"Electromagnetics"의 두 판 사이의 차이

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41번째 줄: 41번째 줄:
  
 
*  vector potential <math>A</math><br> from <math>\nabla \cdot \mathbf{B} = 0</math>, we can find a vector potential such that <math>\mathbf{B}=\nabla \times \mathbf{A}</math><br>
 
*  vector potential <math>A</math><br> from <math>\nabla \cdot \mathbf{B} = 0</math>, we can find a vector potential such that <math>\mathbf{B}=\nabla \times \mathbf{A}</math><br>
*  scalar potential <math>\phi</math> <br><math>\mathbf{E}=-\frac{\partial\mathbf{A}}{\partial t} - \nabla \phi </math><br>
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*  scalar potential <math>\phi</math><br><math>\mathbf{E}=-\frac{\partial\mathbf{A}}{\partial t} - \nabla \phi </math><br>
  
 
 
 
 
73번째 줄: 73번째 줄:
 
* <math>F_{01}=-\partial_{0} A_{1} + \partial_{1} A_{0}=-\partial_{t} A_{x} -\partial_{x} \phi=E{x}</math><br>
 
* <math>F_{01}=-\partial_{0} A_{1} + \partial_{1} A_{0}=-\partial_{t} A_{x} -\partial_{x} \phi=E{x}</math><br>
 
* <math>F_{12}=-\partial_{1} A_{2} + \partial_{2} A_{1}=-\partial_{x} A_{y} + \partial_{y} A_{x}=-B_{z}</math><br>
 
* <math>F_{12}=-\partial_{1} A_{2} + \partial_{2} A_{1}=-\partial_{x} A_{y} + \partial_{y} A_{x}=-B_{z}</math><br>
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<h5 style="margin: 0px; line-height: 2em;">action</h5>
  
 
 
 
 
90번째 줄: 96번째 줄:
 
 
 
 
  
 
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<h5 style="margin: 0px; line-height: 3.428em; color: rgb(34, 61, 103); font-family: 'malgun gothic',dotum,gulim,sans-serif; font-size: 1.166em; background-position: 0px 100%;">conserved four-current</h5>
 
 
<h5 style="margin: 0px; line-height: 3.428em; color: rgb(34, 61, 103); font-family: 'malgun gothic',dotum,gulim,sans-serif; font-size: 1.166em; background-position: 0px 100%;">four-current</h5>
 
  
 
* charge density and current density<br>
 
* charge density and current density<br>
105번째 줄: 109번째 줄:
 
: a labels the [http://en.wikipedia.org/wiki/Spacetime space-time] [http://en.wikipedia.org/wiki/Dimension dimensions]
 
: a labels the [http://en.wikipedia.org/wiki/Spacetime space-time] [http://en.wikipedia.org/wiki/Dimension dimensions]
 
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:* four vector is called a conserved current if <math>\partial_{a}J^{a}=0</math>
  
 
 
 
 

2010년 9월 1일 (수) 12:15 판

Lorentz force
  • almost all forces in mechanics are conservative forces, those that are functions nly of positions, and certainly not functions of velocities
  • Lorentz force is a rare example of velocity dependent force

 

 

polarization of light
  • has two possibilites
    • what does this mean?

 

 

notations
  • vector potential \(\mathbf{A}(x,y,z,t)=(A_{x},A_{y},A_{z})\)
  • electrostatic potential \(\phi(x,y,z,t)\) (scalar)
  • electric field \(\mathbf{E}\)
  • magnetic field \(\mathbf{B}\)
  • \({\rho} \)
  • \(\mathbf{J}\)
  • \(\mu_0\)
  • \(\varepsilon_0\)

 

 

Maxwell's equations
  • using vector calculus notation
    \(\nabla \cdot \mathbf{E} = \frac {\rho} {\varepsilon_0}\)
    \(\nabla \cdot \mathbf{B} = 0\)
    \(\nabla \times \mathbf{E} = -\frac{\partial \mathbf{B}} {\partial t}\)
    \(\nabla \times \mathbf{B} = \mu_0\mathbf{J} + \mu_0 \varepsilon_0 \frac{\partial \mathbf{E}} {\partial t}\ \)

 

potentials
  • vector potential \(A\)
    from \(\nabla \cdot \mathbf{B} = 0\), we can find a vector potential such that \(\mathbf{B}=\nabla \times \mathbf{A}\)
  • scalar potential \(\phi\)
    \(\mathbf{E}=-\frac{\partial\mathbf{A}}{\partial t} - \nabla \phi \)

 

 

electromagnetic field (four vector potential)
  • defined as follows
    \(A_{\alpha} = \left( - \phi, \mathbf{A} \right)=(-\phi,A_{x},A_{y},A_{z})\)
    \(\phi\) is the scalar potential
    \(A\)  is the vector potential.
  • gague field describing the photon

 

 

gauge transformation
  • For any scalar field \(\Lambda(x,y,z,t)\), the following transformation does not change any physical quantity
    \(\mathbf{A} \to \mathbf{A} +\del \Lambda\)
    \(\phi\to \phi-\frac{\partial\Lambda}{\partial t}\)
  • unchanged quantities
    \(\mathbf{B}=\nabla \times \mathbf{A}\)
    \(\mathbf{E}=-\frac{\partial\mathbf{A}}{\partial t} - \nabla \phi \)
  • the electromagnetic potential is a connection on a U(1)-bundle on spacetime whose curvature is the electromagnetic field
  • the electromagnetism is a gauge field theory with structure group U(1)

 

 

Covariant formulation
  • electromagnetic field strength
    \(F_{\alpha \beta} = \partial_{\beta} A_{\alpha}-\partial_{\alpha} A_{\beta}\)
    \(F_{\alpha \beta} = \left( \begin{matrix} 0 & \frac{E_x}{c} & \frac{E_y}{c} & \frac{E_z}{c} \\ \frac{-E_x}{c} & 0 & -B_z & B_y \\ \frac{-E_y}{c} & B_z & 0 & -B_x \\ \frac{-E_z}{c} & -B_y & B_x & 0 \end{matrix} \right)\)
  • \(F_{01}=-\partial_{0} A_{1} + \partial_{1} A_{0}=-\partial_{t} A_{x} -\partial_{x} \phi=E{x}\)
  • \(F_{12}=-\partial_{1} A_{2} + \partial_{2} A_{1}=-\partial_{x} A_{y} + \partial_{y} A_{x}=-B_{z}\)

 

 

action

 

 

 

charge density and current density

 

 

conserved four-current
  • charge density and current density

\[J^a = \left(c \rho, \mathbf{j} \right)\] where


c is the speed of light
ρ the charge density
j the conventional current density.
a labels the space-time dimensions
  • four vector is called a conserved current if \(\partial_{a}J^{a}=0\)

 

 

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