Maxwell- Gleichungen in Materie

Die vollständigen Potenziale enthalten

• die freie Ladungs- und Stromdichten
• ${\displaystyle \rho ,{\bar {j}}}$
• die Polarisations- und Magnetisierungsbeiträge
• ${\displaystyle {{\rho }_{p}},{{\bar {j}}_{p}},{{\bar {j}}_{m}}}$

Somit folgt für die vollständigen Potenziale:

${\displaystyle {\begin{aligned}&t{\acute {\ }}=t-{\frac {\left|{\bar {r}}-{\bar {r}}{\acute {\ }}\right|}{c}}\\&{\bar {A}}\left({\bar {r}},t\right)={\frac {{\mu }_{{\acute {\ }}0}}{4\pi }}\int _{}^{}{}{{d}^{3}}r{\acute {\ }}{\frac {1}{\left|{\bar {r}}-{\bar {r}}{\acute {\ }}\right|}}\left[{\bar {j}}\left({\bar {r}}{\acute {\ }},t-{\frac {\left|{\bar {r}}-{\bar {r}}{\acute {\ }}\right|}{c}}\right)+{{\bar {j}}_{P}}\left({\bar {r}}{\acute {\ }},t-{\frac {\left|{\bar {r}}-{\bar {r}}{\acute {\ }}\right|}{c}}\right)+{{\bar {j}}_{M}}\left({\bar {r}}{\acute {\ }},t-{\frac {\left|{\bar {r}}-{\bar {r}}{\acute {\ }}\right|}{c}}\right)\right]\\&\Phi \left({\bar {r}},t\right)={\frac {1}{4\pi {{\varepsilon }_{0}}}}\int _{}^{}{}{{d}^{3}}r{\acute {\ }}{\frac {1}{\left|{\bar {r}}-{\bar {r}}{\acute {\ }}\right|}}\left[\rho \left({\bar {r}}{\acute {\ }},t-{\frac {\left|{\bar {r}}-{\bar {r}}{\acute {\ }}\right|}{c}}\right)+{{\rho }_{P}}\left({\bar {r}}{\acute {\ }},t-{\frac {\left|{\bar {r}}-{\bar {r}}{\acute {\ }}\right|}{c}}\right)\right]\\&\\\end{aligned}}}$

Diese Potenziale sind Lösungen der inhomogenen Wellengleichung in Lorentz- Eichung

${\displaystyle {\begin{aligned}&\#{\bar {A}}\left({\bar {r}},t\right)=-{{\mu }_{{\acute {\ }}0}}\left[{\bar {j}}+{{\bar {j}}_{P}}+{{\bar {j}}_{M}}\right]\\&\#\Phi \left({\bar {r}},t\right)=-{\frac {1}{{\varepsilon }_{0}}}\left[\rho +{{\rho }_{P}}\right]\\&\\\end{aligned}}}$

Für die Felder in Materie folgt:

${\displaystyle {\begin{aligned}&{\bar {E}}=-\nabla \Phi \left({\bar {r}},t\right)-{\frac {\partial }{\partial t}}{\bar {A}}\left({\bar {r}},t\right)\\&{\bar {B}}=\nabla \times {\bar {A}}\left({\bar {r}},t\right)\\\end{aligned}}}$

Daraus folgen die Maxwell- Gleichungen:

${\displaystyle {\begin{aligned}&1)\nabla \times {\bar {E}}=-{\frac {\partial }{\partial t}}\nabla \times {\bar {A}}\left({\bar {r}},t\right)=-{\frac {\partial }{\partial t}}{\bar {B}}\\&2)\nabla \cdot {\bar {B}}=0\\\end{aligned}}}$

• Wie im Vakuum

${\displaystyle {\begin{aligned}&3)\nabla \cdot {\bar {E}}=-{\frac {\partial }{\partial t}}\nabla \cdot {\bar {A}}\left({\bar {r}},t\right)-\nabla \cdot \nabla \Phi \\&\nabla \cdot {\bar {A}}\left({\bar {r}},t\right)=-{\frac {1}{{c}^{2}}}{\frac {\partial }{\partial t}}\Phi \\&\Rightarrow \nabla \cdot {\bar {E}}=-{\frac {\partial }{\partial t}}\nabla \cdot {\bar {A}}\left({\bar {r}},t\right)-\nabla \cdot \nabla \Phi ={\frac {1}{{c}^{2}}}{\frac {{\partial }^{2}}{\partial {{t}^{2}}}}\Phi -\Delta \Phi =-\#\Phi \\\end{aligned}}}$

In Lorentz Eichung !

