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convolution

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Definitions of convolution in various dictionaries:

noun - the shape of something rotating rapidly

noun - a convex fold or elevation in the surface of the brain

noun - the action of coiling or twisting or winding together

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Possible Dictionary Clues
A form or part that is folded or coiled.
One of the convex folds of the surface of the brain.
a sinuous fold in the surface of the brain.
a coil or twist.
a thing that is complex and difficult to follow.
the action of coiling or twisting or winding together
a convex fold or elevation in the surface of the brain
the shape of something rotating rapidly
a twist:
something that makes an explanation, story, etc. complicated and difficult to understand:

Convolution description
In mathematics (and, in particular, functional analysis) convolution is a mathematical operation on two functions (f and g) to produce a third function that expresses how the shape of one is modified by the other. The term convolution refers to both the result function and to the process of computing it. Convolution is similar to cross-correlation. For discrete, real-valued functions, they differ only in a time reversal in one of the functions. For continuous functions, the cross-correlation operator is the adjoint of the convolution operator. * It has applications that include probability, statistics, computer vision, natural language processing, image and signal processing, engineering, and differential equations. * The convolution can be defined for functions on Euclidean space, and other groups. For example, periodic functions, such as the discrete-time Fourier transform, can be defined on a circle and convolved by periodic convolution. (See row 11 at DTFT § Properties.) A discrete c

Convolution description

In mathematics (and, in particular, functional analysis) convolution is a mathematical operation on two functions (f and g) to produce a third function that expresses how the shape of one is modified by the other. The term convolution refers to both the result function and to the process of computing it. Convolution is similar to cross-correlation. For discrete, real-valued functions, they differ only in a time reversal in one of the functions. For continuous functions, the cross-correlation operator is the adjoint of the convolution operator.
* It has applications that include probability, statistics, computer vision, natural language processing, image and signal processing, engineering, and differential equations.
* The convolution can be defined for functions on Euclidean space, and other groups. For example, periodic functions, such as the discrete-time Fourier transform, can be defined on a circle and convolved by periodic convolution. (See row 11 at DTFT § Properties.) A discrete c

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