# Expected space consumption of skip lists

What is the expected space used by the skip list after inserting n elements?

I expect that in the worst case the space consumption may grow indeﬁnitely.

Wikipedia says “Space O(n)”.

How can this be proven one way or another?

-
The wikipedia page says that on average each element will be in `log 1/(1-p)` of the linked lists, so `n * log 1/(1-p)` is probably a good estimate. –  Hunter McMillen May 6 '12 at 15:13
@HunterMcMillen: The OP asks about worst case. –  amit May 6 '12 at 15:15
The question is, what the expected space is. note the worst case. –  Lunatech May 6 '12 at 16:28
@user1374864: Assume the space consumption is `f(n)`. then the "expected space of worst case" is `E = f(n)*1 = f(n)`, since the "expected space of worst case" is `E(space|worst case) = 0*#space_not_worst_case + 1*#space_worst_case = 0 + 1*f(n)` Are you interested maybe in expected space? or worst case? These are two different things. –  amit May 6 '12 at 16:47
–  Gilles May 7 '12 at 23:34

According to this thesis, which I find more reliable then wikipedia, wikipedia is wrong. Probabilistic Skip List is `Theta(nlogn)` worst case space complexity.

Despite the fact that on the average the PSL performs reasonably well, in the worst case its Theta(n lg n) space and Theta(n) time complexity are unacceptably high

The worst case is not infinite because you can limit yourself to `f(n)` number of lists, where `f(n) = O(logn)`, and stop flipping coins when you reached this height. So, if you have `f(n)` complete rows, you get `O(nlogn)` total number of nodes, thus the space complexity in this case is `O(nlogn)`, and not `O(n)`.

EDIT:
If you are looking for expected space consumption, and not worst as initially was stated in the question then:
Let's denote "column" as a buttom node + all the nodes "up" from it.

``````E(#nodes) = Sigma(E(#nodes_for_column_i)) (i in [1,n])
``````

The above equation is true because linearity of expected value.

`E(#nodes_for_column_i) = 1 + 1/2 + ... + 1/n < 2` (for each i). This is because with probability 1 it has 1 node, with p=1/2, each of these has an extra node. with p'=1/2, each of these has an extra node (total p*p'=1/4) ,.... Thus we can derive:

``````E(#nodes) = n*E(#nodes_for_each_column) = n*(1+1/2+...+1/n) < 2n = O(n)
``````
-

Let's we have deterministic skiplist with N nodes. In addition to data values, list contains:

N pointers at level 1, N/2 pointers at level 2, N/4 pointers at level 3 and so on...

N + N/2 + N/4 + N/8 +..N/2^k is sum of geometric progression, and its limit is 2N, so maximum memory consumption is N*SizeOf(Data) + 2*N*SizeOf(Pointer) = O(N).

I did not take into account interlevel links, but their count is about of pointer count.

-
The OP is asking about worst case of probabalistic skip list. –  amit May 6 '12 at 15:27
OK, my method is suitable for "balanced" skip list only. –  MBo May 6 '12 at 15:31