How exactly should such a Dispatch table be constructed?

Say you have a graph (network) consisting of `n`

vertices in a loop:

```
In[1] := rules =
With[{n = 1000},
Table[ToString@i -> ToString@Mod[i + 1, n],
{i, 0, n - 1}]];
```

You want to traverse the graph by applying these rewrite rules to an initial vertex. You can perform a single step with `i /. rules`

but this is doing a linear search over `rules`

trying to find the `Rule`

with a lhs that matches the expression `i`

. So applying the rules many times is slow:

```
In[2] := Nest[# /. rules &, 0, 10000] // AbsoluteTiming
Out[2] = {1.7880482, 0}
```

Mathematica's `Dispatch`

allows us to precompute a hash table that turns the linear lookup into a constant-time lookup:

```
In[3] := dispatch = Dispatch[rules];
```

Applying the dispatch table many times obtains the same answer orders of magnitude faster:

```
In[4] := Nest[# /. dispatch &, 0, 10000] // AbsoluteTiming
Out[4] = {0.0550031, 0}
```

In which cases would such an approach be recommended?

When:

You are doing many rewrites with the same set of rewrite rules, and

The set of rewrite rules contains at least 30 rules with constant lhs patterns, i.e. composed only from symbols, sequences and literals.

How does it really work?

It just builds a hash table with the constant patterns as keys.

Are there other methods for optimizing of the Main Loop?

The most effective general approach is to rewrite the rules in another language. In particular, languages of the ML family (SML, OCaml and F#) have very efficient pattern match compilers and garbage collectors so they are able to rewrite terms much faster than Mathematica's general purpose rewriter does.

Parallel Computing,Compile,GPU Computing,Lightweight Grid Client, etc – Dr. belisarius Mar 14 '11 at 17:41Mathematica's main loop itself. It is inspired by Timo's remark about "significant speed increase over normal evaluation". – Alexey Popkov Mar 14 '11 at 18:33