0.6 Regularity, moments, and wavelet system design (Page 9/13)

Page 9 / 13

An illustration of the effects of these approximations on a signal is shown in [link] where a signal with a very smooth component (a sinusoid) and a discontinuous component (a square wave) is expanded in awavelet series using samples as the high resolution scaling function coefficients. Notice the effects of projecting onto lower and lowerresolution scales.

If we consider a wavelet system where the same number of scaling function and wavelet moments are set zero and this number is as large as possible,then the following is true [link] , [link] :

Theorem 27 If $m (ℓ) = m_{1} (ℓ) = 0$ for $ℓ = 1, 2, \dots, L$ and $m_{1} (0) = 0$ , then the $L^{2}$ error is

ϵ_{3} = ∥ f (t) - S^{j} {f (t)} ∥_{2} \leq C_{3} 2^{- j (L + 1)},

where $C_{3}$ is a constant independent of $j$ and $L$ , but dependent on $f (t)$ and the wavelet system.

Here we see that for this wavelet system called a Coifman wavelet system, that using samples as the inner product expansion coefficients is anexcellent approximation. This justifies that using samples of a signal as input to a filter bank gives a proper wavelet analysis. This approximationis also illustrated in [link] and in [link] .

From the previous approximation theorems, we see that a combination of zero wavelet and zero scaling function moments used with samples of thesignal may give superior results to wavelets with only zero wavelet moments. Not only does forcing zero scaling function moments give abetter approximation of the expansion coefficients by samples, it often causesthe scaling function to be more symmetric. Indeed, that characteristic may be more important than the sample approximation in certainapplications.

Daubechies considered the design of these wavelets which were suggested by Coifman [link] , [link] , [link] . Gopinath [link] , [link] and Wells [link] , [link] show how zero scaling function moments give a better approximation of high-resolution scaling coefficients by samples. Tianand Wells [link] , [link] have also designed biorthogonal systems with mixed zero moments with very interesting properties.

Approximations to f(t) at a Different Finite Scales — Approximations to $f (t)$ at a Different Finite Scales

The Coifman wavelet system (Daubechies named the basis functions “coiflets") is an orthonormal multiresolution wavelet system with

\int t^{k} φ (t) d t = m (k) = 0, for k = 1, 2, \dots, L - 1

\int t^{k} ψ (t) d t = m_{1} (k) = 0, for k = 1, 2, \dots, L - 1 .

This definition imposes the requirement that there be at least $L - 1$ zero scaling function moments and at least $L - 1$ wavelet moments in addition to the one zero moment of $m_{1} (0)$ required by orthogonality. This system is said to be of order or degree $L$ and sometime has the additional requirement that the length of the scaling function filter $h (n)$ , which is denoted $N$ , is minimum [link] , [link] . In the design of these coiflets, one obtains more total zero moments than $N / 2 - 1$ . This was first noted by Beylkin, et al [link] . The length-4 wavelet systemhas only one degree of freedom, so it cannot have both a scaling function moment and wavelet moment of zero (see [link] ). Tian [link] , [link] has derived formulas for four length-6 coiflets. These are:

h = [\frac{- 3 + \sqrt{7}}{16 \sqrt{2}}, \frac{1 - \sqrt{7}}{16 \sqrt{2}}, \frac{7 - \sqrt{7}}{8 \sqrt{2}}, \frac{7 + \sqrt{7}}{8 \sqrt{2}}, \frac{5 + \sqrt{7}}{16 \sqrt{2}}, \frac{1 - \sqrt{7}}{16 \sqrt{2}}],

h = [\frac{- 3 - \sqrt{7}}{16 \sqrt{2}}, \frac{1 + \sqrt{7}}{16 \sqrt{2}}, \frac{7 + \sqrt{7}}{8 \sqrt{2}}, \frac{7 - \sqrt{7}}{8 \sqrt{2}}, \frac{5 - \sqrt{7}}{16 \sqrt{2}}, \frac{1 + \sqrt{7}}{16 \sqrt{2}}],

h = [\frac{- 3 + \sqrt{15}}{16 \sqrt{2}}, \frac{1 - \sqrt{15}}{16 \sqrt{2}}, \frac{3 - \sqrt{15}}{8 \sqrt{2}}, \frac{3 + \sqrt{15}}{8 \sqrt{2}}, \frac{13 + \sqrt{15}}{16 \sqrt{2}}, \frac{9 - \sqrt{15}}{16 \sqrt{2}}],

