Doubly-Logarithmic Time
Learn about XFastTrie and YFastTrie searching.
XFastTrie
: Searching in doubly-logarithmic Time
The performance of the BinaryTrie
structure is not very impressive. The
number of elements, n
, stored in the structure is at most , so . In other words, any of the comparison-based SSet
are at least as efficient as a BinaryTrie
, and are not restricted to only storing integers.
Next we describe the XFastTrie
, which is just a BinaryTrie
with
hash tables—one for each level of the trie. These hash tables are used to
speed up the find(x)
operation to time. Recall that the find(x)
operation in a BinaryTrie
is almost complete once we reach a node, u
, where the search path for x
would like to proceed to u.right
(or u.left
) but u
has no right (respectively, left) child. At this point, the search uses u.jump
to jump to a leaf, v
, of the BinaryTrie
and either return v
or its successor in the linked list of leaves. An XFastTrie
speeds up the search process by using binary search on the levels of the trie to locate the node u
.
To use binary search, we need a way to determine if the node u
we are looking for is above a particular level, i
, of if u
is at or below level i
. This information is given by the highest-order i
bits in the binary representation of x
; these bits determine the search path that x
takes from the root to level i
.
Visual demonstration of the search path
The visual demonstration of the search path is shown below:
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