A Short Look at Several Esoteric Methods

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Title: A Short Look at Several Esoteric Methods

1
A Short Look at Several Esoteric Methods

2
The Bootstrap

Bootstrapping is a relatively new statistical
technique (Bradley Efron, 1979)
It asks the researcher a simple question
Which do you have more confidence in
The assumption that the Probability Density
Function of the statistic is normally
distributed,
or
Your Data

3
How to Bootstrap

Bootstrapping is a technique that utilizes
computational power in place of mathematical
rigor.
When we bootstrap a statistic, we treat the
sample as if it were a population and draw a
random sample, with replacement, from it.
We then run the statistical test on that sample
and record the results.
We repeat the process a bunch of times say 1000.

4
The Central Limit Theorem

By resampling, we are making the following claim
My data set provides me a better estimate of the
sampling distribution of the statistic in
question than the assumption of normality.
In large samples, the Central Limit Theorem says
that the sampling distribution of the sample mean
will approximate a normal distribution.
How large is large?
Statisticians often use ngt30
That seems small to me.

5
When to bootstrap

When you have reason to doubt that the sampling
distribution of your statistic is normally
distributed.
When there is no theoretical sampling
distribution
E.g. difference between two sample medians
When your statistic is inherently biased
E.g ratio of two sample means

6
The Empirical Density Function

The Central Limit Theorem says that, given this
acceptably large sample, the probability density
function (the sampling distribution) of the
statistic will be normally distributed.
Bootstrapping says that it doesnt want to assume
anything about the sampling distribution of the
statistic and would rather use the sample data to
empirically estimate the sampling distribution.
So what do you trust
a general assumption that we universally apply
without real inspection
or your data?

7
How to Bootstrap

Obtain sample, say n observations
Using the sample, draw a resample of n
observations from the n original values (using
replacement)
This will generate a sample with likely some
observations more than once, and some others not
at all.
Calculate the statistic you are interested in.
Repeat a large number of times I recommend 1000.

8
Bootstrap results

Using the bootstrapped estimates, construct
confidence intervals (CI) about the statistic you
are interested.
We use confidence intervals rather than test
statistics
So if 0.0 (or some other value) does not fall
within out 95 CI, then we can conclude that the
true ? is different from 0.0 (or the other value)
E.g if we bootstrap a regression model and
calculate a CI for the Bs, we can conclude that X
is significant if 0.0 does not fall inside its
95 CI.

9
Types of Confidence intervals