${\displaystyle \nabla \cdot {\bar {E}}=-{\frac {\partial }{\partial t}}\nabla \cdot {\bar {A}}\left({\bar {r}},t\right)-\nabla \cdot \nabla \Phi ={\frac {1}{{c}^{2}}}{\frac {{\partial }^{2}}{\partial {{t}^{2}}}}\Phi -\Delta \Phi =-\#\Phi ={\frac {1}{{\varepsilon }_{0}}}\left(\rho +{{\rho }_{p}}\right)={\frac {1}{{\varepsilon }_{0}}}\left(\rho -\nabla \cdot {\bar {P}}\right)}$

per Definition von

${\displaystyle {{\rho }_{p}}}$

.

${\displaystyle {\begin{aligned}&\Rightarrow 3)\nabla \cdot \left({{\varepsilon }_{0}}{\bar {E}}\left({\bar {r}},t\right)+{\bar {P}}\left({\bar {r}},t\right)\right)=\rho \left({\bar {r}},t\right)\\&\left({{\varepsilon }_{0}}{\bar {E}}\left({\bar {r}},t\right)+{\bar {P}}\left({\bar {r}},t\right)\right):={\bar {D}}\left({\bar {r}},t\right)\\&\Rightarrow \nabla \cdot {\bar {D}}\left({\bar {r}},t\right)=\rho \left({\bar {r}},t\right)\\\end{aligned}}}$

Die Dielektrische Verschiebung

4) Letzte Gleichung:

${\displaystyle {\begin{aligned}&\nabla \times {\bar {B}}\left({\bar {r}},t\right)=\nabla \times \left(\nabla \times {\bar {A}}\left({\bar {r}},t\right)\right)=\nabla \left(\nabla \cdot {\bar {A}}\left({\bar {r}},t\right)\right)-\Delta {\bar {A}}\left({\bar {r}},t\right)\\&\nabla \cdot {\bar {A}}\left({\bar {r}},t\right)=-{\frac {1}{{c}^{2}}}{\frac {\partial }{\partial t}}\Phi \\&\Rightarrow \nabla \times {\bar {B}}\left({\bar {r}},t\right)=-\Delta {\bar {A}}\left({\bar {r}},t\right)-{\frac {1}{{c}^{2}}}{\frac {\partial }{\partial t}}\nabla \Phi \\&\nabla \Phi =-{\bar {E}}-{\frac {\partial }{\partial t}}{\bar {A}}\left({\bar {r}},t\right)\\&\Rightarrow \nabla \times {\bar {B}}\left({\bar {r}},t\right)=-\Delta {\bar {A}}\left({\bar {r}},t\right)+{\frac {1}{{c}^{2}}}{\frac {\partial }{\partial t}}{\bar {E}}+{\frac {1}{{c}^{2}}}{\frac {{\partial }^{2}}{\partial {{t}^{2}}}}{\bar {A}}\left({\bar {r}},t\right)=-\#{\bar {A}}\left({\bar {r}},t\right)+{\frac {1}{{c}^{2}}}{\frac {\partial }{\partial t}}{\bar {E}}\\&={{\mu }_{0}}\left({\bar {j}}+{{\bar {j}}_{P}}+{{\bar {j}}_{M}}\right)+{{\varepsilon }_{0}}{{\mu }_{0}}{\frac {\partial }{\partial t}}{\bar {E}}\\&{{\bar {j}}_{P}}={\dot {\bar {P}}}\\&{{\bar {j}}_{M}}=\nabla \times {\bar {M}}\\&\Rightarrow \nabla \times {\bar {B}}\left({\bar {r}},t\right)={{\mu }_{0}}{\frac {\partial }{\partial t}}\left({\bar {P}}+{{\varepsilon }_{0}}{\bar {E}}\right)+{{\mu }_{0}}\nabla \times {\bar {M}}+{{\mu }_{0}}{\bar {j}}\\&\Rightarrow 4)\\&\Rightarrow \nabla \times \left({\frac {1}{{\mu }_{0}}}{\bar {B}}\left({\bar {r}},t\right)-{\bar {M}}\right)={\bar {j}}+{\frac {\partial }{\partial t}}{\bar {D}}\\&\left({\frac {1}{{\mu }_{0}}}{\bar {B}}\left({\bar {r}},t\right)-{\bar {M}}\right)=H\left({\bar {r}},t\right)\\&\Rightarrow \nabla \times H\left({\bar {r}},t\right)={\bar {j}}+{\frac {\partial }{\partial t}}{\bar {D}}\\\end{aligned}}}$