h = [\frac{- 3 - \sqrt{15}}{16 \sqrt{2}}, \frac{1 + \sqrt{15}}{16 \sqrt{2}}, \frac{3 + \sqrt{15}}{8 \sqrt{2}}, \frac{3 - \sqrt{15}}{8 \sqrt{2}}, \frac{13 - \sqrt{15}}{16 \sqrt{2}}, \frac{9 + \sqrt{15}}{16 \sqrt{2}}],

Questions & Answers

what is biology

Hajah Reply

the study of living organisms and their interactions with one another and their environments

AI-Robot

what is biology

Victoria Reply

HOW CAN MAN ORGAN FUNCTION

Alfred Reply

the diagram of the digestive system

Assiatu Reply

allimentary cannel

Ogenrwot

How does twins formed

William Reply

They formed in two ways first when one sperm and one egg are splited by mitosis or two sperm and two eggs join together

Oluwatobi

what is genetics

Josephine Reply

Genetics is the study of heredity

Misack

how does twins formed?

Misack

What is manual

Hassan Reply

discuss biological phenomenon and provide pieces of evidence to show that it was responsible for the formation of eukaryotic organelles

Joseph Reply

what is biology

Yousuf Reply

the study of living organisms and their interactions with one another and their environment.

Wine

discuss the biological phenomenon and provide pieces of evidence to show that it was responsible for the formation of eukaryotic organelles in an essay form

Joseph Reply

what is the blood cells

Shaker Reply

list any five characteristics of the blood cells

Shaker

lack electricity and its more savely than electronic microscope because its naturally by using of light

Abdullahi Reply

advantage of electronic microscope is easily and clearly while disadvantage is dangerous because its electronic. advantage of light microscope is savely and naturally by sun while disadvantage is not easily,means its not sharp and not clear

Abdullahi

cell theory state that every organisms composed of one or more cell,cell is the basic unit of life

Abdullahi

is like gone fail us

DENG

cells is the basic structure and functions of all living things

Ramadan

What is classification

ISCONT Reply

is organisms that are similar into groups called tara

Yamosa

in what situation (s) would be the use of a scanning electron microscope be ideal and why?

Kenna Reply

A scanning electron microscope (SEM) is ideal for situations requiring high-resolution imaging of surfaces. It is commonly used in materials science, biology, and geology to examine the topography and composition of samples at a nanoscale level. SEM is particularly useful for studying fine details,

Hilary

cell is the building block of life.

Condoleezza Reply

Got questions? Join the online conversation and get instant answers!

Jobilize.com Reply

<< Chapter < Page Page > Chapter >>

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!

100% Free Mobile Applications
Receive real-time job alerts and never miss the right job again

Source: OpenStax, Wavelets and wavelet transforms. OpenStax CNX. Aug 06, 2015 Download for free at https://legacy.cnx.org/content/col11454/1.6

Google Play and the Google Play logo are trademarks of Google Inc.

Notification Switch

Would you like to follow the 'Wavelets and wavelet transforms' conversation and receive update notifications?

Ask

	Renaissance Baroque Arts By Marion Cabalfin Start Quiz
	Business Statistics By David Bourgeois Start Quiz
	1 Human A&P 2- Test 1 By Madison Christian Start Flashcards
	1 CDL Quiz - Air Brakes Endorsement Part 1 By Jazzycazz Jackson Start Quiz
	6 Enterprise JavaBeans By JavaChamp Team Start Quiz
	Fundamentals of electrical engineering i By OpenStax Read Online Course
©flickr: brett	Celine Dion Quiz By JavaChamp Team Start Quiz
©flickr: Miguel	Protozoal and Parasitic Infections By Cath Yu Start Quiz
	Psychology By OpenStax Read Online Course
	5 Arts Society: Theater 5 By Jonathan Long Start Quiz

0.6 Regularity, moments, and wavelet system design (Page 9/13)

Coiflets and related wavelet systems

Questions & Answers

Read also:

Get Jobilize Job Search Mobile App in your pocket Now!