Benutzer:MovGP0/Physik/Spezielle Relativitätstheorie

Spezielle Relativitätstheorie

Viervektoren

Elektrisches Dipolmoment

${\displaystyle p=(E,\mathbf {p} )}$

Elektrische Stromdichte

${\displaystyle j=(p,\mathbf {j} )}$

Magnetisches Vektorpotential

${\displaystyle A=(V,\mathbf {A} )}$

Ableitung

${\displaystyle \partial _{\mu }\equiv \left({\frac {\partial }{\partial \,x^{\mu }}}\right)_{\mu }=\left({\frac {\partial }{\partial \,t}},\mathbf {\nabla } \right)_{\mu }=\left({\frac {\partial }{\partial \,t}},{\frac {\partial }{\partial \,x}},{\frac {\partial }{\partial \,y}},{\frac {\partial }{\partial \,z}}\right)_{\mu }}$

Metrischer Tensor

${\displaystyle g_{\mu \nu }={\begin{cases}1&{\text{if }}\mu =\nu =0\\-\delta _{\mu }^{\nu }&{\text{if }}(\mu \neq 0)\lor (\nu \neq 0)\end{cases}}}$

${\displaystyle g_{\mu \nu }={\begin{pmatrix}1&0&0&0\\0&-1&0&0\\0&0&-1&0\\0&0&0&-1\end{pmatrix}}}$

Hoch- und Tiefstellen von Indizes:

${\displaystyle a_{\mu }=g_{\mu \nu }\,a^{\nu }}$

${\displaystyle a_{0}=a^{0}}$

${\displaystyle a_{i}=-a^{i}}$

Kronecker-Delta

${\displaystyle \delta _{\mu }^{\nu }={\begin{cases}0{\text{ if }}\mu \neq \nu \\1{\text{ if }}\mu =\nu \end{cases}}}$

${\displaystyle \delta _{\mu \nu }=g_{\mu \xi }\,\delta _{\nu }^{\xi }=g_{\nu \mathrm {o} }\,g_{\mu \xi }\,\delta ^{\xi \mathrm {o} }=\delta ^{\mu \nu }}$

Inneres Produkt

${\displaystyle a\cdot b=a^{0}\,b^{0}-\mathbf {a} \cdot \mathbf {b} =g_{\mu \nu }\,a^{\mu }\,b^{\nu }=a_{\mu }\,b^{\nu }=a^{\mu }\,b_{\nu }}$

Beispiele

${\displaystyle p\cdot p=p_{\mu }\,p^{\mu }=(E,\mathbf {p} )\cdot (E,\mathbf {p} )=E^{2}-\mathbf {p} ^{2}=m^{2}}$

${\displaystyle \partial _{\mu }=x^{\nu }={\dfrac {\partial x^{\nu }}{\partial x^{\mu }}}=\delta _{\mu }^{\nu }=4}$ (wg. Summenkonvention)

d’Alembert-Operator:

${\displaystyle \square =\partial ^{2}=\partial _{\mu }^{\mu }={\dfrac {\partial ^{2}}{\partial (ct)^{2}}}-{\dfrac {\partial ^{2}}{\partial x^{2}}}-{\dfrac {\partial ^{2}}{\partial y^{2}}}-{\dfrac {\partial ^{2}}{\partial z^{2}}}={\dfrac {\partial ^{2}}{c^{2}\partial t^{2}}}-{\boldsymbol {\nabla }}^{2}={\dfrac {\partial ^{2}}{c^{2}\partial t^{2}}}-{\boldsymbol {\Delta }}}$

Koordinatentransformation

Kontravariante Transformation

Transformation von Vektor ${\displaystyle r}$ von Inertialsystem (Basis) ${\displaystyle {\mathcal {S}}}$ nach ${\displaystyle {\mathcal {S'}}}$

${\displaystyle r'^{\mu }=\left({\frac {\partial \,{\mathcal {S'}}^{\mu }}{\partial \,{\mathcal {S}}^{\nu }}}\right)\,r^{\nu }}$

Kovariante Transformation

Transformation von Gradientvektor ${\displaystyle {\frac {\partial \,\phi }{\partial \,r^{\mu }}}\equiv \partial \,\phi ^{\mu }}$ von Inertialsystem (Basis) ${\displaystyle {\mathcal {S}}}$ nach ${\displaystyle {\mathcal {S'}}}$

${\displaystyle {\frac {\partial \,\phi }{\partial \,{\mathcal {S'}}^{\mu }}}=\left({\frac {\partial \,{\mathcal {S}}^{\mu }}{\partial \,{\mathcal {S'}}^{\nu }}}\right)\,{\frac {\partial \,\phi }{\partial \,{\mathcal {S}}^{\nu }}}}$

Lorentz-Transformation

${\displaystyle {\begin{pmatrix}ct'\\r'^{i}\end{pmatrix}}={\begin{pmatrix}\gamma &-\gamma \beta _{i}\\-\gamma \beta _{j}&\delta _{ij}+(\gamma -1){\dfrac {\beta _{i}\beta _{j}}{\beta ^{2}}}\\\end{pmatrix}}{\begin{pmatrix}ct\\r^{i}\end{pmatrix}}}$

mit

${\displaystyle \gamma ={\frac {1}{\left(1-\left(\mathbf {\beta } \right)^{2}\right)^{\frac {1}{2}}}}}$

