# Fast way to Implement a Loop

I am trying to compute a summation in Julia using the following loop.

``````  for (k_j,kk) = enumerate(k)
value=0
for (s_j,ss) = enumerate(s), (z_j,zz) = enumerate(z), (w_j,ww) = enumerate(w)
value=value+V₀[w_j,z_j,k_j,s_j]*H[s_i,s_j]*mat[w_j,w_i,z_j,z_i]*G[z_i,z_j]
end
end
``````

Which is basically calling over specific entries of matrices and adding them up. I've tried to make this faster and leaner with a reduce or mapreduce, but haven't been able to get the code off the ground.

Any suggestion is appreciated, Thanks

• There's nothing slow about loops in Julia, as long as they are inferrable (see docs.julialang.org/en/latest/manual/performance-tips and put things in functions). But you may also be interested in packages such as TensorOperations. Dec 17, 2018 at 21:13
• Did you put this in a function? Dec 19, 2018 at 0:42
• you should provide a minimal working example rather that copy-paste your production code. What is `k`, `s`, `z`. The same applies to your "answer" below. Please edit your question to make it usable. Dec 19, 2018 at 11:33

## 1 Answer

I solved it with something like this

``````     y=gridmake(1:ssize,1:zsize,1:wsize)
ysize=ssize*zsize*wsize
for (k_j,kk) = enumerate(k)
# value=0
# for (s_j,ss) = enumerate(s), (z_j,zz) = enumerate(z), (w_j,ww) = enumerate(w)
#              value=value+V₀[w_j,z_j,k_j,s_j]*H[s_i,s_j]*mat[w_j,w_i,z_j,z_i]*G[z_i,z_j]
#  end
F[k_j]=(mapreduce(y_i -> V₀[y[y_i,3],y[y_i,2],k_j,y[y_i,1]]*H[s_i,y[y_i,1]]*mat[y[y_i,3],w_i,y[y_i,2],z_i]*G[z_i,y[y_i,2]], + ,1:ysize))
end
``````

Anyway, I'm open to more efficient suggestions