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Gauss's Law: Planar Symmetry01:27

Gauss's Law: Planar Symmetry

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A planar symmetry of charge density is obtained when charges are uniformly spread over a large flat surface. In planar symmetry, all points in a plane parallel to the plane of charge are identical with respect to the charges. Suppose the plane of the charge distribution is the xy-plane, and the electric field at a space point P with coordinates (x, y, z) is to be determined. Since the charge density is the same at all (x, y) - coordinates in the z = 0 plane, by symmetry, the electric field at P...
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Conservation of Mass in Finite Cotrol Volume01:16

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The principle of conservation of mass is a fundamental law in fluid mechanics and is applied using the continuity equation. We apply the concept to a finite control volume to derive the continuity equation.
A system is defined as a collection of unchanging contents, and the conservation of mass states that a system's mass is constant.
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Conservation of Mass in Fixed, Nondeforming Control Volume01:07

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The principle of conservation of mass is fundamental in fluid dynamics and is crucial for analyzing flow within fixed control volumes, such as pipes or ducts. This principle states that the total mass within a control volume remains constant unless altered by the inflow or outflow of mass through the control surfaces. This results in a vital relationship for steady, incompressible flow where the mass entering a system equals the mass leaving it.
In the case of a sewer pipe, which can be modeled...
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Gauss's Law: Cylindrical Symmetry01:20

Gauss's Law: Cylindrical Symmetry

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A charge distribution has cylindrical symmetry if the charge density depends only upon the distance from the axis of the cylinder and does not vary along the axis or with the direction about the axis. In other words, if a system varies if it is rotated around the axis or shifted along the axis, it does not have cylindrical symmetry. In real systems, we do not have infinite cylinders; however, if the cylindrical object is considerably longer than the radius from it that we are interested in,...
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Gauss's Law: Spherical Symmetry01:26

Gauss's Law: Spherical Symmetry

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A charge distribution has spherical symmetry if the density of charge depends only on the distance from a point in space and not on the direction. In other words, if the system is rotated, it doesn't look different. For instance, if a sphere of radius R is uniformly charged with charge density ρ0, then the distribution has spherical symmetry. On the other hand, if a sphere of radius R is charged so that the top half of the sphere has a uniform charge density ρ1 and the bottom half has a...
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Conservation of Mass in Moving, Nondeforming Control Volume01:14

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Stormwater detention basins are essential in managing runoff during heavy rainfall, particularly in urban areas where impervious surfaces increase the risk of flooding. Understanding the conservation of mass in these systems allows engineers to optimize basin performance, balancing inflow, outflow, and water storage.
In the context of a detention basin, the conservation of mass states that the total mass of water entering the basin must equal the mass leaving the basin plus any accumulation of...
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Related Experiment Video

Updated: Nov 4, 2025

Setting Limits on Supersymmetry Using Simplified Models
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Nearly Conformal Composite Higgs Model.

Thomas Appelquist1, James Ingoldby2, Maurizio Piai3

  • 1Department of Physics, Sloane Laboratory, Yale University, New Haven, Connecticut 06520, USA.

Physical Review Letters
|May 28, 2021
PubMed
Summary
This summary is machine-generated.

This study explores a composite Higgs model using a SU(3) gauge theory with eight fermions. The research modifies an effective field theory (EFT) to include Standard Model quantum numbers, potentially explaining the Higgs boson and electroweak symmetry breaking.

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Area of Science:

  • High Energy Physics
  • Particle Physics
  • Beyond Standard Model Physics

Background:

  • Composite Higgs models offer an alternative to the elementary Higgs boson of the Standard Model.
  • A confining SU(3) gauge theory with N_{f}=8 Dirac fermions is a viable framework for composite Higgs models.
  • Lattice studies indicate this gauge theory is well-described by a dilaton effective field theory (EFT).

Purpose of the Study:

  • To investigate a composite Higgs model based on a SU(3) gauge theory with N_{f}=8 Dirac fermions.
  • To modify the dilaton EFT by incorporating Standard Model quantum numbers and electroweak symmetry breaking.
  • To analyze the phenomenological implications and tuning requirements of the proposed composite Higgs model.

Main Methods:

  • Modification of a dilaton effective field theory (EFT) by assigning Standard Model quantum numbers.
  • Inclusion of a term in the potential to trigger electroweak symmetry breaking.
  • Coupling the model to the top quark and analyzing its phenomenology.

Main Results:

  • The model features a composite pseudo-Nambu-Goldstone boson (pNGB) Higgs, heavier pNGBs, and an approximate dilaton within a similar mass range.
  • The study discusses the necessary tuning to reconcile the model with existing experimental constraints.
  • The crucial role of the dilaton field in the model's consistency is highlighted.

Conclusions:

  • The composite Higgs model based on SU(3) gauge theory with N_{f}=8 fermions provides a framework for electroweak symmetry breaking.
  • The model's consistency with current bounds depends on specific tuning parameters, with the dilaton playing a significant role.
  • Further investigation into the phenomenology and tuning of this composite Higgs model is warranted.