1D Maximum Subarray (Maximum Subarray Problem)

Description

Given an array $A$ of length $n$, find $i, j$ with $1\leq i \leq j \leq n$ maximizing $\sum^j_{x=i} A(x)$, that is, find a contiguous subarray of $A$ of maximum sum

Parameters

n: length of array

Table of Algorithms

Name	Year	Time	Space	Approximation Factor	Model	Reference
Brute Force	1977	$O(n^{3})$	$O({1})$ auxiliary	Exact	Deterministic
Grenander	1977	$O(n^{2})$	$O(n)$	Exact	Deterministic
Faster Brute Force (via x(L:U) = x(L:U-1)+x(U))	1977	$O(n^{2})$	$O({1})$ auxiliary	Exact	Deterministic	Time
Shamos	1978	$O(nlogn)$	$O(log n)$ auxiliary	Exact	Deterministic
Kadane's Algorithm	1982	$O(n)$	$O({1})$ auxiliary	Exact	Deterministic
Perumalla and Deo	1995	$O(log n)$	$O(n)$ auxiliary	Exact	Parallel	Time
Gries	1982	$O(n)$	$O({1})$ auxiliary	Exact	Deterministic	Time
Bird	1989	$O(n)$	$O({1})$ auxiliary	Exact	Deterministic	Time
Ferreira, Camargo, Song	2014	$O(log n)$	$O(n)$ auxiliary	Exact	Parallel	Time

1D Maximum Subarray (Maximum Subarray Problem)

Contents

Description

Related Problems

Parameters

Table of Algorithms

Time Complexity graph

Space Complexity graph

Pareto Decades graph

Navigation menu

1D Maximum Subarray (Maximum Subarray Problem)

Description

Related Problems

Parameters

Table of Algorithms

Time Complexity graph

Space Complexity graph

Pareto Decades graph

Navigation menu

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