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visits | member for | 2 years, 9 months |
seen | 5 hours ago | |
stats | profile views | 48 |
Dec 16 |
comment |
CLRS:33.1-4:Show how to determine in O(n*n*lg n) time whether any three points in a set of n points are colinear?
This can be done in O(n^2) deterministically, if you think in the dual space.. |
Jun 23 |
comment |
What does it mean when it is stipulated that extra allowed space is O(1)?
Let's consider linear search algorithm as an example. Is it O(1) space? Suppose that the length of the input array is n. In order to index all elements in the array, the index variable needs O(lg n) bits. By definition, this algorithm is not O(1) space. Is it true? |
Feb 5 |
answered | Understanding the running time analysis from an exercise of CLRS |
Jan 18 |
answered | Simplest algorithm to find 4-cycles in an undirected graph |
Jan 10 |
comment |
Optimize algorithm from O(n^3) to O(n^2)
There is an O(n^2) solution, but it is based on point-line duality. For each point in the primal plane, you create a line in the dual plane. The point with the largest degree in the dual plane corresponds to the line in the primal plane that passes through maximum number of points. This can be computed in O(n^2) time by using arrangement of lines. |
Dec 17 |
comment |
Improve efficiency “lighthouse”
Two lighthouse (x1, y1) and (x2, y2) can illuminate each other if, and only if, one light house, say (x2, y2), satisfies x1 <= x2 and y1 <= y2. The problem becomes for each point (x, y), how many points (x', y') satisfies x' <= x and y' <= y. In order to solve this problem, you can use divide-and-conquer technique. Split the set by x-coordinate into two equal size sets and solve the problem recursively. For a lighthouse (x', y') in the left half and (x, y) in the right half, since x' <= x by construction, they can illuminate each other if y' <= y. Based on this, you can solve the problem. |
Sep 9 |
comment |
Finding Median in Three Sorted Arrays in O(logn)
When all three arrays' lengths are smaller than a constant, you can brute-force to find the median. It is also possible that two of arrays are length one but you cannot ignore the elements in the third array. In this case, you can modify binary search to find the median. |
Sep 1 |
answered | testing tic tac toe win condition |
May 6 |
comment |
Finding edge connectivity of a network by using Maximum Flow algorithm
By tmyklebu's answer(first paragraph), you don't need to compute every two nodes. Fix a node v, iterating all possible w != v and compute maximum flow is enough. en.wikipedia.org/wiki/… |
May 6 |
awarded | Commentator |
May 6 |
comment |
Can 1 approximation algorithm be used for multiple NP-Hard problems?
For maximum clique problem, there is no O(lg n)-approximation algorithm unless P = NP. en.wikipedia.org/wiki/Clique_problem#Hardness_of_approximation |
May 6 |
answered | Can 1 approximation algorithm be used for multiple NP-Hard problems? |
Mar 20 |
comment |
analyzing complexity of recursive algorithm with uneven division
You can use Akraâ€“Bazzi method to find the solution first.. |
Feb 13 |
comment |
Party rank - Interview Solution
This is a maximum weighted independent set on tree problem. If you search on Internet, you can find solutions using dynamic programming. |
Feb 10 |
comment |
NP class : Why polynomial length outputs?
If the output length is not polynomial, how can you output it in polynomial time? |
Nov 20 |
revised |
How to solve this recurrence relation: T(n) = 4*T(sqrt(n)) + n
Correct some typos |
Nov 20 |
answered | How to solve this recurrence relation: T(n) = 4*T(sqrt(n)) + n |
Nov 20 |
comment |
How to solve this recurrence relation: T(n) = 4*T(sqrt(n)) + n
Why each level recursion does O(n) work? Consider the second level. Since there are 4 branches and each branch is T(sqrt(n)), the work should be 4 sqrt(n) in the second level. |
Apr 8 |
awarded | Enthusiast |
Apr 1 |
answered | Finding shortest combinations in array/sequence that equals sum |