Jove
Visualize
Contact Us

Related Concept Videos

Harmonic Mean01:09

Harmonic Mean

3.5K
The arithmetic mean is usually skewed towards the larger values in the data set. Therefore, to avoid this inherent bias towards smaller values, the harmonic mean is used.
Take the example of the speed of a car, which is the measure of the rate of distance traveled. If the vehicle traverses the same distance back-and-forth, its average speed equals the total distance traveled divided by the total time taken. However, if the car moves with varying speeds, then the arithmetic mean is more skewed...
3.5K
Trimmed Mean01:10

Trimmed Mean

3.2K
While measuring the mean of a data set, care needs to be taken when associating the mean to its central tendency. The same goes for the arithmetic mean, the geometric mean, or the harmonic mean. This is because the presence of a single outlier data value can significantly affect the mean. That is, the mean is sensitive to fluctuations in the data set.
Although certain measures of central tendency are not sensitive to outliers, there are alternative versions of the mean that get around the...
3.2K
Arithmetic Mean01:08

Arithmetic Mean

17.0K
The arithmetic mean is the most commonly used measure of the central tendency of a data set. It is defined as the sum of all the elements constituting the data set, divided by the total number of elements. It is sometimes loosely referred to as the “average.”
When all the values in a data set are not unique, the sum in the numerator can be calculated by multiplying each distinct value by its frequency.
Sometimes, the arithmetic mean of a sample can be affected by a few data points...
17.0K
Properties of the z-Transform II01:16

Properties of the z-Transform II

341
The property of Accumulation in signal processing is derived by analyzing the accumulated sum of a discrete-time signal and using the time-shifting property to determine its z-transform. This principle reveals that the z-transform of the summed signal is related to the z-transform of the original signal by a multiplicative factor.
Moreover, the convolution property indicates that the convolution of two signals in the time domain corresponds to the product of their z-transforms in the frequency...
341
Convergence of Fourier Series01:21

Convergence of Fourier Series

334
The Fourier series is a powerful mathematical tool for representing periodic signals as an infinite sum of complex exponentials. In practice, this infinite series is truncated to a finite number of terms, yielding a partial sum. This truncation makes the approximation of the signal feasible but introduces certain challenges, particularly near discontinuities, known as the Gibbs phenomenon.
The Gibbs phenomenon refers to the persistent oscillations and overshoots that occur near discontinuities...
334
Reconstruction of Signal using Interpolation01:10

Reconstruction of Signal using Interpolation

633
Signal processing techniques are essential for accurately converting continuous signals to digital formats and vice versa. When a continuous signal is sampled with a period T, the resulting sampled signal exhibits replicas of the original spectrum in the frequency domain, spaced at intervals equal to the sampling frequency. To handle this sampled signal, a zero-order hold method can be applied, which creates a piecewise constant signal by retaining each sample's value until the next...
633

You might also read

Related Articles

Articles linked to this work by shared authors, journal, and citation graph.

Sort by
Same author

Open-Set Anomaly Segmentation in Complex Scenarios.

IEEE transactions on image processing : a publication of the IEEE Signal Processing Society·2026
Same author

Text4Seg++: Advancing Image Segmentation via Generative Language Modeling.

IEEE transactions on pattern analysis and machine intelligence·2026
Same author

Skeleton-guided sparse anchors for rotated instance segmentation in cell microscopy.

Computer methods and programs in biomedicine·2026
Same author

Identity-Compensated Style Distillation for Visible-Infrared Person Re-Identification.

IEEE transactions on image processing : a publication of the IEEE Signal Processing Society·2026
Same author

Redundancy Removal and Knowledge Alignment-Based Personalized Federated Learning for Online Condition Monitoring.

IEEE transactions on neural networks and learning systems·2026
Same author

A Greedy Strategy for Graph Cut.

