Big O notation: Difference between revisions

Latest revision as of 06:18, 15 July 2008

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The big O notation is a mathematical notation to express various bounds concerning asymptotic behaviour of functions. It is often used in particular applications in physics, computer science, engineering and other applied sciences. For example, a typical context use in computer science is to express the complexity of algorithms.

More formally, if f and g are real valued functions of the real variable $t$ then the notation $f(t)=O(g(t))$ indicates that there exist a real number T and a constant C such that $|f(t)|\leq C|g(t)|$ for all $t>T.$

Similarly, if $a_{n}$ and $b_{n}$ are two numerical sequences then $a_{n}=O(b_{n})$ means that $|a_{n}|\leq C|b_{n}|$ for all n big enough.

The big O notation is also often used to indicate that the absolute value of a real valued function around some neighbourhood of a point is upper bounded by a constant multiple of the absolute value of another function, in that neigbourhood. For example, for a real number $t_{0}$ the notation $f(t)=O(g(t-t_{0}))$ , where g(t) is a function which is continuous at t = 0 with g(0) = 0, denotes that there exists a real positive constant C such that $|f(t)|\leq C|g(t-t_{0})|$ on some neighbourhood N of $t_{0}$ .

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-The '''big O notation''' is a mathematical notation to express various bounds concerning  asymptotic behaviour of functions. It is often used in particular applications in physics, computer science, engineering and other applied sciences.
+{{subpages}}
-[[Category:Mathematics Workgroup]]
+The '''big O notation''' is a mathematical notation to express various bounds concerning asymptotic behaviour of functions. It is often used in particular applications in [[physics]], [[computer science]], [[engineering]] and other [[applied sciences]]. For example, a typical context use in computer science is to express the [[complexity of algorithms]].
-[[Category: CZ Live]]
+More formally, if ''f'' and ''g''  are real valued functions of the real variable <math>t</math> then the notation <math>f(t)=O(g(t))</math> indicates that there exist a real number ''T'' and a constant ''C'' such that <math>|f(t)|\leq C |g(t)|</math> for all <math>t>T.</math> <!-- Equivalently,
+:<math>\displaystyle\limsup_{t\to\infty}\frac{|f(t)|}{|g(t)|} \le C.</math> -->
+Similarly, if <math>a_n</math> and <math>b_n</math> are two numerical sequences then <math>a_n=O(b_n)</math> means that  <math> |a_n|\le C|b_n|</math> for all ''n'' big enough.
+<!-- <math>|a_n|\le C |b_n|</math> for all <math>n</math> big enough.-->
+The big O notation is also often used to indicate that the absolute value of a real valued function around some [[topological space#Some topological notions|neighbourhood]] of a point is upper bounded by a constant multiple of the absolute value of another function, in that neigbourhood. For example, for a real number <math>t_0</math> the notation  <math>f(t)=O(g(t-t_0))</math>, where ''g''(''t'') is a function which is [[continuity|continuous]] at ''t'' = 0 with ''g''(0) = 0,  denotes that there exists a real positive constant ''C'' such that <math>|f(t)|\leq C|g(t-t_0)|</math> on ''some'' neighbourhood ''N'' of <math>t_0</math>.

Big O notation: Difference between revisions

Latest revision as of 06:18, 15 July 2008

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