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Given a simple undirected graph containing N vertices numbered 1 to N, each vertex containing a digit from {1,2,..7}. Starting at the vertex 1 with an empty string S, we travel through some vertices (with no limitations) to the vertex N. For every vertex on the way, we add the respective digit to the right of the string S. At last we get S as a decimal integer. You are requested to find such a way satisfying S is divisible by all of its digits, and the sum of digits of S must be as small as possible.

Input

There are several test cases (fifteen at most), each formed as follows:

The first line contains a positive integer N (N ≤ 100).
The second line contains N digits (separated by spaces), the i-th digit is the value of the i-th vertex.
N last lines, each contains N values of {0, 1} (separated by spaces), the j-th value of the i-th line is equal to 1 if there is an edge connecting two vertices (i, j), otherwise 0.

The input is ended with N = 0.

Output

For each test case, output on a line the minimum sum of digits found, or -1 if there's no solution.

example

Input: 4

1 2 1 4

0 1 1 1

1 0 0 1

1 0 0 1

1 1 1 0

Output: 7

please guide me

there can be self loops and cycles such that node 1 and node N can be visted any number of times

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1  
Is this homework? If so, you should use the homework tag. What have you done so far? –  James Custer May 7 '12 at 17:26
    
not a homework ...just a programming problem. Actually i figured that if the last set contains a 5 then there can not be any even number.And also in case if the number contains a 4 then last 2 digits should be divisble by 4. So i started traversing the graph from the end.And for 7 as I used octal divisibility.My program works but it takes a lot of time to evaluate for higher values of N.So please help me with a faster method –  user1380294 May 7 '12 at 17:29

3 Answers 3

First mathematically find the LCM of the numbers given in the set.

lemme paraphrase the scenario .... given a set of numbers... find the LCM then traverse the vetices in such a way that the their path makes the number .Since its LCM it is number whose sum is mininum

For set {0,1,2,3,4} LCM is 12 so travers from 1 to 2 for set {0,1,2,3,4,5,6,7} LCM is 420..(I think i am right)

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0 is not in the set –  user1380294 May 8 '12 at 7:49
    
but the size of the string can be very large in that case finding LCM is extremely difficult and then traversing the graph with loops will exceed time limit – –  user1380294 May 8 '12 at 8:50
    
In the question it was given that the we need to form the string based on the constraints given... okay so if given number n is very large suppose 1,2,3,4,5,6,7,8,90,10,11,12,13,14,15 then LCM of 2,4,8 is 8 and 3,6,12 is 12 and 5,10 is 10 and 7,14 is 14 and we are left with 7,11,13,12,10,14,8 so taking LCM is mostly dependent on numbers of primes number less than N others are grouped like the way they are grouped above.. and second thing when N is very large your question seems to be an interesting optimization –  Imposter May 8 '12 at 9:03
    
N is the number of nodes and value of each node will be from the set {1,2,3,4,5,6,7}.I think you misunderstood the question –  rakesh May 8 '12 at 9:18

Use the A* search algorithm, where the "cost" is the sum of the digits, and divisibility determines which edges you can traverse.

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problem is divisibility by 7 –  rakesh May 9 '12 at 19:58
    
actually i already used A* but time complexity is very high because of loops and self loops –  rakesh May 9 '12 at 20:01
    
Right, so A* is polynomial when the search space is a tree, there is a single goal state, and the heuristic function h is (to paraphrase) not far off. Do you need it less polynomial, or do you experience exponential timing? –  Yusuf X May 9 '12 at 22:31
    
i am experiencing exponential timing because of loops. –  rakesh May 10 '12 at 3:46
    
how about labelling all nodes with minimum distance (in terms of smallest sum) to N and including that in the cost? –  andrew cooke May 10 '12 at 6:39

If given graph is transformed to some other graph, where cycles are not allowed, this problem can be solved with Dijkstra's algorithm.

To do this, let's start with string divisibility by 7. Look at this sequence: 1, 10, 100, ... (mod 7). Since 7 is a prime number, 107-1 = 1 (mod 7) because of Fermat's little theorem. Which means 1, 10, 100, ... (mod 7) sequence is periodic and period is 6. This will be used to transform the graph and also this allows to recursively compute Sn (mod 7) using Sn-1 (mod 7): Sn = Sn-1 + 10n%6 * n_th_digit (mod 7).

It's necessary to start shortest path search from node N because this path may be ended at one of the several nodes of the transformed graph. Also this allows to determine quickly (using first 2 nodes of the path), if it is allowed to visit node "5", node"4", and other "even" nodes.

Algorithm's open set (the priority queue) should contain the priority itself (sum of digits) as long as 3 additional bits and 3 remainders: is "4" allowed, is "3" visited, is "7" visited, S % 3, S % 7, and S.length % 6.

Graph should be transformed as follows. Each vertex is expanded to 3 vertexes, one is allowed only for S%3==0, others - for S%3==1 and S%3==2. Then each vertex is expanded to 7 (for S%7), and then each vertex is expanded to 6 (for S.length % 6). It is possible to fit all these expansions to the original graph: just add a 3D array (size 3*7*6) of back-pointers to each node. While searching for the shortest path, the non-empty back-pointers determine algorithm's closed set (they disallow cycles). When shortest path is found, back-pointers allow to reconstruct the sequence of nodes in this path. And the moment when shortest path is found is determined by visiting node 1 with (node_3_not_visited || S%3==0) && (node_7_not_visited || S%7==0).

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but my problem needs to handle loops –  user1380294 May 10 '12 at 11:06
1  
@user1380294: this solution uses loopless modified graph to find the shortest path. But if you map this graph back to the original graph, you have a graph with loops. –  Evgeny Kluev May 10 '12 at 12:27
    
Then each vertex is expanded to 7 (for S%7), and then each vertex is expanded to 6 (for S.length % 6) what does it mean? –  rakesh May 11 '12 at 3:40
    
@rakeshkumar: this means each vertex in the original array is represented as a 3d array of vertexes of size 3*6*7. Edges, coming from some neighbor vertex, are also split into 126 edges, coming to each of these vertexes. But only one of these edges is allowed for given path: it must match attributes S % 3, S % 7, and S.length % 6 of the path. In practice, doing this explicitly is possible, but too expensive, so we may use original edges and original vertexes, each vertex with a 3d array of back-pointers. –  Evgeny Kluev May 11 '12 at 10:49

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