Given a combination of
k of the first
n natural numbers, for some reason I need to find the position of such combination among those returned by
itertools.combination(range(1,n),k) (the reason is that this way I can use a
list instead of a
dict to access values associated to each combination, knowing the combination).
itertools yields its combinations in a regular pattern it is possible to do it (and I also found a neat algorithm), but I'm looking for an even faster/natural way which I might ignore.
By the way here is my solution:
def find_idx(comb,n): k=len(comb) idx=0 last_c=0 for c in comb: #idx+=sum(nck(n-2-x,k-1) for x in range(c-last_c-1)) # a little faster without nck caching idx+=nck(n-1,k)-nck(n-c+last_c,k) # more elegant (thanks to Ray), faster with nck caching n-=c-last_c k-=1 last_c=c return idx
nck returns the binomial coefficient of n,k.
comb=list(itertools.combinations(range(1,14),6)) #pick the 654th combination find_idx(comb,14) # -> 654
And here is an equivalent but maybe less involved version (actually I derived the previous one from the following one). I considered the integers of the combination
c as positions of 1s in a binary digit, I built a binary tree on parsing 0/1, and I found a regular pattern of index increments during parsing:
def find_idx(comb,n): k=len(comb) b=bin(sum(1<<(x-1) for x in comb))[2:] idx=0 for s in b[::-1]: if s=='0': idx+=nck(n-2,k-1) else: k-=1 n-=1 return idx