Skip to content Skip to navigation Skip to collection information

Connexions

You are here: Home » Content » Signals and Systems » Common Discrete Fourier Series

Navigation

Table of Contents

Lenses

What is a lens?

Definition of a lens

Lenses

A lens is a custom view of the content in the repository. You can think of it as a fancy kind of list that will let you see content through the eyes of organizations and people you trust.

What is in a lens?

Lens makers point to materials (modules and collections), creating a guide that includes their own comments and descriptive tags about the content.

Who can create a lens?

Any individual member, a community, or a respected organization.

What are tags? tag icon

Tags are descriptors added by lens makers to help label content, attaching a vocabulary that is meaningful in the context of the lens.

This content is ...

Affiliated with (What does "Affiliated with" mean?)

This content is either by members of the organizations listed or about topics related to the organizations listed. Click each link to see a list of all content affiliated with the organization.

Also in these lenses

  • Lens for Engineering

    This collection is included inLens: Lens for Engineering
    By: Sidney Burrus

    Click the "Lens for Engineering" link to see all content selected in this lens.

  • richb's DSP display tagshide tags

    This collection is included inLens: richb's DSP resources
    By: Richard Baraniuk

    Comments:

    "My introduction to signal processing course at Rice University."

    Click the "richb's DSP" link to see all content selected in this lens.

    Click the tag icon tag icon to display tags associated with this content.

Recently Viewed

This feature requires Javascript to be enabled.

Tags

(What is a tag?)

These tags come from the endorsement, affiliation, and other lenses that include this content.
Download
x

Download collection as:

  • PDF
  • EPUB (what's this?)

    What is an EPUB file?

    EPUB is an electronic book format that can be read on a variety of mobile devices.

    Downloading to a reading device

    For detailed instructions on how to download this content's EPUB to your specific device, click the "(what's this?)" link.

  • More downloads ...

Download module as:

  • PDF
  • EPUB (what's this?)

    What is an EPUB file?

    EPUB is an electronic book format that can be read on a variety of mobile devices.

    Downloading to a reading device

    For detailed instructions on how to download this content's EPUB to your specific device, click the "(what's this?)" link.

  • More downloads ...
Reuse / Edit
x

Collection:

Module:

Add to a lens
x

Add collection to:

Add module to:

Add to Favorites
x

Add collection to:

Add module to:

 

Common Discrete Fourier Series

Module by: Stephen Kruzick. E-mail the author

Summary: This module includes a table of common discrete fourier transforms.

Introduction

Once one has obtained a solid understanding of the fundamentals of Fourier series analysis and the General Derivation of the Fourier Coefficients, it is useful to have an understanding of the common signals used in Fourier Series Signal Approximation.

Deriving the Coefficients

Consider a square wave f(x) of length 1. Over the range [0,1), this can be written as

x ( t ) = 1 t 1 2 ; - 1 t > 1 2 . x ( t ) = 1 t 1 2 ; - 1 t > 1 2 .
(1)
Figure 1: Fourier series approximation to sqt sq t . The number of terms in the Fourier sum is indicated in each plot, and the square wave is shown as a dashed line over two periods.
Fourier series approximation of a square wave
Fourier series approximation of a square wave (squarewave.png)

Real Even Signals

Given that the square wave is a real and even signal,

  • f(t)=f(-t)f(t)=f(-t) EVEN
  • f(t)=ff(t)=f*(t)(t) REAL
  • therefore,
  • cn=c-ncn=c-n EVEN
  • cn=cncn=cn* REAL

Deriving the Coefficients for other signals

The Square wave is the standard example, but other important signals are also useful to analyze, and these are included here.

Constant Waveform

This signal is relatively self-explanatory: the time-varying portion of the Fourier Coefficient is taken out, and we are left simply with a constant function over all time.

x ( t ) = 1 x ( t ) = 1
(2)

Figure 2
Fourier series approximation of a constant wave
Fourier series approximation of a constant wave (squarewave.png)

Sinusoid Waveform

With this signal, only a specific frequency of time-varying Coefficient is chosen (given that the Fourier Series equation includes a sine wave, this is intuitive), and all others are filtered out, and this single time-varying coefficient will exactly match the desired signal.

x ( t ) = c o s ( 2 π t ) x ( t ) = c o s ( 2 π t )
(3)

Figure 3
Fourier series approximation of a sinusoid wave
Fourier series approximation of a sinusoid wave (sinusoid.png)

Triangle Waveform

x ( t ) = t t 1 / 2 1 - t t > 1 / 2 x ( t ) = t t 1 / 2 1 - t t > 1 / 2
(4)
This is a more complex form of signal approximation to the square wave. Because of the Symmetry Properties of the Fourier Series, the triangle wave is a real and odd signal, as opposed to the real and even square wave signal. This means that
  • f(t)=-f(-t)f(t)=-f(-t) ODD
  • f(t)=ff(t)=f*(t)(t) REAL
  • therefore,
  • c n = - c - n c n = - c - n
  • cn=-cncn=-cn* IMAGINARY

Figure 4
Fourier series approximation of a triangle wave
Fourier series approximation of a triangle wave (trianglewave.png)

Sawtooth Waveform

x ( t ) = t / 2 x ( t ) = t / 2
(5)
Because of the Symmetry Properties of the Fourier Series, the sawtooth wave can be defined as a real and odd signal, as opposed to the real and even square wave signal. This has important implications for the Fourier Coefficients.