Mit dem Magnetfeld

${\displaystyle H\left({\bar {r}},t\right)}$

, welches so definiert wurde, dass es nur durch die FREIEN Ströme erzeugt wird:

Zusammenfassung:

${\displaystyle {\begin{aligned}&1)\nabla \times {\bar {E}}=-{\frac {\partial }{\partial t}}\nabla \times {\bar {A}}\left({\bar {r}},t\right)=-{\frac {\partial }{\partial t}}{\bar {B}}\\&2)\nabla \cdot {\bar {B}}=0\\\end{aligned}}}$

${\displaystyle 3)\nabla \cdot {\bar {D}}\left({\bar {r}},t\right)=\rho \left({\bar {r}},t\right)}$

${\displaystyle 4)\nabla \times H\left({\bar {r}},t\right)={\bar {j}}+{\frac {\partial }{\partial t}}{\bar {D}}}$

${\displaystyle 4)\nabla \times H\left({\bar {r}},t\right)-{\frac {\partial }{\partial t}}{\bar {D}}={\bar {j}}}$

Dabei beschreibt

${\displaystyle {\begin{aligned}&1)\nabla \times {\bar {E}}=-{\frac {\partial }{\partial t}}\nabla \times {\bar {A}}\left({\bar {r}},t\right)=-{\frac {\partial }{\partial t}}{\bar {B}}\\&2)\nabla \cdot {\bar {B}}=0\\\end{aligned}}}$

die Wechselwirkung der Felder mit Probeladungen und

${\displaystyle 3)\nabla \cdot {\bar {D}}\left({\bar {r}},t\right)=\rho \left({\bar {r}},t\right)}$

${\displaystyle 4)\nabla \times H\left({\bar {r}},t\right)-{\frac {\partial }{\partial t}}{\bar {D}}={\bar {j}}}$

die Erzeugung der Felder durch FREIE Ladungen und Ströme

Weiter:

${\displaystyle {\begin{aligned}&{\bar {D}}\left({\bar {r}},t\right)={{\varepsilon }_{0}}{\bar {E}}\left({\bar {r}},t\right)+{\bar {P}}\left({\bar {r}},t\right)\\&{\bar {H}}\left({\bar {r}},t\right)={\frac {1}{{\mu }_{0}}}{\bar {B}}\left({\bar {r}},t\right)-{\bar {M}}\left({\bar {r}},t\right)\\\end{aligned}}}$

Im Gauß System ( weil so oft in diesem angegeben, vergl. Jackson):

${\displaystyle {\begin{aligned}&1)\nabla \times {\bar {E}}+{\frac {1}{c}}{\frac {\partial }{\partial t}}{\bar {B}}=0\\&2)\nabla \cdot {\bar {B}}=0\\\end{aligned}}}$

${\displaystyle 3)\nabla \cdot {\bar {D}}\left({\bar {r}},t\right)=4\pi \rho \left({\bar {r}},t\right)}$

${\displaystyle 4)\nabla \times H\left({\bar {r}},t\right)-{\frac {1}{c}}{\frac {\partial }{\partial t}}{\bar {D}}={\frac {4\pi }{c}}{\bar {j}}}$

die Erzeugung der Felder durch FREIE Ladungen und Ströme

Weiter:

${\displaystyle {\begin{aligned}&5){\bar {D}}\left({\bar {r}},t\right)={\bar {E}}\left({\bar {r}},t\right)+4\pi {\bar {P}}\left({\bar {r}},t\right)\\&6){\bar {H}}\left({\bar {r}},t\right)={\bar {B}}\left({\bar {r}},t\right)-4\pi {\bar {M}}\left({\bar {r}},t\right)\\\end{aligned}}}$

Unsere 6 Feldgleichungen ( wenn man so will, also ( es kann nicht oft genug gezeigt werden):

${\displaystyle {\begin{aligned}&1)\nabla \times {\bar {E}}+{\frac {1}{c}}{\frac {\partial }{\partial t}}{\bar {B}}=0\\&2)\nabla \cdot {\bar {B}}=0\\\end{aligned}}}$

