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For more info see http://www.lyx.org/ \lyxformat 474 \begin_document \begin_header \textclass article \begin_preamble \usepackage{unicode-math} % Toto je trik, jimž se z fontspec získá familyname pro následující \ExplSyntaxOn \DeclareExpandableDocumentCommand{\getfamilyname}{m} { \use:c { g__fontspec_ \cs_to_str:N #1 _family } } \ExplSyntaxOff % definujeme novou rodinu, jež se volá pomocí \MyCyr pro běžné použití, avšak pro účely \DeclareSymbolFont je nutno získat název pomocí getfamilyname definovaného výše \newfontfamily\MyCyr{CMU Serif} \DeclareSymbolFont{cyritletters}{EU1}{\getfamilyname\MyCyr}{m}{it} \newcommand{\makecyrmathletter}[1]{% \begingroup\lccode`a=#1\lowercase{\endgroup \Umathcode`a}="0 \csname symcyritletters\endcsname\space #1 } \count255="409 \loop\ifnum\count255<"44F \advance\count255 by 1 \makecyrmathletter{\count255} \repeat \renewcommand{\lyxmathsym}[1]{#1} \end_preamble \use_default_options true \maintain_unincluded_children false \language english \language_package default \inputencoding auto \fontencoding global \font_roman TeX Gyre Pagella \font_sans default \font_typewriter default \font_math default \font_default_family default \use_non_tex_fonts true \font_sc false \font_osf true \font_sf_scale 100 \font_tt_scale 100 \graphics default \default_output_format pdf4 \output_sync 0 \bibtex_command default \index_command default \paperfontsize 10 \spacing single \use_hyperref true \pdf_title "Accelerating lattice mode calculations with T-matrix method" \pdf_author "Marek Nečada" \pdf_bookmarks true \pdf_bookmarksnumbered false \pdf_bookmarksopen false \pdf_bookmarksopenlevel 1 \pdf_breaklinks false \pdf_pdfborder false \pdf_colorlinks false \pdf_backref false \pdf_pdfusetitle true \papersize a5paper \use_geometry true \use_package amsmath 1 \use_package amssymb 1 \use_package cancel 1 \use_package esint 1 \use_package mathdots 1 \use_package mathtools 1 \use_package mhchem 1 \use_package stackrel 1 \use_package stmaryrd 1 \use_package undertilde 1 \cite_engine basic \cite_engine_type default \biblio_style plain \use_bibtopic false \use_indices false \paperorientation portrait \suppress_date false \justification true \use_refstyle 1 \index Index \shortcut idx \color #008000 \end_index \leftmargin 2cm \topmargin 2cm \rightmargin 2cm \bottommargin 2cm \secnumdepth 3 \tocdepth 3 \paragraph_separation indent \paragraph_indentation default \quotes_language english \papercolumns 1 \papersides 1 \paperpagestyle default \tracking_changes false \output_changes false \html_math_output 0 \html_css_as_file 0 \html_be_strict false \end_header \begin_body \begin_layout Standard \begin_inset FormulaMacro \newcommand{\uoft}[1]{\mathfrak{F}#1} \end_inset \begin_inset FormulaMacro \newcommand{\uaft}[1]{\mathfrak{\mathbb{F}}#1} \end_inset \begin_inset FormulaMacro \newcommand{\vect}[1]{\mathbf{#1}} \end_inset \begin_inset FormulaMacro \newcommand{\ud}{\mathrm{d}} \end_inset \begin_inset FormulaMacro \newcommand{\basis}[1]{\mathfrak{#1}} \end_inset \begin_inset FormulaMacro \newcommand{\dc}[1]{Ш_{#1}} \end_inset \begin_inset FormulaMacro \newcommand{\rec}[1]{#1^{-1}} \end_inset \begin_inset FormulaMacro \newcommand{\recb}[1]{#1^{\widehat{-1}}} \end_inset \end_layout \begin_layout Title Accelerating lattice mode calculations with \begin_inset Formula $T$ \end_inset -matrix method \end_layout \begin_layout Author Marek Nečada \end_layout \begin_layout Section Formulation