Figure 5
Fourier series approximation of a sawtooth wave
Fourier series approximation of a sawtooth wave (sawtooth.png)

DFT Signal Approximation

Figure 6: Interact (when online) with a Mathematica CDF demonstrating the common Discrete Fourier Series. To download, right-click and save as .cdf.
fourierDiscreteDemo

Conclusion

To summarize, a great deal of variety exists among the common Fourier Transforms. A summary table is provided here with the essential information.

Table 1: Common Discrete Fourier Transforms
Description Time Domain Signal for nZ[0,N-1]nZ[0,N-1] Frequency Domain Signal kZ[0,N-1]kZ[0,N-1]
Constant Function 1 δ ( k ) δ ( k )
Unit Impulse δ ( n ) δ ( n ) 1 N 1 N
Complex Exponential e j 2 π m n / N e j 2 π m n / N δ ( ( k - m ) N ) δ ( ( k - m ) N )
Sinusoid Waveform c o s ( j 2 π m n / N ) c o s ( j 2 π m n / N ) 1 2 ( δ ( ( k - m ) N ) + δ ( ( k + m ) N ) ) 1 2 ( δ ( ( k - m ) N ) + δ ( ( k + m ) N ) )
Box Waveform (M<N/2)(M<N/2) δ ( n ) + m = 1 M δ ( ( n - m ) N ) + δ ( ( n + m ) N ) δ ( n ) + m = 1 M δ ( ( n - m ) N ) + δ ( ( n + m ) N ) sin ( ( 2 M + 1 ) k π / N ) N sin ( k π / N ) sin ( ( 2 M + 1 ) k π / N ) N sin ( k π / N )
Dsinc Waveform (M<N/2)(M<N/2) sin ( ( 2 M + 1 ) n π / N ) sin ( n π / N ) sin ( ( 2 M + 1 ) n π / N ) sin ( n π / N ) δ ( k ) + m = 1 M δ ( ( k - m ) N ) + δ ( ( k + m ) N ) δ ( k ) + m = 1 M δ ( ( k - m ) N ) + δ ( ( k + m ) N )

Collection Navigation

Content actions

Download:

Collection as:

PDF | EPUB (?)

What is an EPUB file?

EPUB is an electronic book format that can be read on a variety of mobile devices.

Downloading to a reading device

For detailed instructions on how to download this content's EPUB to your specific device, click the "(?)" link.

| More downloads ...

Module as:

PDF | EPUB (?)

What is an EPUB file?

EPUB is an electronic book format that can be read on a variety of mobile devices.

Downloading to a reading device

For detailed instructions on how to download this content's EPUB to your specific device, click the "(?)" link.

| More downloads ...

Add:

Collection to:

My Favorites (?)

'My Favorites' is a special kind of lens which you can use to bookmark modules and collections. 'My Favorites' can only be seen by you, and collections saved in 'My Favorites' can remember the last module you were on. You need an account to use 'My Favorites'.

| A lens I own (?)

Definition of a lens

Lenses

A lens is a custom view of the content in the repository. You can think of it as a fancy kind of list that will let you see content through the eyes of organizations and people you trust.

What is in a lens?

Lens makers point to materials (modules and collections), creating a guide that includes their own comments and descriptive tags about the content.

Who can create a lens?

Any individual member, a community, or a respected organization.

What are tags? tag icon

Tags are descriptors added by lens makers to help label content, attaching a vocabulary that is meaningful in the context of the lens.

| External bookmarks

Module to:

My Favorites (?)

'My Favorites' is a special kind of lens which you can use to bookmark modules and collections. 'My Favorites' can only be seen by you, and collections saved in 'My Favorites' can remember the last module you were on. You need an account to use 'My Favorites'.

| A lens I own (?)

Definition of a lens

Lenses

A lens is a custom view of the content in the repository. You can think of it as a fancy kind of list that will let you see content through the eyes of organizations and people you trust.

What is in a lens?

Lens makers point to materials (modules and collections), creating a guide that includes their own comments and descriptive tags about the content.

Who can create a lens?

Any individual member, a community, or a respected organization.

What are tags? tag icon

Tags are descriptors added by lens makers to help label content, attaching a vocabulary that is meaningful in the context of the lens.

| External bookmarks

Reuse / Edit:

Reuse or edit collection (?)

Check out and edit

If you have permission to edit this content, using the "Reuse / Edit" action will allow you to check the content out into your Personal Workspace or a shared Workgroup and then make your edits.

Derive a copy

If you don't have permission to edit the content, you can still use "Reuse / Edit" to adapt the content by creating a derived copy of it and then editing and publishing the copy.

| Reuse or edit module (?)

Check out and edit

If you have permission to edit this content, using the "Reuse / Edit" action will allow you to check the content out into your Personal Workspace or a shared Workgroup and then make your edits.

Derive a copy

If you don't have permission to edit the content, you can still use "Reuse / Edit" to adapt the content by creating a derived copy of it and then editing and publishing the copy.