use degrees where possible
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@ -202,7 +202,6 @@
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month={1},
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day={26},
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url={http://www.e-cartouche.ch/content_reg/cartouche/cartdesign/en/html/GenRules_learningObject3.html},
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organization={CartouCHe},
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urldate={2021-05-03},
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}
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@ -1,15 +1,15 @@
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\documentclass[a4paper]{article}
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\usepackage[T1,T2A]{fontenc} % T2A is for Cyrillic characters
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\usepackage[T1]{fontenc}
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\usepackage[american]{babel}
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\usepackage[utf8]{inputenc}
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\usepackage [autostyle, english=american]{csquotes}
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\usepackage [autostyle,english=american]{csquotes}
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\MakeOuterQuote{"}
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\usepackage[maxbibnames=99,style=numeric,sorting=none,alldates=edtf]{biblatex}
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\addbibresource{bib.bib}
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\usepackage[
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pdfusetitle,
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pdfkeywords={Line Generalization,Cartographic Line Generalization,Wang--Mueller},
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pdfkeywords={Line Generalization,Line Simplification,Wang--Mueller},
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pdfborderstyle={/S/U/W 0} % /S/U/W 1 to enable reasonable decorations
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]{hyperref}
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\usepackage{enumitem}
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@ -29,6 +29,8 @@
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%\usepackage{setspace}
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%\doublespacing
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\input{version.inc}
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\input{vars.inc}
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\IfFileExists{./editorial-version}{\def \mjEditorial {}}{}
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\ifx \mjEditorial \undefined
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\usepackage{minted}
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@ -38,10 +40,6 @@
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\newcommand{\inputcode}[2]{\verbatiminput{#2}}
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\fi
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\input{version.inc}
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\input{vars.inc}
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\newcommand{\onpage}[1]{\ref{#1} on page~\pageref{#1}}
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\newcommand{\titlecite}[1]{\citetitle{#1}\cite{#1}}
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\newcommand{\DP}{Douglas \& Peucker}
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@ -50,7 +48,7 @@
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\newcommand{\WnM}{Wang and M{\"u}ller}
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% {\WM} algoritmo realizacija kartografinei upių generalizacijai
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\newcommand{\MYTITLE}{{\WM} algorithm realization for cartographic line generalization}
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\newcommand{\MYTITLESC}{wang--m{\"u}ller algorithm realization for cartographic line generalization}
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\newcommand{\MYTITLENOCAPS}{wang--m{\"u}ller algorithm realization for cartographic line generalization}
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\newcommand{\MYAUTHOR}{Motiejus Jakštys}
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\title{\MYTITLE}
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@ -76,7 +74,7 @@
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A thesis presented for the degree of Master in Cartography \\[8ex]
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\LARGE
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\textbf{\textsc{\MYTITLESC}}
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\textbf{\textsc{\MYTITLENOCAPS}}
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\vfill
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@ -444,25 +442,6 @@ This section defines vocabulary and terms as defined in the rest of the paper.
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\end{description}
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\subsection{Radians and Degrees}
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This document contains a few constant angles expressed in radians.
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Table~\ref{table:radians} summarizes some of the values used in this document
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and the implementation.
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\begin{table}[h]
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\centering
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\begin{tabular}{|c|c|c|c|c|c|c|}
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\hline
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Degrees & $30^\circ$ & $45^\circ$ & $90^\circ$ & $180^\circ$ & $360^\circ$ \\
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\hline
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Radians & $\nicefrac{\pi}{6}$ & $\nicefrac{\pi}{4}$ & $\nicefrac{\pi}{2}$ & $\pi$ & $2\pi$ \\
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\hline
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\end{tabular}
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\caption{Some angular degree and radian values mentioned in this article.}
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\label{table:radians}
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\end{table}
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\subsection{Automated tests}
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\label{sec:automated-tests}
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@ -771,13 +750,13 @@ be quite computationally expensive: naively implemented, complexity of checking
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every bend with every bend is $O(n^2)$. In other words, the time it takes to
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run the algorithm grows quadratically with the with the number of vertices.
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It is possible to optimize this step and skip checking most of the bends. Only
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bends whose sum of inner angles is larger than $\pi$ can ever self-cross. If
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the value is less than $\pi$, it cannot cross other bends. That way, only a
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fraction of bends need to be checked. The worst-case complexity is still
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$O(n^2)$, when all bends' inner angles are larger than $\pi$, but, assuming no
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more than $20\%$ of the bends' inner angles are larger than $\pi$, the time it
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takes to run this piece of the algorithm drops by $80\%$.
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It is possible to optimize this step and skip checking a large number of bends.
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Only bends whose sum of inner angles is larger than $180^\circ$ can ever
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self-cross. That way, only a fraction of bends need to be checked. The
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worst-case complexity is still $O(n^2)$, when all bends' inner angles are
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larger than $180^\circ$. Having this optimization, the algorithmic complexity
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(as a result, the time it takes to execute the algorithm) is drops by the
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fraction of bends whose sum of inner angles is smaller than $180^\circ$.
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\subsection{Attributes of a Single Bend}
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