${\displaystyle 3)\nabla \cdot {\bar {D}}\left({\bar {r}},t\right)=4\pi \rho \left({\bar {r}},t\right)}$

${\displaystyle 4)\nabla \times H\left({\bar {r}},t\right)-{\frac {1}{c}}{\frac {\partial }{\partial t}}{\bar {D}}={\frac {4\pi }{c}}{\bar {j}}}$

${\displaystyle {\begin{aligned}&5){\bar {D}}\left({\bar {r}},t\right)={\bar {E}}\left({\bar {r}},t\right)+4\pi {\bar {P}}\left({\bar {r}},t\right)\\&6){\bar {H}}\left({\bar {r}},t\right)={\bar {B}}\left({\bar {r}},t\right)-4\pi {\bar {M}}\left({\bar {r}},t\right)\\\end{aligned}}}$

sind nicht vollständig. Es muss noch der Zusammenhang zwischen Polarisation und E- Feld, bzw. B- Feld und Magnetisierung angegeben werden. Dies sind die sogenannten " Materialgleichungen".

Einfachster Fall:

1. isotrope Materie:

${\displaystyle {\bar {E}}\left({\bar {r}},t\right)||{\bar {P}}\left({\bar {r}},t\right)}$

und für paramagnetische Stoffe

${\displaystyle {\bar {B}}\left({\bar {r}},t\right)\uparrow \uparrow {\bar {M}}\left({\bar {r}},t\right)}$

für diamagnetische Stoffe:

${\displaystyle {\bar {B}}\left({\bar {r}},t\right)\uparrow \downarrow {\bar {M}}\left({\bar {r}},t\right)}$

, also ein skalarer Zusammenhang

1. bei nicht zu hohen Feldern:

${\displaystyle {\bar {E}}{\tilde {\ }}{\bar {P}}}$

${\displaystyle {\bar {B}}{\tilde {\ }}{\bar {M}}}$

also ein linearer Zusammenhang

1. ohne Gedächtniseffekte, keine nichtlokale Wechselwirkung ( keine Phasenkohärenzen):

${\displaystyle {\bar {E}}\left({\bar {r}},t\right){\tilde {\ }}{\bar {P}}\left({\bar {r}},t\right)}$

${\displaystyle {\bar {B}}\left({\bar {r}},t\right){\tilde {\ }}{\bar {M}}\left({\bar {r}},t\right)}$

neben der Linearität also ein INSTANTANER, LOKALER Zusammenhang !

Dann kann man schreiben:

${\displaystyle {\bar {P}}\left({\bar {r}},t\right)={{\varepsilon }_{0}}{{\chi }_{e}}{\bar {E}}\left({\bar {r}},t\right)}$

${\displaystyle {\bar {M}}\left({\bar {r}},t\right)={{\chi }_{M}}{\bar {H}}\left({\bar {r}},t\right)}$

Mit den Suszeptibilitäten, der elektrischen Suszeptibilität

${\displaystyle {{\chi }_{e}}}$

und der magnetischen Suszeptibilität

${\displaystyle {{\chi }_{M}}}$

( Materialkonstanten). Die Materialkonstanten müssen aus den mikroskopischen Theorien ( z.B. Quantentheorie, Festkörperphysik) abgeleitet werden.

${\displaystyle {\bar {D}}\left({\bar {r}},t\right)={{\varepsilon }_{0}}{\bar {E}}\left({\bar {r}},t\right)+{\bar {P}}={{\varepsilon }_{0}}\left(1+{{\chi }_{e}}\right){\bar {E}}\left({\bar {r}},t\right)={{\varepsilon }_{0}}\varepsilon {\bar {E}}\left({\bar {r}},t\right)}$ mit ${\displaystyle \varepsilon =\left(1+{{\chi }_{e}}\right)}$

, der relativen Dielektrizitätskonstante ( permittivity)

${\displaystyle {\bar {B}}={{\mu }_{0}}\left({\bar {H}}+{\bar {M}}\right)={{\mu }_{0}}\left(1+{{\chi }_{M}}\right){\bar {H}}\left({\bar {r}},t\right)={{\mu }_{0}}\mu {\bar {H}}}$ mit ${\displaystyle \left(1+{{\chi }_{M}}\right)=\mu }$

