# Kronecker delta

In mathematics, the **Kronecker delta** (named after Leopold Kronecker) is a function of two variables, usually just non-negative integers. The function is 1 if the variables are equal, and 0 otherwise:

or with use of Iverson brackets:

where the Kronecker delta δ_{ij} is a piecewise function of variables i and j. For example, *δ*_{1 2} = 0, whereas *δ*_{3 3} = 1.

The Kronecker delta appears naturally in many areas of mathematics, physics and engineering, as a means of compactly expressing its definition above.

In linear algebra, the *n* × *n* identity matrix **I** has entries equal to the Kronecker delta:

where i and j take the values 1, 2, ..., *n*, and the inner product of vectors can be written as

The restriction to positive integers is common, but there is no reason it cannot have negative integers as well as positive, or any discrete rational numbers. If i and j above take rational values, then for example

This latter case is for convenience. However, the Kronecker delta is not defined for complex numbers.

## PropertiesEdit

The following equations are satisfied:

Therefore, the matrix **δ** can be considered as an identity matrix.

Another useful representation is the following form:

This can be derived using the formula for the finite geometric series.

## Alternative notationEdit

Using the Iverson bracket:

Often, a single-argument notation δ_{i} is used, which is equivalent to setting *j* = 0:

In linear algebra, it can be thought of as a tensor, and is written δ^{i}_{j}. Sometimes the Kronecker delta is called the substitution tensor.^{[1]}

## Digital signal processingEdit

Similarly, in digital signal processing, the same concept is represented as a sequence or discrete function on ℤ (the integers):

The function is referred to as an *impulse*, or *unit impulse*. When it is the input to a discrete-time signal processing element, the output is called the impulse response of the element.

## Properties of the delta functionEdit

The Kronecker delta has the so-called *sifting* property that for *j* ∈ ℤ:

and if the integers are viewed as a measure space, endowed with the counting measure, then this property coincides with the defining property of the Dirac delta function

and in fact Dirac's delta was named after the Kronecker delta because of this analogous property^{[citation needed]}. In signal processing it is usually the context (discrete or continuous time) that distinguishes the Kronecker and Dirac "functions". And by convention, *δ*(*t*) generally indicates continuous time (Dirac), whereas arguments like i, j, k, l, m, and n are usually reserved for discrete time (Kronecker). Another common practice is to represent discrete sequences with square brackets; thus: *δ*[*n*]. The Kronecker delta is not the result of directly sampling the Dirac delta function.

The Kronecker delta forms the multiplicative identity element of an incidence algebra.^{[2]}

## Relationship to the Dirac delta functionEdit

In probability theory and statistics, the Kronecker delta and Dirac delta function can both be used to represent a discrete distribution. If the support of a distribution consists of points **x** = {*x*_{1}, ..., *x _{n}*}, with corresponding probabilities

*p*

_{1}, ...,

*p*, then the probability mass function

_{n}*p*(

*x*) of the distribution over

**x**can be written, using the Kronecker delta, as

Equivalently, the probability density function *f*(*x*) of the distribution can be written using the Dirac delta function as

Under certain conditions, the Kronecker delta can arise from sampling a Dirac delta function. For example, if a Dirac delta impulse occurs exactly at a sampling point and is ideally lowpass-filtered (with cutoff at the critical frequency) per the Nyquist–Shannon sampling theorem, the resulting discrete-time signal will be a Kronecker delta function.

## GeneralizationsEdit

If it is considered as a type (1,1) tensor, the Kronecker tensor can be written
*δ*^{i}_{j} with a covariant index j and contravariant index i:

This tensor represents:

- The identity mapping (or identity matrix), considered as a linear mapping
*V*→*V*or*V*^{∗}→*V*^{∗} - The trace or tensor contraction, considered as a mapping
*V*^{∗}⊗*V*→*K* - The map
*K*→*V*^{∗}⊗*V*, representing scalar multiplication as a sum of outer products.

The **generalized Kronecker delta** or **multi-index Kronecker delta** of order 2*p* is a type (*p*,*p*) tensor that is a completely antisymmetric in its p upper indices, and also in its p lower indices.