IEEE transactions on image processing : a publication of the IEEE Signal Processing Society·2026
JoVE
x logofacebook logolinkedin logoyoutube logo
ABOUT JoVE
OverviewLeadershipBlogJoVE Help Center
AUTHORS
Publishing ProcessEditorial BoardScope & PoliciesPeer ReviewFAQSubmit
LIBRARIANS
TestimonialsSubscriptionsAccessResourcesLibrary Advisory BoardFAQ
RESEARCH
JoVE JournalMethods CollectionsJoVE Encyclopedia of ExperimentsArchive
EDUCATION
JoVE CoreJoVE BusinessJoVE Science EducationJoVE Lab ManualFaculty Resource CenterFaculty Site
Terms & Conditions of Use
Privacy Policy
Policies

Related Experiment Video

Updated: Dec 27, 2025

Design and Application of a Fault Detection Method Based on Adaptive Filters and Rotational Speed Estimation for an Electro-Hydrostatic Actuator
06:45

Design and Application of a Fault Detection Method Based on Adaptive Filters and Rotational Speed Estimation for an Electro-Hydrostatic Actuator

Published on: October 28, 2022

2.0K

Iterative truncated arithmetic mean filter and its properties.

Xudong Jiang1

  • 1School of Electrical and Electronic Engineering, Nanyang Technological University, Singapore. exdjiang@ntu.edu.sg

IEEE Transactions on Image Processing : a Publication of the IEEE Signal Processing Society
|October 25, 2011
PubMed
Summary

This study introduces an iterative truncated mean (ITM) algorithm for signal and image processing. The ITM filter offers a novel approach to noise attenuation and structure preservation by dynamically truncating extreme values, approximating median filtering properties.

More Related Videos

X-ray Beam Induced Current Measurements for Multi-Modal X-ray Microscopy of Solar Cells
10:16

X-ray Beam Induced Current Measurements for Multi-Modal X-ray Microscopy of Solar Cells

Published on: August 20, 2019

14.3K
Gain-compensation Methodology for a Sinusoidal Scan of a Galvanometer Mirror in Proportional-Integral-Differential Control Using Pre-emphasis Techniques
09:01

Gain-compensation Methodology for a Sinusoidal Scan of a Galvanometer Mirror in Proportional-Integral-Differential Control Using Pre-emphasis Techniques

Published on: April 4, 2017

9.0K

Related Experiment Videos

Last Updated: Dec 27, 2025

Design and Application of a Fault Detection Method Based on Adaptive Filters and Rotational Speed Estimation for an Electro-Hydrostatic Actuator
06:45

Design and Application of a Fault Detection Method Based on Adaptive Filters and Rotational Speed Estimation for an Electro-Hydrostatic Actuator

Published on: October 28, 2022

2.0K
X-ray Beam Induced Current Measurements for Multi-Modal X-ray Microscopy of Solar Cells
10:16

X-ray Beam Induced Current Measurements for Multi-Modal X-ray Microscopy of Solar Cells

Published on: August 20, 2019

14.3K
Gain-compensation Methodology for a Sinusoidal Scan of a Galvanometer Mirror in Proportional-Integral-Differential Control Using Pre-emphasis Techniques
09:01

Gain-compensation Methodology for a Sinusoidal Scan of a Galvanometer Mirror in Proportional-Integral-Differential Control Using Pre-emphasis Techniques

Published on: April 4, 2017

9.0K

Area of Science:

  • Signal and Image Processing
  • Nonlinear Filtering
  • Statistical Signal Processing

Background:

  • Arithmetic mean and median are fundamental but have limitations in noise and structure preservation.
  • Existing filters often struggle with balancing noise attenuation and detail preservation.

Purpose of the Study:

  • To propose an iterative algorithm that combines merits of mean and median filters.
  • To develop a nonlinear filter for improved noise attenuation and image structure preservation.
  • To provide a method for estimating the median using arithmetic computations.

Main Methods:

  • An iterative algorithm that truncates extreme sample values within a filter window to a dynamic threshold.
  • Development and analysis of dynamic truncation thresholds.
  • Investigation of stopping criteria for edge preservation and noise attenuation.

Main Results:

  • The proposed iterative truncated mean (ITM) filter exhibits properties of both mean and median filters.
  • Dynamic thresholds ensure the filter output approaches the median.
  • Analysis of statistical properties, including upper bounds for median-mean deviation.
  • Experimental verification on synthetic and real image data.

Conclusions:

  • The ITM algorithm provides an effective nonlinear filter for signal and image processing.
  • It offers a practical method for median estimation via arithmetic operations.
  • The filter demonstrates successful noise attenuation and edge preservation across various data distributions.