why does wavelet approximation need to multiply sqrt(2)

조회 수: 2 (최근 30일)
konoha
konoha 2022년 4월 28일
답변: Sudarsanan A K 2023년 12월 15일
I am learning wavelet transform, the image below is one of my examples. Notices that when down sampling the sample signal, the approximation gets multied by about sqrt(2). I know the scaling function has integral one. this property should keep the amplitude of the signal remain the same, i think. Do I need to divide sqrt(2) for each level?
This document https://www.mathworks.com/help/wavelet/ref/idwt.html, has exmple for deconstructing and reconstructing function with wavelet. But it doesn't multiply sqrt(2).

답변 (1개)

Sudarsanan A K
Sudarsanan A K 2023년 12월 15일
Hello Konoha,
I understand that you are interested in exploring the scaling and normalization of wavelet coefficients within the multi-level wavelet decomposition.
When you perform a multi-level wavelet decomposition in MATLAB:
  • The signal is processed with two filters: a low-pass filter (scaling function) and a high-pass filter (wavelet function).
  • The filtered signal is then downsampled by half, which is a key step in wavelet decomposition.
For the normalization and scaling of wavelet coefficients:
  • The scaling function is normalized so that it integrates to one, helping to preserve the signal's energy.
  • Downsampling can affect the energy of the signal if not compensated for, but this is taken care of in the wavelet transform.
In MATLAB's Wavelet Toolbox:
  • Functions like "wavedec" for 1-D signals and "wavedec2" for 2-D signals, automatically handle normalization to ensure energy preservation.
  • The filters used are designed to keep the energy consistent across decomposition levels.
  • Users generally do not need to manually adjust coefficients for energy preservation.
Here is an example script that performs a two-level decomposition on a simple 1D signal using the Haar wavelet and checks the energy preservation:
% Define a simple 1D signal
signal = [1, 3, -2, 4, -1, 5, 3, -3];
% Calculate the energy of the original signal
original_energy = sum(signal.^2);
% Perform a two-level DWT using the Haar wavelet
[C, L] = wavedec(signal, 2, 'haar');
% Extract the approximation and detail coefficients from C
A2 = appcoef(C, L, 'haar', 2); % Level 2 Approximation Coefficients
D2 = detcoef(C, L, 2); % Level 2 Detail Coefficients
D1 = detcoef(C, L, 1); % Level 1 Detail Coefficients
% Calculate the energy of the wavelet coefficients
transformed_energy = sum(A2.^2) + sum(D2.^2) + sum(D1.^2);
% Display the results
disp(['Original Energy: ', num2str(original_energy)]);
Original Energy: 74
disp(['Transformed Energy: ', num2str(transformed_energy)]);
Transformed Energy: 74
To know more about the amplitude changes and ensure you are interpreting the results correctly, you can additionally refer to the MathWorks documentation:
I hope this helps!

카테고리

Help CenterFile Exchange에서 Discrete Multiresolution Analysis에 대해 자세히 알아보기

제품


릴리스

R2020b

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by