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

Shear Diagram01:27

Shear Diagram

1.5K
In the study of beam mechanics, shear diagrams play a crucial role in understanding the distribution of shear forces along the length of a beam. Consider a beam AB that is supported at both ends and subjected to perpendicular loads.
First, a free-body diagram of the beam is drawn, representing all the external forces and internal reactions acting on the beam. One can calculate the reaction forces at each support by employing the equilibrium equations of force and moment. The vertical component...
1.5K
Non-conservative Forces01:17

Non-conservative Forces

9.3K
Non-conservative forces are dissipative forces such as friction or air resistance. These forces take energy away from a system as it progresses. Unlike conservative forces, non-conservative forces do not have potential energy associated with them. This is because the energy is lost to the system and cannot be turned into useful work later.
Also unlike their conservative counterparts, they are path-dependent; where the object starts and stops does matter. For example, a grinding wheel applies a...
9.3K
Conservative Forces01:14

Conservative Forces

13.7K
According to the law of conservation of energy, any transition between kinetic and potential energy conserves the total energy of the system. Hence, the work done by a conservative force is completely reversible. It is path independent, which means that we can start and stop at any two points in the transition, and the total energy of the system (kinetic plus potential energy at these points) will remain conserved. This is characteristic of a conservative force. Some important examples of...
13.7K
Conservative Forces01:03

Conservative Forces

883
Conservative forces are an essential concept in the field of mechanical engineering. Understanding the properties and characteristics of these forces is crucial to the design and analysis of mechanical systems.
Conservative forces are forces that are dependent only on the initial and final positions of an object and that are independent of the path that the object takes between these positions. These forces conserve energy, which means that the work done by the force is independent of the path...
883
Shear and Bending Moment Diagram: Problem Solving01:24

Shear and Bending Moment Diagram: Problem Solving

3.0K
When analyzing a beam supporting concentrated loads and a distributed load, drawing the shear and bending moment diagrams is essential. These diagrams help understand the internal forces and moments acting on the beam, which is crucial for designing safe and efficient structures. Follow these steps to create the shear and bending moment diagrams:
Draw a Free-Body Diagram: Start by drawing a free-body diagram of the entire beam, including the concentrated loads, distributed load, and reaction...
3.0K
Shearing Strain01:20

Shearing Strain

1.2K
The shearing strain represents a cubic element's angular change when subjected to shearing stress. This type of stress can transform a cube into an oblique parallelepiped without influencing normal strains. The cubic element experiences a significant transformation when exposed solely to shearing stress. Its shape alters from a perfect cube into a rhomboid, clearly demonstrating the effect of shearing strain. The degree of this strain is considered positive if it reduces the angle between the...
1.2K

You might also read

Related Articles

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

Sort by
Same author

Hierarchical fragmentation of regular islands in a discontinuous nontwist map.

Chaos (Woodbury, N.Y.)·2026
Same author

Discrete dynamical systems with scaling and inversion symmetries.

Chaos (Woodbury, N.Y.)·2026
Same author

Time to focus again on matrix metalloproteinases? Results of complex network analysis involving the pathophysiology of HER2-positive breast cancer.

Ecancermedicalscience·2025
Same author

Transport barriers and directed transport in the rational standard nontwist map.

Physical review. E·2025
Same author

Analysis of invariant spanning curves in oval billiards: A numerical approach based on Slater's theorem.

Chaos (Woodbury, N.Y.)·2025
Same author

A recursive method to find the extreme and superstable curves in the parameter space of dissipative one-dimensional mappings.

Chaos (Woodbury, N.Y.)·2025

Related Experiment Video

Updated: Jan 8, 2026

Generation of Shear Adhesion Map Using SynVivo Synthetic Microvascular Networks
09:52

Generation of Shear Adhesion Map Using SynVivo Synthetic Microvascular Networks

Published on: May 25, 2014

9.3K

Shearless barriers in the conservative Ikeda map.

Rodrigo Simile Baroni1, Ricardo Egydio de Carvalho2, José Danilo Szezech Junior3

  • 1Universidade de São Paulo (USP), Instituto de Física, São Paulo, SP 05508-900, Brazil.

Physical Review. E
|December 23, 2025
PubMed
Summary
This summary is machine-generated.

The Ikeda map, a two-dimensional area-preserving system, exhibits shearless barriers in its nonintegrable limit. These barriers emerge and persist based on control parameters, influencing the system's dynamics.

More Related Videos

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

8.5K
Application of Impermeable Barriers Combined with Candidate Factor Soaked Beads to Study Inductive Signals in the Chick
08:04

Application of Impermeable Barriers Combined with Candidate Factor Soaked Beads to Study Inductive Signals in the Chick

Published on: November 17, 2016

9.8K

Related Experiment Videos

Last Updated: Jan 8, 2026

Generation of Shear Adhesion Map Using SynVivo Synthetic Microvascular Networks
09:52

Generation of Shear Adhesion Map Using SynVivo Synthetic Microvascular Networks

Published on: May 25, 2014

9.3K
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

8.5K
Application of Impermeable Barriers Combined with Candidate Factor Soaked Beads to Study Inductive Signals in the Chick
08:04

Application of Impermeable Barriers Combined with Candidate Factor Soaked Beads to Study Inductive Signals in the Chick

Published on: November 17, 2016

9.8K

Area of Science:

  • Dynamical systems
  • Nonlinear dynamics
  • Mathematical physics

Background:

  • The Ikeda map is a two-dimensional area-preserving map.
  • It is governed by control parameters θ and ϕ.
  • The map can be viewed as a composition of rotation and translation.

Purpose of the Study:

  • Investigate the dynamics of the Ikeda map in the conservative limit.
  • Analyze the formation and behavior of shearless barriers.
  • Understand the influence of control parameters on barrier dynamics.

Main Methods:

  • Interpreting the map as a composition of rotation and translation.
  • Analyzing the integrable case (ϕ=0) as uniform rotation.
  • Studying the nonintegrable case (ϕ≠0) with coordinate-dependent rotation.
  • Examining the rotation number profile for extrema indicating barrier formation.
  • Analyzing barrier emergence, persistence, and breakup with parameter variation.

Main Results:

  • In the integrable case (ϕ=0), the Ikeda map is a uniform rotation.
  • For ϕ≠0, the map becomes nonintegrable with coordinate-dependent rotation.
  • Extrema in the rotation number profile signify the formation of shearless barriers.
  • These barriers emerge, persist, and break up depending on control parameters θ and ϕ.

Conclusions:

  • The Ikeda map's conservative limit dynamics are characterized by shearless barriers in the nonintegrable regime.
  • The presence and stability of these barriers are sensitive to control parameters.
  • This work provides insight into the complex dynamics of area-preserving maps.