Additive K-theory: Difference between revisions

Revision as of 07:14, 24 December 2012

Magnetic translations are naturally defined operators acting on wave function on a two-dimensional particle in a magnetic field.

According to,^[1] the motion of an electron in a magnetic field on a plane is described by the following four variables: guiding center coordinates $(X, Y)$ and the relative coordinates $(R_{x}, R_{y})$ .

The guiding center coordinates are independent of the relative coordinates and, when quantized, satisfy
$[X, Y] = - i ℓ_{B}^{2}$ ,
where $ℓ_{B} = \sqrt{ℏ / e B}$ , which makes them mathematically similar to the position and momentum operators $Q = q$ and $P = - i ℏ \frac{d}{d q}$ in one-dimensional quantum mechanics.

Much like acting on a wave function $f (q)$ of a one-dimensional quantum particle by the operators $e^{i a P}$ and $e^{i b Q}$ generate the shift of momentum or position of the particle, for the quantum particle in 2D in magnetic field one considers the magnetic translation operators
$e^{i (p_{x} X + p_{y} Y)},$
for any pair of numbers $(p_{x}, p_{y})$ .

The magnetic translation operators corresponding to two different pairs $(p_{x}, p_{y})$ and $(p'_{x}, p'_{y})$ do not commute.

References

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↑ Z.Ezawa. Quantum Hall Effect, 2nd ed, World Scientific. Chapter 28

[1] Z.Ezawa. Quantum Hall Effect, 2nd ed, World Scientific. Chapter 28

[1]

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+{{Orphan|date=April 2010}}
+'''Magnetic translations''' are naturally defined operators acting on [[wave function]] on a two-dimensional particle in a [[magnetic field]].
+According to,<ref>Z.Ezawa. ''Quantum Hall Effect'', 2nd ed, World Scientific. Chapter 28</ref> the motion of an [[electron]] in a magnetic field on a plane is described by the following four variables: guiding center coordinates <math> (X,Y) </math> and the relative coordinates <math> (R_x,R_y) </math>.
+The guiding center coordinates are independent of the relative coordinates and, when quantized, satisfy
+<br /><math> [X,Y]=-i \ell_B^2 </math>, <br />
+where <math> \ell_B=\sqrt{\hbar/eB} </math>, which makes them mathematically similar to the position and momentum operators <math> Q =q</math> and <math> P=-i\hbar \frac{d}{dq} </math> in one-dimensional [[quantum mechanics]].
+Much like acting on a wave function <math> f(q) </math> of a one-dimensional quantum particle by the operators <math> e^{iaP} </math> and <math>  e^{ibQ} </math> generate the shift of momentum or position of the particle, for the quantum particle in 2D in magnetic field one considers the '''magnetic translation operators'''
+<br /><math> e^{i(p_x X + p_y Y)}, </math> <br />
+for any pair of numbers <math> (p_x, p_y) </math>.
+The magnetic translation operators corresponding to two different pairs <math> (p_x,p_y) </math> and <math> (p'_x,p'_y) </math> do not commute.
+==References==
+<!--- See [[Wikipedia:Footnotes]] on how to create references using <ref></ref> tags which will then appear here automatically -->
+{{Reflist}}
+{{DEFAULTSORT:Magnetic Translation}}
+[[Category:Quantum mechanics]]
+[[Category:Magnetism]]
+[[Category:Quantum magnetism]]

Additive K-theory: Difference between revisions

Revision as of 07:14, 24 December 2012

References

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