- categories: Signal processing, Theorem, Functional analysis
Statement
The convolution theorem states that the Convolution of two functions in the time domain is equivalent to the pointwise multiplication of their Fourier transform in the frequency domain, and vice versa. Formally:
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Time Domain to Frequency Domain:
For functions and , the convolution satisfies:where denotes the Fourier transform.
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Frequency Domain to Time Domain:
For functions and , the convolution in the frequency domain satisfies:where is the inverse Fourier transform.