Kronecker delta
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In mathematics, the Kronecker delta or Kronecker's delta, named after Leopold Kronecker (1823-1891), is a function of two variables, usually integers, which is 1 if they are equal, and 0 otherwise. So, for example, [\delta_ = 0], but [\delta_ = 1]. It is written as the symbol δij, and treated as a notational shorthand rather than as a function.
- [\delta_ = \left\ 1 & \mbox i=j \\ 0 & \mbox i \ne j \end\right.]
- [\delta_ = [i=j]\,]
- [\delta_ = \left\ 1 & \mbox i=0 \\ 0 & \mbox i \ne 0 \end\right.]
Similarly, in digital signal processing, the same concept is represented as a function on [\mathbb\,] (integers):
- [\delta(n) = \begin 1, & n = 0 \\ 0, & n \ne 0 \end]
Properties of the delta function
The Kronecker delta has the so-called sifting property that for [j\in\mathbb Z]:- [\sum_^\infty \delta_ a_i=a_j.]
- [\int_^\infty \delta(x-y)f(x) dx=f(y),]
The Kronecker delta is used in many areas of mathematics. For example, in linear algebra, the identity matrix can be written as [\delta_\,] while if it is considered as a tensor, the Kronecker tensor, it can be written [\delta^j_i] with a contravariant index j. This is a more accurate way to notate the identity matrix, considered as a linear mapping.
Extensions of the delta function
In the same fashion, we may define an analogous, multi-dimensional function of many variables- [\delta^_:= \prod_^n \delta_.]
See also
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