enumerating all partitions in Mathematica

Like `Select[Tuples[Range[0, n], d], Total[#] == n &]`, but faster?

Update

Here are the 3 solutions and plot of their times, IntegerPartitions followed by Permutations seems to be fastest. Timing at 1, 7, 0.03 for recursive, FrobeniusSolve and IntegerPartition solutions respectively

```partition[n_, 1] := {{n}};
partition[n_, d_] :=
Flatten[Table[
Map[Join[{k}, #] &, partition[n - k, d - 1]], {k, 0, n}], 1];
f[n_, d_, 1] := partition[n, d];
f[n_, d_, 2] := FrobeniusSolve[Array[1 &, d], n];
f[n_, d_, 3] :=
Flatten[Permutations /@ IntegerPartitions[n, {d}, Range[0, n]], 1];
times = Table[First[Log[Timing[f[n, 8, i]]]], {i, 1, 3}, {n, 3, 8}];
Needs["PlotLegends`"];
ListLinePlot[times, PlotRange -> All,
PlotLegend -> {"Recursive", "Frobenius", "IntegerPartitions"}]
Exp /@ times[[All, 6]]
```
-

``````In[21]:= g[n_, d_] := Select[Tuples[Range[0, n], d], Total[#] == n &]

In[22]:= Timing[g[15, 4];]

Out[22]= {0.219, Null}
``````

Try FrobeniusSolve:

``````In[23]:= f[n_, d_] := FrobeniusSolve[ConstantArray[1, d], n]

In[24]:= Timing[f[15, 4];]

Out[24]= {0.031, Null}
``````

The results are the same:

``````In[25]:= f[15, 4] == g[15, 4]

Out[25]= True
``````

You can make it faster with IntegerPartitions, though you don't get the results in the same order:

``````In[43]:= h[n_, d_] :=
Flatten[Permutations /@ IntegerPartitions[n, {d}, Range[0, n]], 1]
``````

The sorted results are the same:

``````In[46]:= Sort[h[15, 4]] == Sort[f[15, 4]]

Out[46]= True
``````

It is much faster:

``````In[59]:= {Timing[h[15, 4];], Timing[h[23, 5];]}

Out[59]= {{0., Null}, {0., Null}}
``````

Note you only need the call to Permutations (and Flatten) if you actually want all the differently ordered permutations, i.e. if you want

``````In[60]:= h[3, 2]

Out[60]= {{3, 0}, {0, 3}, {2, 1}, {1, 2}}
``````

``````In[60]:= etc[3, 2]

Out[60]= {{3, 0}, {2, 1}}
``````
-
``````partition[n_, 1] := {{n}}
partition[n_, d_] := Flatten[ Table[ Map[Join[{k}, #] &, partition[n - k, d - 1]], {k, 0, n}], 1]
``````

This is even quicker than FrobeniusSolve :)

Edit: If written in Haskell, it's probably clearer what is happening - functional as well:

``````partition n 1 = [[n]]
partition n d = concat \$ map outer [0..n]
where outer k = map (k:) \$ partition (n-k) (d-1)
``````
-