SPOJ 370 - Ones and zeros (ONEZERO)

I am trying to solve SPOJ problem "Ones and zeros":

Certain positive integers have their decimal representation consisting only of ones and zeros, and having at least one digit one, e.g. 101. If a positive integer does not have such a property, one can try to multiply it by some positive integer to find out whether the product has this property.

My approach to this problem was simply doing BFS. Taking string containing only `'1'` and then doing BFS with it and at each step adding `'1'` and `'0'`. Keeping track of number in string form and remainder till now. When remainder is zero, the number was found.

My problem is: My code is taking too long for test cases e.g. 9999 or 99999. How can I improve the runtime of the algorithm?

``````// Shashank Jain
/*
BFS
*/
#include <iostream>
#include <cstdio>
#include <cstring>
#include <climits>
#include <string>
#include <algorithm>
#include <vector>
#include <cmath>
#include <queue>
#include <stack>
#define LL long long int
using namespace std;
LL n;
string ans;

void bfs()
{
string str,first,second;
if(n==1)
{
ans=str;
return;
}
queue<pair<string,LL> >q; // pair of STRING(number) and long long int
// (to hold remainder till now)
pair<string,LL>p;
p=make_pair(str,1);
q.push(p);
LL rem,val,temp;
while(q.empty()==0)
{
p=q.front();
q.pop();
str=p.first;
val=p.second;
if(val==0)  // remainder is zero means this is number
{
ans=str;
return ;
}
// adding 1 to present number
temp=val*10+1;
rem=(temp)%n;
firstone=str+'1';
p=make_pair(firstone,rem);
q.push(p);
// adding 0 to present number
temp=val*10+0;
rem=(temp)%n;
secondone=str+'0';
p=make_pair(secondone,rem);
q.push(p);
}
}

int main()
{
int t,i;
scanf("%d",&t);
while(t--)
{
scanf("%lld",&n);
bfs();
for(i=0;i<ans.size();i++)
{
printf("%c",ans[i]);
}
printf("\n");
}
return 0;
}
``````
-
@Christian Ammer - Thanks for the edit ! –  Shashank Jain Jun 5 '13 at 20:58
You're welcome, it's always a good idea to include the problem description into the question and format the code proberly. –  Christian Ammer Jun 5 '13 at 21:35

@Shashank Jain I just solved the problem , I would not post my snippet , but I will give the points why your code is slower

``````1.As sukunrt said you need to keep an array visited of size n, where you can mark
the currently obtained modulus as visited so that you don't visit it again, because
if you are at an already visited modulus you don't need to consider the part of string
obtained till now as it only makes the number larger(we need minimum) , ie it means
once you visit a modulus you say 'x' then you find the least number composed of 0 and 1
that gives 'x' as remainder when divide by n.

2.You always pass the string so obtained to the child, which not only increase the memory
but time to.To avoid this just take two more arrays say 'value[]' and 'parent[]' both of
size n.
Parent[i] stores the parent modulus of modulus 'i'.
value[i] stores which is the current bit corresponding to modulus 'i'(0<=i<n).
In the end you can just backtrack to form the whole number just for modulus=0.

Also after making changes your code will give WA because you have to first push
the child obtained by appending '0' at end and then the child obtained by
appending '1' at end.(prove yourself).
``````
-
i did understand about point 2. can you explain bit more please ? –  Shashank Jain Jun 5 '13 at 20:56
@shashank I just gave a method to avoid passing string arguments to child nodes that you push into the queue I could explain in detail but I don't think it will fit in the comment –  migdal Jun 5 '13 at 21:21
@Migdal- i recode my solution keeping your guideline .. thanks it got accepted !! point 2 is too good and easy to be forgotten when implementing ! Thanks ! –  Shashank Jain Jun 6 '13 at 9:12
@shahshank happy I could be of help :) –  migdal Jun 6 '13 at 9:19

Here's a hint. think about it this way:

Suppose the number that you want is X. X mod N = 0.

So you need to store only N states i.e. 0-n-1. Start with 1. and do the bfs. You need to discard the branches that have the same remainder as before. I'll leave the proof to you.

-
this is exactly what i am doing.. popping from queue discard the branches and only current consider branches run into !! –  Shashank Jain Jun 5 '13 at 18:36
are you sure. i don't think you are saving the found remainders anywhere. –  sukunrt Jun 5 '13 at 18:38
if 1 == 101 (mod N) you are queuing 101's children in the queue. –  sukunrt Jun 5 '13 at 18:40
yeah i got my problem !! –  Shashank Jain Jun 5 '13 at 20:54