Bootstrapping, in phylogenetics as elsewhere, doesn't improve the quality of whatever you're trying to estimate (a tree in this case). What it does do is give you an idea of **how confident you can be** about the result you get from your original dataset. A bootstrap analysis answers the question "If I repeated this experiment many times, using a different sample each time (but of the same size), how often would I expect to get the same result?" This is usually broken down by edge ("How often would I expect to see this particular edge in the inferred tree?").

## Sampling Error

More precisely, bootstrapping is a way of approximately measuring the *expected level of sampling error* in your estimate. Most evolutionary models have the property that, if your dataset had an infinite number of sites, you would be *guaranteed* to recover the correct tree and correct branch lengths*. But with a finite number of sites this guarantee disappears. What you infer in these circumstances can be considered to be the correct tree *plus sampling error*, where the sampling error tends to decrease as you increase the sample size (number of sites). What we want to know is how much sampling error we should *expect* for each edge, given that we have (say) 1000 sites.

## What We Would Like To Do, But Can't

Suppose you used an alignment of 1000 sites to infer the original tree. If you somehow had the ability to sequence as many sites as you wanted for all your taxa, you could extract another 1000 sites from each and perform this tree inference again, in which case you would probably get a tree that was similar but slightly different to the original tree. You could do this again and again, using a fresh batch of 1000 sites each time; if you did this many times, you would produce a *distribution* of trees as a result. This is called the *sampling distribution* of the estimate. In general it will have highest density near the true tree. Also it becomes more concentrated around the true tree if you increase the sample size (number of sites).

What does this distribution tell us? It tells us how likely it is that any given sample of 1000 sites generated by this evolutionary process (tree + branch lengths + other parameters) will actually give us the true tree -- in other words, how confident we can be about our original analysis. As I mentioned above, this probability-of-getting-the-right-answer can be broken down by edge -- that's what "bootstrap probabilities" are.

## What We Can Do Instead

We don't actually have the ability to magically generate as many alignment columns as we want, but we can "pretend" that we do, by simply regarding the original set of 1000 sites as a pool of sites from which we draw a fresh batch of 1000 sites *with repetition* for each replicate. This generally produces a distribution of results that is different from the true 1000-site sampling distribution, but for large site counts the approximation is good.

* That is assuming that the dataset was in fact generated according to this model -- which is something that we cannot know for certain, unless we're doing a simulation. Also some models, like uncorrected parsimony, actually have the paradoxical quality that under some conditions, the more sites you have, the *lower* the probability of recovering the correct tree!