I have written up a simple solution in Python in case anyone is interested. It uses the `bisect`

module and a temporary return list which it keeps sorted. This is similar to a priority queue implementation.

```
import bisect
def kLargest(A, k):
'''returns list of k largest integers in A'''
ret = []
for i, a in enumerate(A):
# For first k elements, simply construct sorted temp list
# It is treated similarly to a priority queue
if i < k:
bisect.insort(ret, a) # properly inserts a into sorted list ret
# Iterate over rest of array
# Replace and update return array when more optimal element is found
else:
if a > ret[0]:
del ret[0] # pop min element off queue
bisect.insort(ret, a) # properly inserts a into sorted list ret
return ret
```

Usage with 100,000,000 elements and worst-case input which is a sorted list:

```
>>> from so import kLargest
>>> kLargest(range(100000000), 100)
[99999900, 99999901, 99999902, 99999903, 99999904, 99999905, 99999906, 99999907,
99999908, 99999909, 99999910, 99999911, 99999912, 99999913, 99999914, 99999915,
99999916, 99999917, 99999918, 99999919, 99999920, 99999921, 99999922, 99999923,
99999924, 99999925, 99999926, 99999927, 99999928, 99999929, 99999930, 99999931,
99999932, 99999933, 99999934, 99999935, 99999936, 99999937, 99999938, 99999939,
99999940, 99999941, 99999942, 99999943, 99999944, 99999945, 99999946, 99999947,
99999948, 99999949, 99999950, 99999951, 99999952, 99999953, 99999954, 99999955,
99999956, 99999957, 99999958, 99999959, 99999960, 99999961, 99999962, 99999963,
99999964, 99999965, 99999966, 99999967, 99999968, 99999969, 99999970, 99999971,
99999972, 99999973, 99999974, 99999975, 99999976, 99999977, 99999978, 99999979,
99999980, 99999981, 99999982, 99999983, 99999984, 99999985, 99999986, 99999987,
99999988, 99999989, 99999990, 99999991, 99999992, 99999993, 99999994, 99999995,
99999996, 99999997, 99999998, 99999999]
```

It took about 40 seconds to calculate this for 100,000,000 elements so I'm scared to do it for 1 billion. To be fair though, I was feeding it the worst-case input (ironically an array that is already sorted).

sortingquestion, but aseekingone. – geomagas Oct 7 '13 at 14:51alldeterministic (and correct) algorithms are`O(1)`

in this case, because there is no dimension increase. The interviewer should have asked "How to find m biggest elements from an array of n with n >> m?". – Bakuriu Oct 7 '13 at 16:44