# Longest chain that can be arranged

I found this problem somewhere in a contest and haven't been able to come up with a solution yet.

I have the positive integers. I have to find longest subset that among each two neighbour elements one divides another.

What I'm doing is: I'm creating the graph.Then I'm connecting nodes in which numbers divides each others. After that I'm using `DFS` (one node can be connected with two nodes).

But not all test cases are true in system. Do I have to sort the array before using `DFS`? Maybe there is special (Dynamic) algorithm?

Failing test cases:

``````N = 5
1 1 3 7 13
``````

My code gives the output `4`. But if I `arrange` this array like this:

``````3 1 7 1 13
``````

The output is 5 and it's the true answer.

I also used recursive method. But I need something faster.

• `But not all test cases are true` Please specify failing test case. Aug 11, 2015 at 10:44
• The size of the problem suggests that an algorithm of O(2^n) scale is acceptable, probably multiplying n or n^2. Probably dynamic programming with a bitset dimension and the other dimension is the latest added element. Aug 11, 2015 at 10:58
• If I have the array `1, 2, 3` I can `arrange` it and have better solution. Aug 11, 2015 at 12:42

You forget to reinit some variables: `used` and `kol`. Moreover DFS doesn't restore `used[i]` at end for next calls.

Try to avoid global variables, it make the code less clear. Try also to reduce the scope of variable.

Code may look at something like:

``````void DFS(int (&used), const int (&m), int c, int& maxn, int k, int v) {
used[v] = 1;
k += 1;
if(k > maxn)
maxn = k;
for(int i = 0; i < c; ++i) {
if(!used[i] && m[v][i] == 1) {
DFS(used, m, c, maxn, k, i);
}
}
used[v] = 0;
}
``````

and in main:

``````int m;
memset(m, 0, sizeof(m));

for(int i = 0; i < c; ++i) {
for(int j = i + 1; j < c; ++j) {
if( (a[i] % a[j] == 0) || (a[j] % a[i] == 0) ) {
m[i][j] = m[j][i] = 1; // Creating 2D array
}
}
}

int maxn = 0;
for(int i = 0; i < c; ++i) {
int used;
int k = 0;
memset(used, 0, sizeof(used));
DFS(used, m, c, maxn, k, i);
}
std::cout << maxn << std::endl;
``````

Live Demo

Code may be simplified even more (use `vector`, ...)

This is longest path, slightly disguised. We can solve this problem as longest path by preparing a graph where two vertices are adjacent if and only if they satisfy a divisibility relation. See below the horizontal rule for a pointer to the intended answer.

The reduction is (roughly), given an undirected graph in which we would like to find the longest simple path, assign each vertex a distinct prime number. Emit these prime numbers, together with, for each edge, the semiprime that is the product of its endpoints. (We also need two more prime numbers and their 2|V| products with the vertex primes to preserve the objective additively.)

For example, if we have a graph

``````*---*
|  /|
| / |
|/  |
*---*,
``````

then we can label

``````2---3
|  /|
| / |
|/  |
5---7,
``````

and then the input is

``````2, 3, 5, 7,  # vertices
2*3, 2*5, 3*5, 3*7, 5*7,  # edges
11*2, 11*3, 11*5, 11*7,  # sentinels at one end
2*13, 3*13, 5*13, 7*13,  # sentinels at the other end
``````

and (e.g.) the longest path `2, 3, 5, 7` corresponds to the longest sequence `11*2, 2, 2*3, 3, 3*5, 5, 5*7, 7, 7*13` (and three other variants involving reversal and swapping `11` and `13`).

Longest path is NP-hard, so nhahtdh's comment about an O(2^n poly(n))-time dynamic program is right on the money -- see this question and the accepted answer: Longest path in unweighted undirected graph.

• I don't understand `assign each vertex a distinct prime number.` I'm not really good in English. So, please can you give some example of the graph for the array `1,1,3,5,7`. Aug 13, 2015 at 12:33
• @James Mostly this answer is just supporting my equivalence claim; you want to make the divisibility graph and then use the linked algorithm to solve longest path. Aug 13, 2015 at 15:27
• I get `Time Limit`. My friend who solved the problem said that we have to use dynamic programming with bit masks. Aug 14, 2015 at 13:04
• @James That's what the linked answer does. Aug 14, 2015 at 13:18
• Thanks a lot. I've read about the bit masks and dynamic programming. Aug 14, 2015 at 18:05