, der relativen Permeabilität

${\displaystyle \Rightarrow {\bar {M}}={{\chi }_{M}}{\bar {H}}={\frac {1}{{\mu }_{0}}}{\frac {{\chi }_{M}}{\mu }}{\bar {B}}={\frac {1}{{\mu }_{0}}}{\frac {{\chi }_{M}}{\left(1+{{\chi }_{M}}\right)}}{\bar {B}}}$

Man sagt: Ein Stoff ist paramagnetisch für

${\displaystyle {\frac {{\chi }_{M}}{\left(1+{{\chi }_{M}}\right)}}>0}$

diamagnetisch für

${\displaystyle {\frac {{\chi }_{M}}{\left(1+{{\chi }_{M}}\right)}}<0}$

paramagnetisch:

${\displaystyle {{\chi }_{M}}>0\Rightarrow \mu >1}$ diamagnetisch ${\displaystyle 0>{{\chi }_{M}}>-1\Rightarrow 0<\mu <1}$

Bemerkungen

${\displaystyle {\bar {E}}\left({\bar {r}},t\right)=0\Rightarrow {\bar {P}}=0}$

beschreibt kein Ferroelektrikum

${\displaystyle {\bar {B}}=0\Rightarrow {\bar {M}}=0}$

kein Ferromagnet

Es gilt stets

${\displaystyle {{\chi }_{e}}>0}$

( Dielektrischer Effekt, Polarisierbarkeit → es existiert keine negative Polarisierbarkeit)

${\displaystyle {{\chi }_{M}}{\begin{matrix}>\\<\\\end{matrix}}0}$

Para- ODER Diamagnet

Ein Term

${\displaystyle {\tilde {\ }}{\bar {B}}}$ in ${\displaystyle {\bar {P}}}$ oder ${\displaystyle {\tilde {\ }}{\bar {E}}}$ in ${\displaystyle {\bar {M}}}$

kann gar nicht auftreten, schon wegen des falschen Raumspiegelverhaltens !

${\displaystyle {\bar {E}}}$

ist polarer Vektor,

${\displaystyle {\bar {B}}}$

ist axialer Vektor !

${\displaystyle {{\rho }_{P}}\left({\bar {r}},t\right)=-\nabla \cdot {\bar {P}}\left({\bar {r}},t\right)}$

ist ein Skalar

${\displaystyle {{\bar {j}}_{M}}=rot{\bar {M}}}$

ist ein polarer Vektor.

Abweichungen

1)Für anisotrope Kristalle :

${\displaystyle {\bar {P}}\left({\bar {r}},t\right)={{\varepsilon }_{0}}{{\bar {\bar {\chi }}}_{e}}{\bar {E}}}$

drückt den anisotropen Charakter aus mit einem symmetrischen Tensor

${\displaystyle {{\bar {\bar {\chi }}}_{e}}}$

.

2) für starke Felder gibt es nichtlineare Effekte, die ebenfalls tensoriellen Charakter der Suszeptibilität bedingen:

${\displaystyle {\bar {P}}\left({\bar {r}},t\right)={{\varepsilon }_{0}}\left({{\bar {\bar {\chi }}}_{e}}^{(1)}{\bar {E}}+{{\bar {\bar {\chi }}}_{e}}^{(2)}{{\bar {E}}^{2}}+{{\bar {\bar {\chi }}}_{e}}^{(3)}{{\bar {E}}^{3}}+...\right)}$

Anwendung: optische Nichtlinearität, Beispiel: optische Bistabilität, optische Schalter:

Für hochfrequente Felder folgt:

${\displaystyle {\bar {P}}\left({\bar {r}},t\right)={{\varepsilon }_{0}}\int _{}^{}{}{{d}^{3}}r{\acute {\ }}dt{\acute {\ }}{{\chi }_{e}}\left({\bar {r}},{\bar {r}}{\acute {\ }},t,t{\acute {\ }}\right){\bar {E}}\left({\bar {r}}{\acute {\ }},t{\acute {\ }}\right)}$

( räumliche bzw. zeitliche Dispersion):

${\displaystyle {\hat {\bar {P}}}\left({\bar {k}},\omega \right)={{\varepsilon }_{0}}{{\hat {\chi }}_{e}}\left({\bar {k}},\omega \right){\hat {\bar {E}}}\left({\bar {k}},\omega \right)}$