This module contains the definition of the Plancharel theorem and Parseval's theorem along with proofs and examples.
Parseval's theorem
Continuous Time Fourier Series preserves signal energy
i.e.:
Prove: plancherel theorem
Periodic signals power
Fourier series of square pulse iii -- compute the energy
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Plancharel theorem
Plancharel theorem
The inner product of two vectors/signals is the same as
the
inner product of their expansion coefficients.
Let
be an orthonormal basis for a Hilbert Space
.
,
then
Applying the Fourier Series, we can go from
to
and
to
inner product in time-domain = inner product of Fourier
coefficients.
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by using
inner product rules
when
and
when
If Hilbert space H has a ONB, then inner products are
equivalent to inner products in
.
All H with ONB are somehow equivalent to
.
square-summable sequences
are important
Plancharels theorem demonstration
Parseval's theorem: a different approach
Parseval's theorem
Energy of a signal = sum of squares of its expansion
coefficients
Let
,
ONB
Then
Directly from Plancharel