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I'm given n sets and need to make sure that atleast m sets are selected. I'm planning to deal with bits. My approach is:

for i in [0,(2^n)-1]
   convert i to binary
       if number of 1s are greater than or equal to m
            { Some calculations requiring which bits are on }

Now, is there any other way I can make sure that number of on bits are atleast m ? In my above approach, I'll be wasting time in converting numbers to binary and then checking if no. of on bits are >=m. Is there a way to cut short the loop ? (I'm dealing in C++)

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This could be easiest achieved using std::bitset<> IMHO. –  πάντα ῥεῖ May 10 '14 at 9:48
    
In a bitset of size n, how to impliment the fact atleast m bits are set to 1? –  CPPCoder May 10 '14 at 9:50
    
Just loop through using the index operator and count how many yield true. –  πάντα ῥεῖ May 10 '14 at 9:51
    
@πάνταῥεῖ Sorry but I'm not able to get it, if there is a bitset of say 3 bits, then there are 8 possibilities, how to generate all the possibilities ? If m is say 2, how to make sure atleast 2 bits are set to true without generating the possibilities having 0 or 1 bit on? –  CPPCoder May 10 '14 at 9:56
    
Do you want to check if at least m bit are 1 in some existing numbers or do you want to generate all numbers with that condition met? –  deviantfan May 10 '14 at 9:58

1 Answer 1

I guess you need to generate bitmasks to select a subset of atleast "m" elements from a set of "n" elements.
This can be easily done if we have an algorithm to generate all the bitmasks having exactly "m" bits set.

void advance(int& i)  // Generate the lowest number bigger than "i" having exactly the same number of bits set as "i"
{
    if(i == 0)  // Need special care for i=0
        i= -1
    int l= i&~(i-1);
    int z= (i+l)&~i;
    i|= z;
    i&= ~(z-1);
    i|= ((z/l)>>1)-1;
}  

int bitmask=(1<<m)-1; // The smallest number having exactly "m" bits set
// The set bits in the binary of "bitmask" denote the positions included in a subset
// The number of set bits in the binary of "bitmask" is always = m

while (!(bitmask&1<<n)) // This loop runs exactly nCm times..
{
    // Process bitmask..
    advance(bitmask); // Generate the lowest number bigger than "bitmask" having exactly "m" set bits
}

Now we can easily modify this to generate all the bitmasks having at least "m" bits set by applying the above algo by incrementing "m" upto "n".

void advance(int& i)  // Generate the lowest number bigger than "i" having exactly the same number of bits set as "i"
{
    if(i == 0)  // Need special care for i=0
        i= -1
    int l = i&~(i-1);
    int z =(i+l)&~i;
    i|=z;
    i&=~(z-1);
    i|=((z/l)>>1)-1;
}  

while(m<=n)
{
    int bitmask=(1<<m)-1; // The smallest number having exactly "m" bits set
    // The set bits in the binary of "bitmask" denote the positions included in a subset
    // The number of set bits in the binary of "bitmask" is always = m

    while (!(bitmask&1<<n)) // This loop runs exactly nCm times..
    {
        // Process bitmask..
        advance(bitmask); // Generate the lowest number bigger than "bitmask" having exactly "m" set bits
    }
    m++;  // Increment "m"
}  
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