Intro rewrite
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Marek Nečada
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@ -788,6 +788,10 @@ Maybe put the numerical results separately in the end.
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TODO
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\end_layout
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\begin_layout Itemize
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URLs from bibtex do not appear in the references.
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\end_layout
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\begin_layout Itemize
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It could be nice to include some illustration (example array) to the introductio
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n.
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@ -324,6 +324,25 @@ literal "false"
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\end_layout
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\begin_layout Standard
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However, the potential of MSTMM reaches far beyond its past implementations.
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Here we present several enhancements to the method, which are especially
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useful in metamaterial and nanophotonics simulations.
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We extend the method on infinite periodic systems using Ewald-type summation
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techniques.
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This enables, among other things, to use MSTMM for fast solving of the
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lattice modes of such periodic systems, and comparing them to their finite
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counterparts with respect to electromagnetic response, which is useful
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to isolate the bulk and finite-size phenomena of photonic arrays.
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Moreover, we exploit symmetries of the system to decompose the problem
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into several substantially smaller ones, which provides better understanding
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of modes, mainly in periodic systems, and substantially reduces the demands
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on computational resources, hence speeding up the computations and allowing
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for finite size simulations of systems with particle counts practically
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impossible to reliably simulate with any other method.
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\begin_inset Note Note
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status open
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\begin_layout Plain Layout
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Due to the limitations of the existing available codes, we have been developing
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our own implementation of MSTMM, which has been used in several previous
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works studying various physical phenomena in plasmonic nanoarrays
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@ -352,13 +371,9 @@ infinite periodic systems
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one has to deal with badly behaving infinite lattice sums.
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\end_layout
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\begin_layout Standard
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Here we address both challenges: we extend the method on infinite periodic
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systems using Ewald-type summation techniques, and we exploit symmetries
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of the system to decompose the problem into several substantially smaller
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ones, which 1) reduces the demands on computational resources, hence speeds
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up the computations and allows for simulations of larger systems, and 2)
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provides better understanding of modes, mainly in periodic systems.
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\end_inset
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\end_layout
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\begin_layout Standard
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@ -415,7 +430,14 @@ TODO před odesláním zkontrolovat, co všechno to v danou chvíli umí.
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\end_inset
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It includes extensive Doxygen documentation, together with description
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of the API, making extending and customising the code easy.
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of the API.
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It has been written with customisability and extendibility in mind, so
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that including e.g.
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alternative methods of
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\begin_inset Formula $T$
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\end_inset
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-matrix calculations of a single matrix are as easy as possible.
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\end_layout
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\begin_layout Standard
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