of the problem \end_layout \begin_layout Standard Assume a system of compact EM scatterers in otherwise homogeneous and isotropic medium, and assume that the system, i.e. both the medium and the scatterers, have linear response. A scattering problem in such system can be written as \begin_inset Formula \[ A_{α}=T_{α}P_{α}=T_{α}(\sum_{β}S_{α\leftarrowβ}A_{β}+P_{0α}) \] \end_inset where \begin_inset Formula $T_{α}$ \end_inset is the \begin_inset Formula $T$ \end_inset -matrix for scatterer α, \begin_inset Formula $A_{α}$ \end_inset is its vector of the scattered wave expansion coefficient (the multipole indices are not explicitely indicated here) and \begin_inset Formula $P_{α}$ \end_inset is the local expansion of the incoming sources. \begin_inset Formula $S_{α\leftarrowβ}$ \end_inset is ... and ... is ... \end_layout \begin_layout Standard ... \end_layout \begin_layout Standard \begin_inset Formula \[ \sum_{β}(\delta_{αβ}-T_{α}S_{α\leftarrowβ})A_{β}=T_{α}P_{0α}. \] \end_inset \end_layout \begin_layout Standard Now suppose that the scatterers constitute an infinite lattice \end_layout \begin_layout Standard \begin_inset Formula \[ \sum_{\vect bβ}(\delta_{\vect{ab}}\delta_{αβ}-T_{\vect aα}S_{\vect aα\leftarrow\vect bβ})A_{\vect bβ}=T_{\vect aα}P_{0\vect aα}. \] \end_inset Due to the periodicity, we can write \begin_inset Formula $S_{\vect aα\leftarrow\vect bβ}=S_{α\leftarrowβ}(\vect b-\vect a)$ \end_inset and \begin_inset Formula $T_{\vect aα}=T_{\alpha}$ \end_inset . In order to find lattice modes, we search for solutions with zero RHS \begin_inset Formula \[ \sum_{\vect bβ}(\delta_{\vect{ab}}\delta_{αβ}-T_{α}S_{\vect aα\leftarrow\vect bβ})A_{\vect bβ}=0 \] \end_inset and we assume periodic solution \begin_inset Formula $A_{\vect b\beta}(\vect k)=A_{\vect a\beta}e^{i\vect k\cdot\vect r_{\vect b-\vect a}}$ \end_inset , yielding \begin_inset Formula \begin{eqnarray*} \sum_{\vect bβ}(\delta_{\vect{ab}}\delta_{αβ}-T_{α}S_{\vect aα\leftarrow\vect bβ})A_{\vect a\beta}\left(\vect k\right)e^{i\vect k\cdot\vect r_{\vect b-\vect a}} & = & 0,\\ \sum_{\vect bβ}(\delta_{\vect{0b}}\delta_{αβ}-T_{α}S_{\vect 0α\leftarrow\vect bβ})A_{\vect 0\beta}\left(\vect k\right)e^{i\vect k\cdot\vect r_{\vect b}} & = & 0,\\ \sum_{β}(\delta_{αβ}-T_{α}\underbrace{\sum_{\vect b}S_{\vect 0α\leftarrow\vect bβ}e^{i\vect k\cdot\vect r_{\vect b}}}_{W_{\alpha\beta}(\vect k)})A_{\vect 0\beta}\left(\vect k\right) & = & 0,\\ A_{\vect 0\alpha}\left(\vect k\right)-T_{α}\sum_{\beta}W_{\alpha\beta}\left(\vect k\right)A_{\vect 0\beta}\left(\vect k\right) & = & 0. \end{eqnarray*} \end_inset Therefore, in order to solve the modes, we need to compute the \begin_inset Quotes eld \end_inset lattice Fourier transform \begin_inset Quotes erd \end_inset of the translation operator, \begin_inset Formula \begin{equation} W_{\alpha\beta}(\vect k)\equiv\sum_{\vect b}S_{\vect 0α\leftarrow\vect bβ}e^{i\vect k\cdot\vect r_{\vect b}}.\label{eq:W definition} \end{equation} \end_inset \end_layout \begin_layout Section Computing the Fourier sum of the translation operator \end_layout \begin_layout Standard The problem evaluating \begin_inset CommandInset ref LatexCommand eqref reference "eq:W definition" \end_inset is the asymptotic behaviour of the translation operator, \begin_inset Formula $S_{\vect 0α\leftarrow\vect bβ}\sim\left|\vect r_{\vect b}\right|^{-1}e^{ik_{0}\left|\vect r_{\vect b}\right|}$ \end_inset that makes the convergence of the sum quite problematic for any \begin_inset