# Recursive algorithm to find all possible solutions in a nonogram row

I am trying to write a simple nonogram solver, in a kind of bruteforce way, but I am stuck on a relatively easy task. Let's say I have a row with clues [2,3] that has a length of 10

so the solutions are:

``````\$\$-\$\$\$----
\$\$--\$\$\$---
\$\$---\$\$\$--
\$\$----\$\$\$-
\$\$-----\$\$\$
-\$\$----\$\$\$
--\$\$---\$\$\$
---\$\$--\$\$\$
----\$\$-\$\$\$
-\$\$---\$\$\$-
--\$\$-\$\$\$--
``````

I want to find all the possible solutions for a row I know that I have to consider each block separately, and each block will have an availible space of n-(sum of remaining blocks length + number of remaining blocks) but I do not know how to progress from here

• Which language? – alseether Nov 7 '17 at 13:22
• @alseether, this is an algorithm question, so the language is not relevant. The OP is interested in the procedure. – Jonathan M Nov 7 '17 at 13:24
• @JonathanM Yeah, i know, but i will try to do it in c++ and just wanted to know if tht's ok for them. – alseether Nov 7 '17 at 13:25
• BTW, i think you're missing some combinations, isn't `-\$\$-\$\$\$---` a valid one too? – alseether Nov 7 '17 at 13:26
• @alseether yes, I may have missed some combinations, indeed. And language is irrelevant to me. – user3756824 Nov 7 '17 at 13:55

This is what i got:

``````#include <iostream>
#include <vector>
#include <string>

using namespace std;

typedef std::vector<bool> tRow;

void printRow(tRow row){
for (bool i : row){
std::cout << ((i) ? '\$' : '-');
}
std::cout << std::endl;
}

int requiredCells(const std::vector<int> nums){
int sum = 0;
for (int i : nums){
sum += (i + 1); // The number + the at-least-one-cell gap at is right
}
return (sum == 0) ? 0 : sum - 1; // The right-most number don't need any gap
}

bool appendRow(tRow init, const std::vector<int> pendingNums, unsigned int rowSize, std::vector<tRow> &comb){
if (pendingNums.size() <= 0){
comb.push_back(init);
return false;
}
int cellsRequired = requiredCells(pendingNums);
if (cellsRequired > rowSize){
return false;   // There are no combinations
}
tRow prefix;
int gapSize = 0;
std::vector<int> pNumsAux = pendingNums;
pNumsAux.erase(pNumsAux.begin());
unsigned int space = rowSize;
while ((gapSize + cellsRequired) <= rowSize){
space = rowSize;
space -= gapSize;
prefix.clear();
prefix = init;
for (int i = 0; i < gapSize; ++i){
prefix.push_back(false);
}
for (int i = 0; i < pendingNums[0]; ++i){
prefix.push_back(true);
space--;
}
if (space > 0){
prefix.push_back(false);
space--;
}
appendRow(prefix, pNumsAux, space, comb);
++gapSize;
}
return true;
}

std::vector<tRow> getCombinations(const std::vector<int> row, unsigned int rowSize) {
std::vector<tRow> comb;
tRow init;
appendRow(init, row, rowSize, comb);
return comb;
}

int main(){
std::vector<int> row = { 2, 3 };

auto ret = getCombinations(row, 10);

for (tRow r : ret){
while (r.size() < 10)
r.push_back(false);

printRow(r);
}

return 0;

}
``````

And my output is:

\$\$-\$\$\$----

\$\$--\$\$\$---

\$\$---\$\$\$--

\$\$----\$\$\$--

\$\$-----\$\$\$

-\$\$-\$\$\$----

-\$\$--\$\$\$--

-\$\$---\$\$\$-

-\$\$----\$\$\$-

--\$\$-\$\$\$--

--\$\$--\$\$\$-

--\$\$---\$\$\$

---\$\$-\$\$\$-

---\$\$--\$\$\$

----\$\$-\$\$\$

For sure, this must be absolutely improvable.

Note: i did't test it more than already written case

Hope it works for you

• If any case is forgotten, let me know and i will edit this answer – alseether Nov 7 '17 at 15:47
• No, i was actually wrong, the "filling loop" must go up to 10, not 9 as i had – alseether Nov 7 '17 at 17:26

``````def place(blocks,total):
if not blocks: return ["-"*total]
if blocks[0]>total: return []

starts = total-blocks[0] #starts = 2 means possible starting indexes are [0,1,2]
if len(blocks)==1: #this is special case
return [("-"*i+"\$"*blocks[0]+"-"*(starts-i)) for i in range(starts+1)]

ans = []
for i in range(total-blocks[0]): #append current solutions
for sol in place(blocks[1:],starts-i-1): #with all possible other solutiona
ans.append("-"*i+"\$"*blocks[0]+"-"+sol)

return ans
``````

To test it:

``````for i in place([2,3,2],12):
print(i)
``````

Which produces output like:

``````\$\$-\$\$\$-\$\$---
\$\$-\$\$\$--\$\$--
\$\$-\$\$\$---\$\$-
\$\$-\$\$\$----\$\$
\$\$--\$\$\$-\$\$--
\$\$--\$\$\$--\$\$-
\$\$--\$\$\$---\$\$
\$\$---\$\$\$-\$\$-
\$\$---\$\$\$--\$\$
\$\$----\$\$\$-\$\$
-\$\$-\$\$\$-\$\$--
-\$\$-\$\$\$--\$\$-
-\$\$-\$\$\$---\$\$
-\$\$--\$\$\$-\$\$-
-\$\$--\$\$\$--\$\$
-\$\$---\$\$\$-\$\$
--\$\$-\$\$\$-\$\$-
--\$\$-\$\$\$--\$\$
--\$\$--\$\$\$-\$\$
---\$\$-\$\$\$-\$\$
``````
• Great! Thanks for the python solution! – user3756824 Nov 7 '17 at 17:24
• Really nice and compact solution – alseether Nov 7 '17 at 17:29