Kronecker delta: Difference between revisions

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If the subscripts are taken to vary from 1 to ''n'' then δ gives the entries of the ''n''-by-''n'' [[identity matrix]].  The invariance of this matrix under [[orthogonal matrix|orthogonal]] change of coordinate makes δ a rank two [[tensor]].
If the subscripts are taken to vary from 1 to ''n'' then δ gives the entries of the ''n''-by-''n'' [[identity matrix]].  The invariance of this matrix under [[orthogonal matrix|orthogonal]] change of coordinate makes δ a rank two [[tensor]].
Kronecker deltas appear frequently in summations where they act as a "filter". To clarify this we consider a simple example
:<math>
\sum_{i=1}^6 S_i \delta_{i,4} = S_1 \sdot0 + S_2 \sdot0 +S_3 \sdot0 +S_4 \sdot1 +S_5 \sdot0 +S_6 \sdot0 = S_4,
</math>
that is, the element ''S''<sub>4</sub> is "sifted out" of the summation by &delta;<sub>''i'',4</sub>.
In general, (''i'' and ''a'' integers)
:<math>
\sum_{i=-\infty}^{\infty} S_{i}\delta_{ia} = S_a,\qquad i,a \in \mathbb{Z}.
</math>
The Kronecker delta is named after the German mathematician [[Leopold Kronecker]] (1823 &ndash; 1891).  See [[Dirac delta function]] for a generalization of the Kronecker delta to real ''i'' and ''j''.[[Category:Suggestion Bot Tag]]

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In algebra, the Kronecker delta is a notation for a quantity depending on two subscripts i and j which is equal to one when i and j are equal and zero when they are unequal:

If the subscripts are taken to vary from 1 to n then δ gives the entries of the n-by-n identity matrix. The invariance of this matrix under orthogonal change of coordinate makes δ a rank two tensor.

Kronecker deltas appear frequently in summations where they act as a "filter". To clarify this we consider a simple example

that is, the element S4 is "sifted out" of the summation by δi,4.

In general, (i and a integers)

The Kronecker delta is named after the German mathematician Leopold Kronecker (1823 – 1891). See Dirac delta function for a generalization of the Kronecker delta to real i and j.