Comments on code:
- It's very dangerous to delete elements from a list while iterating over it. Perhaps you could append items you want to keep to a new list, and return that.
- Your current algorithm is
O(nm^2)
, where n
is the size of list_a
, and m
is the size of list_b
. This is pretty inefficient, but a good start to the problem.
- Thee's also a lot of unnecessary
continue
and break
statements, which can lead to complicated code that is hard to debug.
- You also put everything into one function. If you split up each task into different functions, such as dedicating one function to finding pairs, and one for checking each item in
list_a
against list_b
. This is a way of splitting problems into smaller problems, and using them to solve the bigger problem.
Overall I think your function is doing too much, and the logic could be condensed into much simpler code by breaking down the problem.
Another approach:
Since I found this task interesting, I decided to try it myself. My outlined approach is illustrated below.
1. You can first check if a list has a pair of a given sum in O(n)
time using hashing:
def check_pairs(lst, sums):
lookup = set()
for x in lst:
current = sums - x
if current in lookup:
return True
lookup.add(x)
return False
2. Then you could use this function to check if any any pair in list_b
is equal to the sum of numbers iterated in list_a
:
def remove_first_sum(list_a, list_b):
new_list_a = []
for x in list_a:
check = check_pairs(list_b, x)
if check:
new_list_a.append(x)
return new_list_a
Which keeps numbers in list_a
that contribute to a sum of two numbers in list_b
.
3. The above can also be written with a list comprehension:
def remove_first_sum(list_a, list_b):
return [x for x in list_a if check_pairs(list_b, x)]
Both of which works as follows:
>>> remove_first_sum([3,19,20], [1,2,17])
[3, 19]
>>> remove_first_sum([3,19,20,18], [1,2,17])
[3, 19, 18]
>>> remove_first_sum([1,2,5,6],[2,3,4])
[5, 6]
Note: Overall the algorithm above is O(n)
time complexity, which doesn't require anything too complicated. However, this also leads to O(n)
extra auxiliary space, because a set is kept to record what items have been seen.
a
containsa = [3, 4, 19, 20]
? Then there are two possible sums:3+20
and4+19
, so what to remove in that case?b
and use binary search...?