Your question is quite vague as written, and there are different interpretations of "overloading" that would change my answer. However, if you are talking about overloading your own functions with regard to different types (heads) and argument patterns, then by all means, take advantage of Mathematica's tightly integrated pattern matching.

To provide a practical example, I shall use this solution of mine. For reference:

```
f[k_, {}, c__] := If[Plus[c] == k, {{c}}, {}]
f[k_, {x_, r___}, c___] := Join @@ (f[k, {r}, c, #] & /@ Range[0, Min[x, k - Plus[c]]])
```

If I rewrite `f`

without pattern matching and call it `g`

:

```
g = Function[{k, L, c},
If[L === {},
If[Tr@c == k, {c}, {}],
Join @@ (g[k, Rest@L, Append[c, #]] & /@ Range[0, Min[First@L, k - Tr@c]])
]
];
```

I feel that this is less clear, and it is certainly less convenient to write. I had to use explicit `Rest`

and `First`

functions, and I had to introduce `Append`

as I cannot accommodate a variable number of arguments. This also necessitates a dummy third argument in use: `{}`

.

Timings show that the original form is also considerably faster:

```
f[12, {1, 5, 8, 10, 9, 9, 4, 10, 8}]; // Timing
g[12, {1, 5, 8, 10, 9, 9, 4, 10, 8}, {}]; // Timing
```

{0.951, Null}

{1.576, Null}

In response to Timo's answer, I feel it is of value to share my timing results, as they differ from his. (I am using Mathematica 7 on Windows 7.) Further, I believe he complicated the DownValues version beyond the function of the Switch version.

First, my timings of his functions as written, but using a range of values:

```
Array[switchFunc2, 1*^6]; // Timing
Array[overloadFunc2, 1*^6]; // Timing
```

{1.014, Null}

{0.749, Null}

So even as written, the DownValues function is faster for me. But the second condition is not needed:

```
ClearAll[overloadFunc2]
overloadFunc2[a_ /; a < 5] := 6;
overloadFunc2[a_] := 4;
Array[overloadFunc2, 1*^6]; // Timing
```

{0.546, Null}

Of course, in the case of such a simple function one could also use `If`

:

```
ifFunc[a_] := If[a < 5, 6, 4]
Array[ifFunc, 1*^6]; // Timing
```

{0.593, Null}

And if this is written as a pure function which Mathematica compiles inside Array:

```
ClearAll[ifFunc]
ifFunc = If[# < 5, 6, 4] &;
Array[ifFunc, 1*^6]; // Timing
```

{0.031, Null}