Jove
Visualize
Contact Us
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 Concept Videos

Hückel's Rule Diagram of π MOs: Frost Circle01:08

Hückel's Rule Diagram of π MOs: Frost Circle

The Frost circle or the inscribed polygon method is a graphical method for determining the relative energies of π molecular orbitals (MOs) for planar, fully conjugated, and monocyclic compounds. This method was first described by A. A. Frost and Boris Musulin in 1953.
A Frost circle is constructed by drawing a polygon whose number of edges is equal to the number of carbons of the given cyclic system, with one of the vertices pointing down. Then, a circle is drawn enclosing the polygon so that...
Polar Coordinates: Problem Solving01:27

Polar Coordinates: Problem Solving

Directional radiation patterns are central to antenna analysis, as they illustrate how signal strength varies with direction. These patterns are often modeled using polar plots, where the radial distance from the origin represents signal intensity at a given angle. A commonly used idealized form is the four-lobed rose curve, which captures the concept of directional beams in a simplified mathematical form.The four-lobed rose curve, described by r = cos⁡(2θ), features four symmetric lobes, each...
Radius of Gyration of an Area01:12

Radius of Gyration of an Area

The second moment of area, also known as the moment of inertia of area, is a crucial factor in understanding an object's resistance against bending deformation, or stiffness. To accurately estimate the second moment of area along any axis, one needs to concentrate all areas associated with that object into a thin strip, which should be placed parallel to that particular axis.
Accuracy, limits, and approximation01:28

Accuracy, limits, and approximation

Accuracy, limits, and approximations are common in many fields, especially in engineering calculations. These concepts are imperative for ensuring that a given value is as close as possible to its true value.
Accuracy is defined as the closeness of the measured value to the true or actual value. In engineering mechanics, repeated measurements are taken during theoretical or experimental analyses to ensure that the result is precise and accurate.
The accuracy of any solution is based on the...
Design Example: Calculating Safe Diameter for Wind-Exposed Disc01:17

Design Example: Calculating Safe Diameter for Wind-Exposed Disc

Assessing safety in wind-exposed installations is crucial to preventing potential failures. This example explores the calculation and design adjustments needed to mount a circular disc on a building facade, where wind forces are a primary concern. A 4-meter diameter disc was initially designed as an aesthetic feature facing winds at a velocity of 25 meters per second, with an air density of 1.25 kilograms per cubic meter. Given these conditions, the drag force on the disc was determined using...
Interval and Radius of Convergence01:29

Interval and Radius of Convergence

A power series is a mathematical representation of a function as an infinite sum of terms involving powers of a variable. Such series converge only for specific input values, making it essential to determine the range over which the series produces valid results. This leads to the concepts of radius and interval of convergence, which define where the series behaves meaningfully.The radius of convergence describes the distance from the center within which the power series converges. For a...

You might also read

Related Articles

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

Sort by
Same authorSame journal

RTF2Mesh: Restricted Tangent Face Based Mesh Compression With Neural Displacement Fields.

IEEE transactions on visualization and computer graphics·2026
Same author

Power Diagram Enhanced Adaptive Isosurface Extraction from Signed Distance Fields.

IEEE transactions on visualization and computer graphics·2026
Same author

Revolutionising acute aortic syndrome diagnosis: The role of artificial intelligence in non-contrast computed tomography.

Clinical and translational medicine·2026
Same author

Cooldown and Ramp Test of a Low-Cryogen, Lightweight, Head-Only 7T MRI Magnet.

IEEE transactions on applied superconductivity : a publication of the IEEE Superconductivity Committee·2026
Same author

Artificial intelligence analysis of the relationship between subcutaneous fat volume in CT images and cervical kyphosis after laminoplasty.

Computer assisted surgery (Abingdon, England)·2025
Same author

Self-Supervised Continuous Colormap Recovery from a 2D Scalar Field Visualization without a Legend.

IEEE transactions on visualization and computer graphics·2025
Same journal

GLLA: A Unified Force-Directed Graph Layout Framework Supporting Local Adjustments.

IEEE transactions on visualization and computer graphics·2026
Same journal

Multi-Perception Crowd: Learning to combine entity and implicit perception for diverse crowd simulation.

IEEE transactions on visualization and computer graphics·2026
Same journal

Hiding in Plain Sight: Camouflaging Real-world Objects.

IEEE transactions on visualization and computer graphics·2026
Same journal

Practical Occluder Generation for Mobile Games.

IEEE transactions on visualization and computer graphics·2026
Same journal

Spatial-temporal Relation guided Motion Transfer via Diffusion Model.

IEEE transactions on visualization and computer graphics·2026
See all related articles

Related Experiment Video

Updated: Jun 11, 2026

Kinematic History of a Salient-recess Junction Explored through a Combined Approach of Field Data and Analog Sandbox Modeling
06:55

Kinematic History of a Salient-recess Junction Explored through a Combined Approach of Field Data and Analog Sandbox Modeling

Published on: August 5, 2016

OffsetCrust: Variable-Radius Offset Approximation with Power Diagrams.

Zihan Zhao, Pengfei Wang, Minfeng Xu

    IEEE Transactions on Visualization and Computer Graphics
    |June 9, 2026
    PubMed
    Summary
    This summary is machine-generated.

    OffsetCrust efficiently computes variable-radius offset surfaces using power diagrams, improving geometry processing tasks like surface reconstruction. This novel framework enhances accuracy and addresses common misalignment issues in offset surface generation.

    More Related Videos

    Parametric Optimization Design Method for Friction Plates of Hydro-Viscous Clutches
    10:58

    Parametric Optimization Design Method for Friction Plates of Hydro-Viscous Clutches

    Published on: July 22, 2025

    Related Experiment Videos

    Last Updated: Jun 11, 2026

    Kinematic History of a Salient-recess Junction Explored through a Combined Approach of Field Data and Analog Sandbox Modeling
    06:55

    Kinematic History of a Salient-recess Junction Explored through a Combined Approach of Field Data and Analog Sandbox Modeling

    Published on: August 5, 2016

    Parametric Optimization Design Method for Friction Plates of Hydro-Viscous Clutches
    10:58

    Parametric Optimization Design Method for Friction Plates of Hydro-Viscous Clutches

    Published on: July 22, 2025

    Area of Science:

    • Computational Geometry
    • Computer Graphics
    • Geometric Modeling

    Background:

    • Offset surfaces are essential in geometry processing, with applications in motion planning and modeling.
    • Computing constant-radius offset surfaces is well-established, but variable-radius offset surfaces remain a significant challenge.

    Purpose of the Study:

    • To present OffsetCrust, a novel framework for efficiently computing variable-radius offset surfaces.
    • To address limitations in existing methods, particularly misalignment issues in crust-based approaches.

    Main Methods:

    • Constructing a power diagram from carefully sampled base points and corresponding off-surface points.
    • Utilizing a radius function (R) and R-dependent displacement directions.
    • Implementing a lightweight fine-tuning procedure to mitigate misalignment.

    Main Results:

    • OffsetCrust efficiently computes accurate variable-radius offset surfaces.
    • The method successfully mitigates misalignment issues prevalent in other crust-based techniques.
    • Experimental validation confirms the framework's accuracy and efficiency.

    Conclusions:

    • OffsetCrust provides an effective solution for the challenging problem of variable-radius offset surface computation.
    • The framework demonstrates practical utility in applications such as reconstructing surfaces from medial axis transforms (MAT).
    • This work advances the state-of-the-art in geometry processing and computational modeling.