# Variant on Cutting Stock in Mathematica

So I'm pretty new to Mathematica, and am trying to learn to solve problems in a functional way. The problem I was solving was to list the ways in which I could sum elements from a list (with repetitions), so the sum is leq to some value. The code below solves this just fine.

``````i = {7.25, 7.75, 15, 19, 22};
m = 22;
getSum[l_List, n_List] := Total[Thread[{l, n}] /. {x_, y_} -> x y];
t = Prepend[Map[Range[0, Floor[m/#]] &, i], List];
Outer @@ %;
Flatten[%, ArrayDepth[%] - 2];
Map[{#, getSum[i, #]} &, %];
DeleteCases[%, {_, x_} /; x > m || x == 0];
TableForm[Flatten /@ SortBy[%, Last], 0,
``````

However, the code check a lot of unneccesary cases, which could be a problem if m is higher of the list is longer. My question is simply what would be the most Mathematica-esque way of solving this problem, concerning both efficiency and code elegancy.

-
Does not make much sense to cross-post here and on Mathematica.StackExchange - mostly the same people in both places, only most of us switched to that one. – Leonid Shifrin Mar 6 '13 at 12:08

``````recurr[numbers_, boundary_] :=

Reap[memoryRecurr[0, {}, numbers, boundary]][[2, 1]];

memoryRecurr[_, _, {}, _] := Null;

memoryRecurr[sum_, numbers_, restNumbers_, diff_] :=
(
Block[
{presentNumber = First[restNumbers], restRest = Rest[restNumbers]}
,
If[
presentNumber <= diff
,
Block[{
newNumbers = Append[numbers, presentNumber],
newSum = sum + presentNumber
},
Sow[{newNumbers, newSum}];

memoryRecurr[
newSum,
newNumbers,
restRest,
diff - presentNumber
];
]
];
memoryRecurr[sum, numbers, restRest, diff]
];

);
``````

So that

``````recurr[{1, 2, 3, 4, 5}, 7]
``````

->

``````{{{1}, 1}, {{1, 2}, 3}, {{1, 2, 3}, 6}, {{1, 2, 4}, 7}, {{1, 3},
4}, {{1, 4}, 5}, {{1, 5}, 6}, {{2}, 2}, {{2, 3}, 5}, {{2, 4},
6}, {{2, 5}, 7}, {{3}, 3}, {{3, 4}, 7}, {{4}, 4}, {{5}, 5}}
``````
-

One simple though not optimal way is :

``````sol = Reduce[Dot[i, {a, b, c, d, e}] <= m, {a, b, c, d, e}, Integers];
``````

at first try with a smaller `i`, say `i = {7.25, 7.75}` to get a feeling about whether you can use this.

You can improve speed by providing upper limits for the coefficients, like in

``````sol = Reduce[And @@ {Dot[i, {a, b, c, d, e}] <= m,
Sequence @@ Thread[{a, b, c, d, e} <= Quotient[m, i]]},
{a, b, c, d, e}, Integers]
``````
-
I'd upvote, but your total rep looks so much better now than with 10 added. – High Performance Mark Mar 6 '13 at 10:37
@HighPerformanceMark I must agree, I'll take the spiritual support. – b.gatessucks Mar 6 '13 at 10:39
Very neat code indeed! However, it seems to be incredibly slow compared to my solution, which was what I wanted to improve! – maestron Mar 6 '13 at 11:36
Ahh, someone else spoiled the elegance of your rep, so I'm upvoting now. – High Performance Mark Mar 9 '13 at 9:42
@HighPerformanceMark You could restore the old nice number ! – b.gatessucks Mar 9 '13 at 9:59