Dirac delta function

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In physics, the Dirac delta function is a function introduced by P.A.M. Dirac in his seminal 1930 book on quantum mechanics.^[1] Heuristically, the function can be seen as an extension of the Kronecker delta from discrete to continuous indices. The Kronecker delta acts as a "filter" in a summation:

${\displaystyle \sum _{i=1}^{n}f_{i}\delta _{ia}={\begin{cases}f_{a}&\quad {\hbox{if}}\quad a\in [1,n]\subset \mathbb {N} \\0&\quad {\hbox{if}}\quad a\notin [1,n].\end{cases}}}$

Similarly, the Dirac delta function δ(x−a) may be defined by (replace i by x and the summation over i by an integration over x),

${\displaystyle \int _{a_{0}}^{a_{1}}f(x)\delta (x-a)\mathrm {d} x={\begin{cases}f(a)&\quad {\hbox{if}}\quad a\in [a_{0},a_{n}]\subset \mathbb {R} ,\\0&\quad {\hbox{if}}\quad a\notin [a_{0},a_{n}].\end{cases}}}$

The Dirac delta function is not an ordinary well-behaved map ${\displaystyle \mathbb {R} \rightarrow \mathbb {R} }$, but a distribution, also known as an improper or generalized function.