $Y$, contains values anywhere from -1 to 1 (i.e. it is bounded continuously on the range $[-1,1]$). I know that a regular OLS regression on such a variable would sometimes ...
0
votes
1answer
53 views
Is there a equivalence test for beta coefficients in regression analysis?
There are established ways to rule out medium/high effects like TOST for two-groups.
But is there a way to rule out medium/high effects in one multiple regression?
Maybe using eta-squared? What ...
0
votes
1answer
77 views
Significance test with non-normal, bounded data?
I am attempting to do a one-sample significance test to determine whether a set of data differs from a given value (0 in this case). The issues I have with these data:
Non-normally distributed data, ...
3
votes
2answers
246 views
Estimator with variance equal to Cramér-Rao lower bound in $N(x_i\theta,1)$-distribution
Let $Y_1,\ldots, Y_n$ be independent and $N(x_i\theta,1)$ distributed, with for each $Y_i$ a mean of $x_i\theta$ for known $x_1,\ldots,x_n$. In a previous section of this exercise I found that the ...
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0answers
25 views
Prove that $T(\textbf{X}) = \hat{\sigma}^{2}$ reaches the Cramer-Rao bound
Let $X_{1},X_{2},\ldots,X_{n}$ be a random sample whose distribution is given by $\mathcal{N}(\mu,\sigma^{2})$, where both parameters are unknown.
(a) Prove the normal probability density function ...
1
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0answers
37 views
Concentration inequality for max component of a multivariate Gaussian in the general case
I am looking to bound the variance of the maximum component of a vector distributed multivariate Gaussian in the general case where the Gaussian distribution has arbitrary mean and full covariance ...
0
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1answer
25 views
Bound for density of random variable with finite second moment
Let $\mathbf{X}$ be a vector-valued random variable with finite second moment and density $\rho$. Assume that $\rho$ is bounded and continuous. As $\mathbf{X}$ has finite second moment, I hope to find ...
0
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1answer
41 views
Dealing with measurements falling outside of the theoretical range/boundaries of the data
Imagine I am measuring a bounded variable (with a maximum possible value above which the data doesn't make sense) and I end up with the following dataset with my measurements and measurement errors as ...
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0answers
138 views
Regression with bounded non-normal dependent variable
I'm wondering what a suitable regression model would be to predict a bounded, continuous, non-normally distributed dependent variable from a binary explanatory variable with partially crossed data.
I'...
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0answers
20 views
References for generalization bounds?
I'm looking for references (books, papers, lecture notes etc) on generalization bounds and their proofs. Specifically, I'm looking to fully understand the technique of defining a hypothesis class (or ...
1
vote
2answers
305 views
Upper bound of normal cdf
Random variable $X\sim N(0,1)$. Show that, $P(X\geq c) \leq e^{-ct+ \frac{t^{2}}{2}}$ for $c>0$ and for all $t$ in $R$.
I found that $P(X\geq c) = \Phi(-c)$ where $\Phi(x)=\int_{-\infty}^{x}\phi(u)...
0
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1answer
32 views
Getting From Concentration Inequality to Interval Length
I've seen this used some times and I would like to ask what steps are taken on the way to getting there:
E.g. assuming bounded variance, we can use Chebyshev concentration inequality: for any $t>0$...
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votes
6answers
2k views
Linear regression when Y is bounded and discrete
The question is straightforward: Is it appropriate to use linear regression when Y is bounded and discrete (e.g. the test score 1~100, some pre-defined ranking 1~17)? In this case, is it "not good" to ...
3
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2answers
45 views
Bounds on Expectation $E[A(B-C)^2]$
[This question has been edited for more given conditions].
Given possibly correlated random variables $A,B,C$, I want to find the best upper bound for $E[A(B-C)^2]$ given the following:
$E[A(B-C)]$
$...