Formula $d>1$ \end_inset -dimensional lattice. In electrostatics, one can solve this with problem with Ewald summation. Its basic idea is that if what asymptoticaly decays poorly in the direct space, will perhaps decay fast in the Fourier space. I use the same idea here, but things will be somehow harder than in electrostat ics. \end_layout \begin_layout Section (Appendix) Multidimensional Dirac comb \end_layout \begin_layout Subsection 1D \end_layout \begin_layout Standard This is all from Wikipedia \end_layout \begin_layout Subsubsection Definitions \end_layout \begin_layout Standard \begin_inset Formula \begin{eqnarray*} Ш(t) & \equiv & \sum_{k=-\infty}^{\infty}\delta(t-k)\\ Ш_{T}(t) & \equiv & \sum_{k=-\infty}^{\infty}\delta(t-kT)=\frac{1}{T}Ш\left(\frac{t}{T}\right) \end{eqnarray*} \end_inset \end_layout \begin_layout Subsubsection Fourier series representation \end_layout \begin_layout Standard \begin_inset Formula \begin{equation} Ш_{T}(t)=\sum_{n=-\infty}^{\infty}e^{2\pi int/T}\label{eq:1D Dirac comb Fourier series} \end{equation} \end_inset \end_layout \begin_layout Subsubsection Fourier transform \end_layout \begin_layout Standard With unitary ordinary frequency Ft., i.e. \end_layout \begin_layout Standard \begin_inset Formula \[ \uoft f(\vect{\xi})\equiv\int_{\mathbb{R}^{n}}f(\vect x)e^{-2\pi i\vect x\cdot\vect{\xi}}\ud^{n}\vect x \] \end_inset we have \begin_inset Formula \begin{equation} \uoft{Ш_{T}}(f)=\frac{1}{T}Ш_{\frac{1}{T}}(f)=\sum_{n=-\infty}^{\infty}e^{-i2\pi fnT}\label{eq:1D Dirac comb Ft ordinary freq} \end{equation} \end_inset and with unitary angular frequency Ft., i.e. \begin_inset Formula \[ \uaft f(\vect k)\equiv\frac{1}{\left(2\pi\right)^{n}}\int_{\mathbb{R}^{n}}f(\vect x)e^{-2\pi i\vect x\cdot\vect k}\ud^{n}\vect x \] \end_inset we have \begin_inset Formula \[ \uaft{Ш_{T}}(\omega)=\frac{\sqrt{2\pi}}{T}Ш_{\frac{2\pi}{T}}(\omega)=\frac{1}{\sqrt{2\pi}}\sum_{n=-\infty}^{\infty}e^{-i\omega nT} \] \end_inset \end_layout \begin_layout Subsection Dirac comb for multidimensional lattices \end_layout \begin_layout Subsubsection Definitions \end_layout \begin_layout Standard Let \begin_inset Formula $d$ \end_inset be the dimensionality of the real vector space in question, and let \begin_inset Formula $\basis u\equiv\left\{ \vect u_{i}\right\} _{i=1}^{d}$ \end_inset denote a basis for some lattice in that space. Let the corresponding lattice delta comb be \begin_inset Formula \[ \dc{\basis u}\left(\vect x\right)\equiv\sum_{n_{1}=-\infty}^{\infty}\ldots\sum_{n_{d}=-\infty}^{\infty}\delta\left(\vect x-\sum_{i=1}^{d}n_{i}\vect u_{i}\right). \] \end_inset \end_layout \begin_layout Standard Furthemore, let \begin_inset Formula $\rec{\basis u}\equiv\left\{ \rec{\vect u}_{i}\right\} _{i=1}^{d}$ \end_inset be the reciprocal lattice basis, that is the basis satisfying \begin_inset Formula $\vect u_{i}\cdot\rec{\vect u_{j}}=\delta_{ij}$ \end_inset . This slightly differs from the usual definition of a reciprocal basis, here denoted \begin_inset Formula $\recb{\basis u}\equiv\left\{ \recb{\vect u_{i}}\right\} _{i=1}^{d}$ \end_inset , which satisfies \begin_inset Formula $\vect u_{i}\cdot\recb{\vect u_{j}}=2\pi\delta_{ij}$ \end_inset instead. \end_layout \begin_layout Subsubsection Factorisation of a multidimensional lattice delta comb \end_layout \begin_layout Standard By simple drawing, it can be seen that \begin_inset Formula \[ \dc{\basis u}(\vect x)=c_{\basis u}\prod_{i=1}^{d}\dc{}\left(\vect x\cdot\rec{\vect