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Nov
17 |
awarded | Caucus |
Oct
30 |
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Finding a “positive cycle”
Another way is to use Bellman-Ford algorithm to detect a negative cycle. The time complexity will be O(|V| |E|). |
Oct
17 |
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optimizing code: fibonacci algorithm
There are some methods that are asymptotically the same as q-matrix method but are faster in practice, for example [dx.doi.org/10.1016/S0020-0190(80)90076-9]. It may be helpful to read papers citing this paper to find other advanced algorithms. Here is my implementation of this algorithm [github.com/yuhanlyu/Snippets/blob/master/experiments/fibonacci/…. |
Aug
20 |
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Is it possible to find the k-largest numbers from n unsorted integers with time complexity O(n) and space complexity O(k)?
It is doable. See link.springer.com/chapter/10.1007%2FBFb0015429 By using this algorithm, you can find the k-th largest number in linear time with only constant number of additional variables. |
Apr
14 |
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How to find a binary logarithm very fast? (O(1) at best)
@ChristofferHammarström Finding log base 2 is the same as finding the position of the most significant set bit. Section 8 of that notes provides a method to do so. |
Apr
10 |
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How to find a binary logarithm very fast? (O(1) at best)
It is a little bit complicated and I don't know whether it is practical at all. A comprehensive explanation can be found in section 8 of courses.csail.mit.edu/6.851/spring12/scribe/lec12.pdf Or, You can watch the course video for this part. |
Apr
9 |
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How to find a binary logarithm very fast? (O(1) at best)
Theoretically, finding log base 2 can be done in O(1) with some reasonable assumptions and this technique is used in fusion tree. |
Apr
7 |
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How to write a dynamic tree
You an read this paper "Dynamic Trees in Practice," by Tarjan and Werneck. dx.doi.org/10.1145/1498698.1594231 They provide a comprehensive survey for all dynamic trees and experimental comparisons. |
Mar
12 |
answered | K-enclosing Minimum Area Square |
Feb
12 |
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A Dynamic Programming or Graph Algorithm, a Nice Questions
In fact, you can use maximum bipartite matching by using more nodes. For a producer with s_i candy, create s_i nodes, and do the same thing for the consumers. |
Feb
1 |
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MST in linear time
Use Prim's algorithm. Since the weights of edges are bounded, you can replace a standard priority queue by an array of length 100. By doing so, DeleteMin/DecreaseKey can be done in constant time. |
Dec
16 |
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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 |
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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 |
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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 |
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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 |
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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 |
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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/… |