Category:Definitions/Even Impulse Pair Function
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This category contains definitions related to Even Impulse Pair Function.
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The even impulse pair function is the real function $\operatorname {II}: \R \to \R$ defined as:
- $\forall x \in \R: \map {\operatorname {II} } x := \dfrac 1 2 \map \delta {x + \dfrac 1 2} + \dfrac 1 2 \map \delta {x - \dfrac 1 2}$
where $\delta$ denotes the Dirac delta function.
Pages in category "Definitions/Even Impulse Pair Function"
The following 4 pages are in this category, out of 4 total.