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C3TorusCellStructure.png
C6TorusCellStructure.png
D6TorusCellStructure.png?
The original article:
Review:
Eric Opdam, Valerio Toledano Laredo: On Harish-Chandra’s Isomorphism [arXiv:2412.17525 ]
The quantum of magnetic flux is
ϕ 0 = h e
\phi_0
\;=\;
\frac{h}{e}
where
In SI units this is approximately
ϕ 0 ≡ h e ∼ 6.626 × 10 − 34 J s 1.602 × 10 − 19 C ∼ 4.136 × 10 − 15 J s C = 4.136 × 10 − 15 T m 2 ,
\phi_0
\;\equiv\;
\frac{h}{e}
\;\sim\;
\frac
{6.626 \times 10^{-34} \, J s}
{1.602 \times 10^{-19} \, C}
\;\sim\;
4.136 \times 10^{-15} \, \frac{J s}{C}
\;=\;
4.136 \times 10^{-15} \, T m^2
\,,
where in the last step we used that
one Joule is one Newton meter
and one Tesla is one Newton second per Coulomb meter
T ≔ N s C m .
T
\;\coloneqq\;
\frac
{ N s }
{ C m }
\,.
Aharonov–Bohm interference and fractional statistics in a quantum Hall interferometer
/
D D
/
∂ \partial
New MathML code:
D
/
To test with with different browsers:
code rendering $\slash{D}$D \slash{D} $D\!\!\!\!\!/$D / D\!\!\!\!\!/ $𝐷̸$𝐷 ̸ 𝐷̸ $\text{𝐷̸}$𝐷̸ \text{𝐷̸} $\text{∂̸}$∂̸ \text{∂̸}
Testing MathML code directly:
D
/
D
Combining Unicode characters:
D̸
d̸
π 3 ( S 2 ) ⏟ ℤ ⟶ π 2 Ω S 2 ⏟ ℤ ⟶ π 2 ℒ S 2 ⟶ π 2 S 2 ⏟ ℤ ⟶ π 1 Ω S 2 ⏟ ℤ → − ∼ − π 1 ℒ S 2 ⏟ ℤ
\underset{\mathbb{Z}}{\underbrace{
\pi_3(S^2)
}}
\longrightarrow
\underset{\mathbb{Z}}{\underbrace{
\pi_2 \Omega S^2
}}
\longrightarrow
\pi_2 \mathcal{L} S^2
\longrightarrow
\underset{\mathbb{Z}}{\underbrace{
\pi_2 S^2
}}
\longrightarrow
\underset{\mathbb{Z}}{\underbrace{
\pi_1 \Omega S^2
}}
\xrightarrow{\phantom{-} \sim \phantom{-}}
\underset{\mathbb{Z}}{\underbrace{
\pi_1 \mathcal{L} S^2
}}
0 ⟶ ℤ / n ⟶ π 2 ℒ S 2 ⟶ ℤ ⟶ 0
0
\longrightarrow
\mathbb{Z}/n
\longrightarrow
\pi_2 \mathcal{L} S^2
\longrightarrow
\mathbb{Z}
\longrightarrow
0
Last revised on July 15, 2025 at 18:30:58.
See the history of this page for a list of all contributions to it.
