Opencup: GP of Baltics has just finished. We are curious, what are the normal solutions for A, B and F?
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F: Dynamic programming d[mask] = (minimal number of subsets one can split mask into, minimal sum in the last subset).
A: Define convolution conv(d)[mask] = sum {d[x] | x is submask of mask}. One can calculate conv and conv^-1 in O(n2^n). Let clique[mask] = 1 if mask is clique, 0 otherwise. One need to check conv^-1(conv(clique)^a * conv(antilclique)^b)[full mask] != 0 -- then one can split graph in no more than a cliques and b anticliques. This can be done in O(n2^n) overall.
Can you explain in detail, why "conv^-1(conv(clique)^a * conv(antilclique)^b)[full mask] != 0"?
"conv^-1(conv(clique)^a * conv(antilclique)^b)[full mask]" is a number of ways to choose (not necessarily distinct, possible intersecting) a cliques and b anticliques covering entire graph (i.e. all vertices).
For the fixed a and b, I can calculate conv^-1(conv(clique)^a * conv(antilclique)^b) in O(n2^n) easily. But how to make it O(n2^n) overall?
You can use two properties of the problem to speed it up: 1. in a row (or a column) ones will form an interval 2. you only need last element of conv^-1(...), not the entire result
Minor addition to ikatanic answer: last element (in fact, any single element) of conv and conv^-1 can be calculated in O(2^n).
Could you please give some more details or your code for F.
Can some1 describe a solution for C in details more or less?
Is it possible to see solutions or editorial of this contest ?
If yes, please share link.
I want to see solution of 'F'. problem link is here. Thanks in advance