u_{i}}\right) \] \end_inset where \begin_inset Formula $c_{\basis u}$ \end_inset is some numerical volume factor. In order to determine \begin_inset Formula $c_{\basis u}$ \end_inset , let us consider only the \begin_inset Quotes eld \end_inset zero tooth \begin_inset Quotes erd \end_inset of the comb, leading to \begin_inset Formula \[ \delta^{d}(\vect x)=c_{\basis u}\prod_{i=1}^{d}\delta\left(\vect x\cdot\rec{\vect u_{i}}\right). \] \end_inset From the scaling property of delta function, \begin_inset Formula $\delta(ax)=\left|a\right|^{-1}\delta(x)$ \end_inset , we get \begin_inset Formula \[ \delta^{d}(\vect x)=c_{\basis u}\prod_{i=1}^{d}\left\Vert \rec{\vect u_{i}}\right\Vert ^{-1}\delta\left(\vect x\cdot\frac{\rec{\vect u_{i}}}{\left\Vert \rec{\vect u_{i}}\right\Vert }\right). \] \end_inset \end_layout \begin_layout Standard From the book: \end_layout \begin_layout Standard \begin_inset Formula \[ \dc A(\vect x)=\frac{1}{\left|\det A\right|}\dc{}^{(d)}\left(A^{-1}\vect x\right) \] \end_inset \begin_inset Note Note status open \begin_layout Plain Layout Applying both sides to a test function that is one at the origin, we get \begin_inset Formula $c_{\basis u}=\prod_{i=1}^{d}\left\Vert \rec{\vect u_{i}}\right\Vert $ \end_inset SRSLY?, and hence \begin_inset Formula \begin{equation} \dc{\basis u}(\vect x)=\prod_{i=1}^{d}\left\Vert \rec{\vect u_{i}}\right\Vert \dc{}\left(\vect x\cdot\rec{\vect u_{i}}\right).\label{eq:Dirac comb factorisation} \end{equation} \end_inset \end_layout \end_inset \end_layout \begin_layout Subsubsection Fourier series representation \end_layout \begin_layout Standard \begin_inset Note Note status open \begin_layout Plain Layout Utilising the Fourier series for 1D Dirac comb \begin_inset CommandInset ref LatexCommand eqref reference "eq:1D Dirac comb Fourier series" \end_inset and the factorisation \begin_inset CommandInset ref LatexCommand eqref reference "eq:Dirac comb factorisation" \end_inset , we get \begin_inset Formula \begin{eqnarray*} \dc{\basis u}(\vect x) & = & \prod_{j=1}^{d}\left\Vert \rec{\vect u_{j}}\right\Vert \sum_{n_{j}=-\infty}^{\infty}e^{2\pi in_{i}\vect x\cdot\rec{\vect u_{i}}}\\ & = & \left(\prod_{j=1}^{d}\left\Vert \rec{\vect u_{j}}\right\Vert \right)\sum_{\vect n\in\mathbb{Z}^{d}}e^{2\pi i\vect x\cdot\sum_{k=1}^{d}n_{k}\rec{\vect u_{k}}}. \end{eqnarray*} \end_inset \end_layout \end_inset \end_layout \begin_layout Subsubsection Fourier transform \end_layout \begin_layout Standard From the book https://see.stanford.edu/materials/lsoftaee261/chap8.pdf \end_layout \begin_layout Standard \begin_inset Formula \[ \uoft{\dc A}\left(\vect{\xi}\right)=\dc{}^{(d)}\left(A^{T}\vect{\xi}\right). \] \end_inset \end_layout \begin_layout Standard \begin_inset Note Note status open \begin_layout Plain Layout So, from the stretch theorem \begin_inset Formula $\uoft{(f(A\vect x))}=\frac{1}{\left|\det A\right|}\uoft{f\left(A^{-T}\vect{\xi}\right)}=\left|\det A^{-T}\right|\uoft{f\left(A^{-T}\vect{\xi}\right)}$ \end_inset \end_layout \begin_layout Plain Layout From \begin_inset CommandInset ref LatexCommand eqref reference "eq:Dirac comb factorisation" \end_inset and \begin_inset CommandInset ref LatexCommand eqref reference "eq:1D Dirac comb Ft ordinary freq" \end_inset \begin_inset Formula \[ \uoft{\dc{\basis u}}(\vect{\xi})=\prod_{i=1}^{d}\left\Vert \rec{\vect u_{i}}\right\Vert \dc{}\left(\vect x\cdot\rec{\vect u_{i}}\right). \] \end_inset \end_layout \end_inset \end_layout \end_body \end_document