37 lines
1.2 KiB
MiniZinc
37 lines
1.2 KiB
MiniZinc
% Products to be produced
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enum Products;
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% profit per unit for each product
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array[Products] of int: profit;
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% Resources to be used
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enum Resources;
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% amount of each resource available
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array[Resources] of int: capacity;
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% units of each resource required to produce 1 unit of product
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array[Products, Resources] of int: consumption;
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constraint assert(forall (r in Resources, p in Products)
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(consumption[p,r] >= 0), "Error: negative consumption");
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% bound on number of Products
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int: mproducts = max (p in Products)
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(min (r in Resources where consumption[p,r] > 0)
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(capacity[r] div consumption[p,r]));
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% Variables: how much should we make of each product
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array[Products] of var 0..mproducts: produce;
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array[Resources] of var 0..max(capacity): used;
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% Production cannot use more than the available Resources:
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constraint forall (r in Resources) (
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used[r] = sum (p in Products)(consumption[p, r] * produce[p])
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);
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constraint forall (r in Resources) (
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used[r] <= capacity[r]
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);
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% Maximize profit
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solve maximize sum (p in Products) (profit[p]*produce[p]);
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output [ "\(p) = \(produce[p]);\n" | p in Products ] ++
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[ "\(r) = \(used[r]);\n" | r in Resources ];
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