Convolution (mathematics): Difference between revisions
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In [[mathematics]], '''convolution''' is a process which combines two [[function (mathematics)|functions]] on a set to produce another function on the set. The value of the product function depends on a range of values of the argument. | In [[mathematics]], '''convolution''' is a process which combines two [[function (mathematics)|functions]] on a set to produce another function on the set. The value of the product function depends on a range of values of the argument. | ||
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==Transforms== | ==Transforms== | ||
The [[Fourier transform]] translates convolution into [[pointwise operation|pointwise multiplication]] of functions. | The [[Fourier transform]] translates convolution into [[pointwise operation|pointwise multiplication]] of functions.[[Category:Suggestion Bot Tag]] |
Latest revision as of 16:01, 1 August 2024
In mathematics, convolution is a process which combines two functions on a set to produce another function on the set. The value of the product function depends on a range of values of the argument.
Convolution of real functions by means of an integral are found in probability, signal processing and control theory. Algebraic convolutions are found in the discrete analogues of those applications, and in the foundations of algebraic structures.
Integral convolutions
The convolution of integrable real functions f and g may be defined as the real function
Conditions need to be imposed on f and g for this to make sense, such as having compact support or rapid decay at infinity. Other ranges of integration, that is, other domains of definition for the functions involved, may also be used.
Examples
Algebraic convolutions
Let M be a set with a binary operation and R a ring. Let f and g be functions from M to R. The convolution of f and g is a function from M to R
where the addition and multiplication are those of R. For this sum to make sense it must be finite. If M has the "locally finite" property that for any given x there are only finitely many pairs (t,u) such that , this definition makes sense for any functions f,g. Alternatively, if we restrict to functions of finite support, then no condition on M is needed.
Examples
- Let M be the natural numbers (including zero) with addition as the operation. The corresponding convolution is polynomial ring multiplication.
- Let M be the positive integers with multiplication as the operation. The corresponding convolution is Dirichlet convolution, multiplication of formal Dirichlet series.
Transforms
The Fourier transform translates convolution into pointwise multiplication of functions.