# Trouble using recursive function on list with Mathematica

I am trying to write a recursive function in Mathematica whose argument is a list. If the list is of length 1, it returns a value. If not, the function breaks it down into several smaller lists according to some rules and the function is then evaluated on those lists. Here is my code :

``````f[u_] :=
(Print["u : ", u];
If[Length[u] == 1,
Subscript[T, u[[1]]] - Subscript[\[Lambda], 1]^u[[1]],
v = SetPartitions[Length[u]];
aux[v_] := Sum[u[[v[[i]]]], {i, 1, Length[v]}];
res = Map[aux, v, {2}];
res = Drop[res, -1];
Print[res];
Product[Subscript[T, u[[i]]], {i, 1, Length[u]}] -
Sum[f[res[[i]]], {i, 1, Length[res]}]]
)
``````

It works fine for

``````f[{1, 2}]
``````

or

``````f[{3}]
``````

but it does not work anymore when the list is of length 3 or more, like for example

``````f[{1,1,2}].
``````

Here is the error message I get :

``````f[{1, 1, 2}]

u : {1,1,2}
{{4},{1,3},{2,2},{3,1}}
u : {4}
u : {1,3}
{{4}}
u : {4}

Part::partw: Part 3 of {{4}} does not exist. >>

u : {{4}}[[3]]
{{{{7}}}}
u : {{{7}}}

Part::partw: Part 4 of {{{{7}}}} does not exist. >>

u : {{{{7}}}}[[4]]
{{{{{{11}}}}}}
u : {{{{{11}}}}}
``````

Does anyone have an idea what to do ? I guess it has something to do with the variables res being overwritten, but I don't know how to get round the problem....

Thank you !

You are correct, `res` is being overwritten. The solution is to localise `res` to each call of function `f` using a module like so:

``````f[u_] := Module[{res},
Print["u : ", u];
If[Length[u] == 1,
Subscript[T, u[[1]]] - Subscript[\[Lambda], 1]^u[[1]],
v = SetPartitions[Length[u]];
aux[v_] := Sum[u[[v[[i]]]], {i, 1, Length[v]}];
res = Map[aux, v, {2}];
res = Drop[res, -1];
Print[res];
Product[Subscript[T, u[[i]]], {i, 1, Length[u]}] -
Sum[f[res[[i]]], {i, 1, Length[res]}]]]
``````
• Thank you, I didn't know about modules ! I've also found an alternative way of getting round the problem by removing the loop `Sum[f[res[[i]]], {i, 1, Length[res]}]` and simply replacing it by `Total[Map[f, res]]`. Thanks again for your suggestion though, it will be useful to me sometime ! – user5082172 Jul 5 '15 at 15:47