Fix eq. (2.19); typography

Former-commit-id: 13ff4d97953d74878fcd16c1b2e581fb4284fc65
This commit is contained in:
Marek Nečada 2020-06-22 16:00:18 +03:00
parent 31f8eda4d2
commit f756592bc5
3 changed files with 31 additions and 21 deletions

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@ -55,8 +55,8 @@ figs-within-sections
\pdf_colorlinks false \pdf_colorlinks false
\pdf_backref false \pdf_backref false
\pdf_pdfusetitle true \pdf_pdfusetitle true
\papersize a4paper \papersize default
\use_geometry true \use_geometry false
\use_package amsmath 2 \use_package amsmath 2
\use_package amssymb 1 \use_package amssymb 1
\use_package cancel 1 \use_package cancel 1

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@ -1751,7 +1751,7 @@ Let
\begin_inset Formula $\vect r_{1}$ \begin_inset Formula $\vect r_{1}$
\end_inset \end_inset
can be always expanded in terms of regular VSWFs with origin can be expanded in terms of regular VSWFs with origin
\begin_inset Formula $\vect r_{2}$ \begin_inset Formula $\vect r_{2}$
\end_inset \end_inset
@ -1786,12 +1786,13 @@ reference "eq:translation operator"
: :
\begin_inset Formula \begin_inset Formula
\begin{eqnarray} \begin{multline}
\vswfouttlm{\tau}lm\left(\kappa\left(\vect r-\vect r_{1}\right)\right) & = & \begin{cases} \vswfouttlm{\tau}lm\left(\kappa\left(\vect r-\vect r_{1}\right)\right)=\\
\sum_{\tau'l'm'}\trops_{\tau lm;\tau'l'm'}\left(\kappa\left(\vect r_{2}-\vect r_{1}\right)\right)\vswfouttlm{\tau'}{l'}{m'}\left(\kappa\left(\vect r-\vect r_{2}\right)\right), & \vect r\in\openball{\left\Vert \vect r_{2}-\vect r_{1}\right\Vert }{\vect r_{1}}\\ =\begin{cases}
\sum_{\tau'l'm'}\tropr_{\tau lm;\tau'l'm'}\left(\kappa\left(\vect r_{2}-\vect r_{1}\right)\right)\vswfrtlm{\tau'}{l'}{m'}\left(\kappa\left(\vect r-\vect r_{2}\right)\right), & \vect r\notin\closedball{\left\Vert \vect r_{2}-\vect r_{1}\right\Vert }{\left|\vect r_{1}\right|} \sum_{\tau'l'm'}\trops_{\tau lm;\tau'l'm'}\left(\kappa\left(\vect r_{2}-\vect r_{1}\right)\right)\vswfrtlm{\tau'}{l'}{m'}\left(\kappa\left(\vect r-\vect r_{2}\right)\right), & \vect r\in\openball{\left\Vert \vect r_{1}-\vect r_{2}\right\Vert }{\vect r_{2}}\\
\sum_{\tau'l'm'}\tropr_{\tau lm;\tau'l'm'}\left(\kappa\left(\vect r_{2}-\vect r_{1}\right)\right)\vswfouttlm{\tau'}{l'}{m'}\left(\kappa\left(\vect r-\vect r_{2}\right)\right), & \vect r\notin\closedball{\left\Vert \vect r_{1}-\vect r_{2}\right\Vert }{\vect r_{2}}
\end{cases},\label{eq:singular vswf translation} \end{cases},\label{eq:singular vswf translation}
\end{eqnarray} \end{multline}
\end_inset \end_inset
@ -2038,6 +2039,10 @@ status collapsed
\end_inset \end_inset
where the constant factors in our convention read where the constant factors in our convention read
\begin_inset Note Note
status open
\begin_layout Plain Layout
\begin_inset Marginal \begin_inset Marginal
status open status open
@ -2048,6 +2053,11 @@ TODO check once again carefully for possible phase factors.
\end_inset \end_inset
\end_layout
\end_inset
\begin_inset Note Note \begin_inset Note Note
status collapsed status collapsed

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@ -2514,10 +2514,10 @@ TODO fix signs and exponential phase factors
\begin_inset Formula \begin_inset Formula
\begin{align} \begin{multline}
\vect E_{\mathrm{scat}}\left(\vect r\right) & =\sum_{\left(\vect n,\alpha\right)\in\mathcal{P}}\sum_{\tau lm}\outcoeffptlm{\vect n,\alpha}{\tau}lm\vect u_{\tau lm}\left(\kappa\left(\vect r-\text{\vect R_{\vect n}-\vect r_{\alpha}}\right)\right)\nonumber \\ \vect E_{\mathrm{scat}}\left(\vect r\right)=\sum_{\left(\vect n,\alpha\right)\in\mathcal{P}}\sum_{\tau lm}\outcoeffptlm{\vect n,\alpha}{\tau}lm\vect u_{\tau lm}\left(\kappa\left(\vect r-\text{\vect R_{\vect n}-\vect r_{\alpha}}\right)\right)=\\
& =\sum_{\alpha\in\mathcal{P}_{1}}\sum_{\tau lm}\outcoeffptlm{\vect 0,\alpha}{\tau}lm\sum_{m'=-1}^{1}\vswfrtlm 21{m'}\left(0\right)\sum_{\lambda=\left|l-1\right|+\left|\tau-2\right|}^{l+1}\tropcoeff_{\tau lm;21m'}^{\lambda}\sigma_{\lambda,m-m'}\left(-\vect k,\vect r-\vect r_{\alpha}\right).\label{eq:Scattered fields in periodic systems} =\sum_{\alpha\in\mathcal{P}_{1}}\sum_{\tau lm}\outcoeffptlm{\vect 0,\alpha}{\tau}lm\sum_{m'=-1}^{1}\vswfrtlm 21{m'}\left(0\right)\sum_{\lambda=\left|l-1\right|+\left|\tau-2\right|}^{l+1}\tropcoeff_{\tau lm;21m'}^{\lambda}\sigma_{\lambda,m-m'}\left(-\vect k,\vect r-\vect r_{\alpha}\right).\label{eq:Scattered fields in periodic systems}
\end{align} \end{multline}
\end_inset \end_inset