Two definitions that differ by a factor of *p*! are in use. Below, the version is presented has nonzero components scaled to be ±1. The second version has nonzero components that are ±1/*p*!, with consequent changes scaling factors in formulae, such as the scaling factors of 1/*p*! in *§ Properties of the generalized Kronecker delta* below disappearing.^{[3]}

### Definitions of the generalized Kronecker deltaEdit

In terms of the indices:^{[4]}^{[5]}

Let S_{p} be the symmetric group of degree p, then:

Using anti-symmetrization:

In terms of a *p* × *p* determinant:^{[6]}

Using the Laplace expansion (Laplace's formula) of determinant, it may be defined recursively:^{[7]}

where the caron, ˇ, indicates an index that is omitted from the sequence.

When *p* = *n* (the dimension of the vector space), in terms of the Levi-Civita symbol:

### Properties of the generalized Kronecker deltaEdit

The generalized Kronecker delta may be used for anti-symmetrization:

From the above equations and the properties of anti-symmetric tensors, we can derive the properties of the generalized Kronecker delta:

which are the generalized version of formulae written in *§ Properties*. The last formula is equivalent to the Cauchy–Binet formula.

Reducing the order via summation of the indices may be expressed by the identity^{[8]}

Using both the summation rule for the case *p* = *n* and the relation with the Levi-Civita symbol,
the summation rule of the Levi-Civita symbol is derived:

## Integral representationsEdit

For any integer n, using a standard residue calculation we can write an integral representation for the Kronecker delta as the integral below, where the contour of the integral goes counterclockwise around zero. This representation is also equivalent to a definite integral by a rotation in the complex plane.

## The Kronecker combEdit

The Kronecker comb function with period N is defined (using DSP notation) as:

where N and n are integers. The Kronecker comb thus consists of an infinite series of unit impulses N units apart, and includes the unit impulse at zero. It may be considered to be the discrete analog of the Dirac comb.

## Kronecker integralEdit

The Kronecker delta is also called degree of mapping of one surface into another.^{[9]} Suppose a mapping takes place from surface S_{uvw} to S_{xyz} that are boundaries of regions, R_{uvw} and R_{xyz} which is simply connected with one-to-one correspondence. In this framework, if s and t are parameters for S_{uvw}, and S_{uvw} to S_{uvw} are each oriented by the outer normal **n**:

while the normal has the direction of

Let *x* = *x*(*u*,*v*,*w*), *y* = *y*(*u*,*v*,*w*), *z* = *z*(*u*,*v*,*w*) be defined and smooth in a domain containing S_{uvw}, and let these equations define the mapping of S_{uvw} onto S_{xyz}. Then the degree δ of mapping is 1/4π times the solid angle of the image S of S_{uvw} with respect to the interior point of S_{xyz}, *O*. If *O* is the origin of the region, R_{xyz}, then the degree, δ is given by the integral:

## See alsoEdit

## ReferencesEdit

**^**Trowbridge, J. H. (1998). "On a Technique for Measurement of Turbulent Shear Stress in the Presence of Surface Waves".*Journal of Atmospheric and Oceanic Technology*.**15**(1): 291. doi:10.1175/1520-0426(1998)015<0290:OATFMO>2.0.CO;2.**^**Spiegel, Eugene; O'Donnell, Christopher J. (1997),*Incidence Algebras*, Pure and Applied Mathematics,**206**, Marcel Dekker, ISBN 0-8247-0036-8.**^**Pope, Christopher (2008). "Geometry and Group Theory" (PDF).**^**Frankel, Theodore (2012).*The Geometry of Physics: An Introduction*(3rd ed.). Cambridge University Press. ISBN 9781107602601.**^**Agarwal, D. C. (2007).*Tensor Calculus and Riemannian Geometry*(22nd ed.). Krishna Prakashan Media.^{[ISBN missing]}**^**Lovelock, David; Rund, Hanno (1989).*Tensors, Differential Forms, and Variational Principles*. Courier Dover Publications. ISBN 0-486-65840-6.**^**A recursive definition requires a first case, which may be taken as*δ*= 1 for*p*= 0, or alternatively*δ*^{μ}_{ν}=*δ*^{μ}_{ν}for*p*= 1 (generalized delta in terms of standard delta).**^**Hassani, Sadri (2008).*Mathematical Methods: For Students of Physics and Related Fields*(2nd ed.). Springer-Verlag. ISBN 978-0-387-09503-5.**^**Kaplan, Wilfred (2003).*Advanced Calculus*. Pearson Education. p. 364. ISBN 0-201-79937-5.