Randomized Algorithms (Spring 2010)/Tail inequalities: Difference between revisions
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The [http://en.wikipedia.org/wiki/Selection_algorithm selection problem] is the problem of finding the <math>k</math>th smallest element in a set <math>S</math>. A typical case of selection problem is finding the '''median''', the <math>(\lceil n/2\rceil)</math>th element in the sorted order of <math>S</math>. | The [http://en.wikipedia.org/wiki/Selection_algorithm selection problem] is the problem of finding the <math>k</math>th smallest element in a set <math>S</math>. A typical case of selection problem is finding the '''median''', the <math>(\lceil n/2\rceil)</math>th element in the sorted order of <math>S</math>. | ||
The median can be found in <math>O(n\log n)</math> time by sorting. There is a linear-time deterministic algorithm, [http://en.wikipedia.org/wiki/Selection_algorithm#Linear_general_selection_algorithm_-_.22Median_of_Medians_algorithm.22 "median of medians" algorithm], which is very sophisticated. Here we introduce a much simpler randomized algorithm which also runs in linear time. The idea of this randomized algorithm is | The median can be found in <math>O(n\log n)</math> time by sorting. There is a linear-time deterministic algorithm, [http://en.wikipedia.org/wiki/Selection_algorithm#Linear_general_selection_algorithm_-_.22Median_of_Medians_algorithm.22 "median of medians" algorithm], which is very sophisticated. Here we introduce a much simpler randomized algorithm which also runs in linear time. The idea of this randomized algorithm is sampling. | ||
=== Randomized median algorithm === | === Randomized median algorithm === |
Revision as of 11:36, 4 February 2010
Select the Median
The selection problem is the problem of finding the [math]\displaystyle{ k }[/math]th smallest element in a set [math]\displaystyle{ S }[/math]. A typical case of selection problem is finding the median, the [math]\displaystyle{ (\lceil n/2\rceil) }[/math]th element in the sorted order of [math]\displaystyle{ S }[/math].
The median can be found in [math]\displaystyle{ O(n\log n) }[/math] time by sorting. There is a linear-time deterministic algorithm, "median of medians" algorithm, which is very sophisticated. Here we introduce a much simpler randomized algorithm which also runs in linear time. The idea of this randomized algorithm is sampling.
Randomized median algorithm
Analysis
Chernoff Bound
Moment generating functions
The Chernoff bound
Chernoff bound (the upper tail):
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Chernoff bound (the lower tail):
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Chernoff-Hoeffding bound (for continuous random variables):
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Useful forms of the Chernoff bound
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