Category:Definitions/Big-Omega Notation
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This category contains definitions related to big-$\Omega$ notation.
Related results can be found in Category:Big-Omega Notation.
Let $g: \N \to \R$ be a real sequence, expressed here as a real-valued function on the set of natural numbers $\N$.
Then $\map \Omega g$ is defined as:
- $\map \Omega g = \set {f: \N \to \R: \exists c \in \R_{>0}: \exists n_0 \in \N: \forall n > n_0: 0 \le c \cdot \size {\map g n} \le \size {\map f n} }$
Pages in category "Definitions/Big-Omega Notation"
The following 6 pages are in this category, out of 6 total.