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# How to find which elements are in the bag, using Knapsack Algorithm [and not only the bag's value]?

There I have a code, which calculates the optimal value by knapsack algorithm (bin packing NP-hard problem):

``````int Knapsack::knapsack(std::vector<Item>& items, int W)
{
size_t n = items.size();
std::vector<std::vector<int> > dp(W + 1, std::vector<int>(n + 1, 0));
for (size_t j = 1; j <= n; j++)
{
for ( int w = 1; w <= W; w++)
{
if (items[j-1].getWeight() <= w)
{
dp[w][j] = std::max(dp[w][j-1], dp[w - items[j-1].getWeight()][j-1] + items[j-1].getWeight());
}
else
{
dp[w][j] = dp[w][j - 1];
}
}
}
return dp[W][n];
}
``````

Also I need the elements, included to pack, to be shown. I want to create an array, to put there an added elements. So the question is in which step to put this addition, or maybe is there any other more efficient way to do it?

Question: I want to be able to know the items that give me the optimal solution, and not just the value of the best solution.

PS. Sorry for my English, it's not my native language.

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It's a little hard to understand your question, but I guess you want to be able to know the items that give you the optimal solution, and not just the value of the best solution? – Rob Neuhaus Sep 20 '11 at 17:51
yes, u're absolutely right. – prvit Sep 20 '11 at 17:54

getting the elements you pack from the matrix can be done using the data form the matrix, without storing any additional data.
pseudo code:

``````line <- W
i <- n
while (i> 0):
if dp[line][i] - dp[line - weight(i)][i-1] == value(i):
the element 'i' is in the knapsack
i <- i-1 //only in 0-1 knapsack
line <- line - weight(i)
else:
i <- i-1
``````

The idea behind it: you iterate the matrix, if the weight difference is exactly the element's size, it is in the knapsack.
If it is not: the item is not in the knapsack, go on without it.

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It's really nice pseudo code. But using it i can get only the weight of added element, and i need their name also. I'm thinking about doint the same, but to change array `dp` to an `Item` type. What's your point about it? – prvit Sep 20 '11 at 18:23
@nightcrime: Using this alorithm, you know EXACTLY which element is in the bag, you can create a container before you start this algorithm [let's call it `bag`, and while running the algorithm: if `dp[line][i] - dp[line][i-1] == value(i)` then `bag.add(items[i-1])`, where `items` is the input vector of items to your knapsack function. At the end of the algorithm, `bag` will contain all the elements in the bag, and only them. – amit Sep 20 '11 at 18:28
:I've got it. But it works only and only if i've added only 1 element. In other ways the statement dp[line][i] - dp[line][i-1] == value(i) never is true.( – prvit Sep 20 '11 at 18:48
@nightcrime: I am not sure I am following you, the knapsack algorithm, and so does my answer, doesn't allow you to add the item 'i' to the bag twice [or 3/4/.. times]. if you add elements i,j,k: this algorithm will find all of them, since `dp[line][i]-dp[line][i-1] == value(i)`, `dp[line][j]-dp[line][j-1] == value(j)` and `dp[line][k]-dp[line][k-1] == value(k)`. – amit Sep 20 '11 at 18:55
I want to clarify one thing: `value(i)` in my example is `items[i-1].getWeight()` isn't it? – prvit Sep 20 '11 at 19:04
``````line <- W
i <- n
while (i> 0):
if dp[line][i] - dp[line - weight(i) ][i-1] == value(i):
the element 'i' is in the knapsack
cw = cw - weight(i)
i <- i-1
else if dp[line][i] > dp[line][i-1]:
line <- line - 1
else:
i <- i-1
``````

Just remember how you got to dp[line][i] when you added item i

``````dp[line][i] = dp[line - weight(i) ][i - 1] + value(i);
``````
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Here is a julia implementation:

``````function knapsack!{F<:Real}(
selected::BitVector,    # whether the item is selected
v::AbstractVector{F},   # vector of item values (bigger is better)
w::AbstractVector{Int}, # vector of item weights (bigger is worse)
W::Int,                 # knapsack capacity (W ≤ ∑w)
)

# Solves the 0-1 Knapsack Problem
# https://en.wikipedia.org/wiki/Knapsack_problem
# Returns the assigment vector such that
#  the max weight ≤ W is obtained

fill!(selected, false)

if W ≤ 0
return selected
end

n = length(w)
@assert(n == length(v))
@assert(all(w .> 0))

###########################################
# allocate DP memory

m = Array(F, n+1, W+1)
for j in 0:W
m[1, j+1] = 0.0
end

###########################################
# solve knapsack with DP

for i in 1:n
for j in 0:W
if w[i] ≤ j
m[i+1, j+1] = max(m[i, j+1], m[i, j-w[i]+1] + v[i])
else
m[i+1, j+1] = m[i, j+1]
end
end
end

###########################################
# recover the value

line = W
for i in n : -1 : 1
if line - w[i] + 1 > 0 && m[i+1,line+1] - m[i, line - w[i] + 1] == v[i]
selected[i] = true
line -= w[i]
end
end

selected
end
``````
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