${\displaystyle \mathbf {\beta } ^{i}={\frac {\mathbf {v} ^{i}}{c}}}$

${\displaystyle c=1}$

als Tensor

${\displaystyle r'^{\mu }={\Lambda ^{\mu }}_{\nu }\,r^{\nu }}$

mit

${\displaystyle {\Lambda ^{\mu }}_{\nu }={\frac {\partial \,{\mathcal {S}}^{\mu }}{\partial \,{\mathcal {S'}}^{\nu }}}}$

als Matrix

${\displaystyle \left[{\Lambda ^{\mu }}_{\nu }\right]_{\mathcal {S}}={\begin{pmatrix}\gamma &-\beta _{1}\,\gamma &-\beta _{2}\,\gamma &-\beta _{3}\,\gamma \\-\beta _{1}\,\gamma &\delta _{11}+\left(\gamma -1\right)\,{\dfrac {\beta _{1}\,\beta _{1}}{(\beta )^{2}}}&\delta _{12}+\left(\gamma -1\right)\,{\dfrac {\beta _{1}\,\beta _{2}}{(\beta )^{1}}}&\delta _{13}+\left(\gamma -1\right)\,{\dfrac {\beta _{1}\,\beta _{3}}{(\beta )^{2}}}\\-\beta _{2}\,\gamma &\delta _{21}+\left(\gamma -1\right)\,{\dfrac {\beta _{2}\,\beta _{1}}{(\beta )^{2}}}&\delta _{22}+\left(\gamma -1\right)\,{\dfrac {\beta _{2}\,\beta _{2}}{(\beta )^{2}}}&\delta _{23}+\left(\gamma -1\right)\,{\dfrac {\beta _{2}\,\beta _{3}}{(\beta )^{2}}}\\-\beta _{3}\,\gamma &\delta _{31}+\left(\gamma -1\right)\,{\dfrac {\beta _{3}\,\beta _{1}}{(\beta )^{2}}}&\delta _{32}+\left(\gamma -1\right)\,{\dfrac {\beta _{3}\,\beta _{2}}{(\beta )^{2}}}&\delta _{33}+\left(\gamma -1\right)\,{\dfrac {\beta _{3}\,\beta _{3}}{(\beta )^{2}}}\end{pmatrix}}}$

mit

${\displaystyle \Lambda _{00}=\gamma }$

${\displaystyle \Lambda _{0i}=\Lambda _{i0}=-\gamma \beta _{i}}$

${\displaystyle \Lambda _{ij}=\Lambda _{ji}=\delta _{ij}+(\gamma -1){\dfrac {\beta _{i}\beta _{j}}{\beta ^{2}}}}$

Tranformation auf allgemeinem Tensor

${\displaystyle {T'}_{l'\ldots n'}^{i'\ldots k'}={\dfrac {\partial {x'}^{i'}}{\partial {x}^{i}}}\cdots {\dfrac {\partial {x'}^{k'}}{\partial {x}^{k}}}\ {\dfrac {\partial {x}^{l}}{\partial {x'}^{l'}}}\cdots {\dfrac {\partial {x}^{n}}{\partial {x'}^{n'}}}\ T_{l\ldots n}^{i\ldots k}}$

Beispiel

${\displaystyle {\delta '}_{i}^{j}={\dfrac {\partial {x'}^{i}}{\partial {x}^{k}}}\ {\dfrac {\partial {x}^{l}}{\partial {x'}^{j}}}\ {\delta }_{k}^{l}={\dfrac {\partial {x'}^{i}}{\partial {x}^{k}}}\ {\dfrac {\partial {x}^{k}}{\partial {x'}^{j}}}={\delta }_{i}^{j}}$

Levi-Civita-Symbol

${\displaystyle \varepsilon ^{i_{1}\dots i_{n}}=\prod _{1\leq p<q\leq n}{\frac {i_{p}-i_{q}}{p-q}}}$

Anwendung:

${\displaystyle (\mathbf {b} \times \mathbf {c} )^{i}=\epsilon ^{ijk}\,b^{j}\,c^{k}}$

${\displaystyle \mathbf {a} \cdot (\mathbf {b} \times \mathbf {c} )^{i}=\epsilon ^{ijk}\,a^{i}\,b^{j}\,c^{k}}$

${\displaystyle \det \mathbf {A} =\epsilon _{i_{1}\,i_{2}\,\ldots \,i_{n}}\,A_{1\,i_{1}}\,A_{2\,i_{2}}\,\ldots \,A_{n\,i_{n}}}$

Beispiel

${\displaystyle i}$ ${\displaystyle j}$ ${\displaystyle \varepsilon ^{ij}}$ 0 1 +1 1 0 -1 1 1 0 0 0 0

${\displaystyle i}$ ${\displaystyle j}$ ${\displaystyle k}$ ${\displaystyle \varepsilon ^{ijk}}$ 0 1 2 +1 1 0 2 -1 1 2 0 +1 2 1 0 -1 2 0 1 +1 0 2 1 -1 sonst. 0

${\displaystyle i}$ ${\displaystyle j}$ ${\displaystyle k}$ ${\displaystyle l}$ ${\displaystyle \varepsilon ^{ijkl}}$ 0 1 2 3 +1 1 0 2 3 -1 1 2 0 3 +1 1 2 3 0 -1 2 1 3 0 +1 2 3 1 0 -1 2 3 0 1 +1 3 2 0 1 -1 3 0 2 1 +1 3 0 1 2 -1 0 3 1 2 +1 0 1 3 2 -1 sonst. 0