Add branch cuts
Signed-off-by: Riccardo Finotello <riccardo.finotello@gmail.com>
This commit is contained in:
29
img/branchcuts.pgf
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29
img/branchcuts.pgf
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\begin{tikzpicture}
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% draw axis
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\draw[thick, ->] (-3cm, 0cm) -- (3cm, 0cm) node[anchor=south] {$x$};
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\draw[thick, ->] (-0.4cm, -1cm) -- (-0.4cm, 3cm) node[anchor=east] {$y$};
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% draw branching cuts
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\filldraw[fill=black!50, draw=black, dashed] (-2cm, 3pt) rectangle (2.5cm, -3pt);
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\filldraw[fill=black!30, draw=black, dashed] (-0.75cm, 2pt) rectangle (2.5cm, -2pt);
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\filldraw[fill=black!10, draw=black, dashed] (1cm, 1pt) rectangle (2.5cm, -1pt);
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% draw branching points
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\filldraw[fill=white, draw=black] (2.5cm, 0cm) circle (2pt) node[anchor=north, below=3pt] (x1) {$x_{(1)}$};
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\filldraw[fill=white, draw=black] (1cm, 0cm) circle (2pt) node[anchor=north, below=3pt] (x2) {$x_{(2)}$};
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\filldraw[fill=white, draw=black] (-0.75cm, 0cm) circle (2pt) node[anchor=north, below=3pt] (x3) {$x_{(3)}$};
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\filldraw[fill=white, draw=black] (-2cm, 0cm) circle (2pt) node[anchor=north, below=3pt] (x4) {$x_{(4)}$};
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% assign the D-branes
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\draw[thin, decorate, decoration={brace}] (1cm, 0.3cm) -- (2.5cm, 0.3cm) node[midway, anchor=south] {$D_{(2)}$};
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\draw[thin, decorate, decoration={brace}] (-0.75cm, 0.3cm) -- (1cm, 0.3cm) node[midway, anchor=south] {$D_{(3)}$};
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\draw[thin, decorate, decoration={brace}] (-2cm, 0.3cm) -- (-0.75cm, 0.3cm) node[midway, anchor=south] {$D_{(4)}$};
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% draw the remaining D-brane
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\draw[thin, ->, dash pattern=on 2pt off 2pt on 2pt off 2pt on 2pt off 2pt on 2pt off 2pt on 2pt off 2pt on 2pt off 2pt on 1cm] (-2cm, 2pt) -- (-2cm, 1cm)-- (-2.75cm, 1cm) node[midway, anchor=south] {$D_{(1)}$} ;
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\draw[thin, ->, dash pattern=on 2pt off 2pt on 2pt off 2pt on 2pt off 2pt on 2pt off 2pt on 2pt off 2pt on 2pt off 2pt on 1cm] (2.5cm, 2pt) -- (2.5cm, 1cm)-- (3cm, 1cm) node[midway, anchor=south] {$D_{(1)}$} ;
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\end{tikzpicture}
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% vim: ft=tex
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13
img/welladapted.pgf
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13
img/welladapted.pgf
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\begin{tikzpicture}
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% draw the D-brane
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\draw (0cm, 0cm) -- (5cm, -1cm) -- (6cm, 3cm) -- (1.5cm, 4cm) node[anchor=south west] {$D_{(t)}$} -- cycle;
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% draw a triad of axis
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\draw[thick, ->] (3cm, 1cm) -- (2.7cm, 0.1cm) node[anchor=east] {$X^1_{(t)}$};
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\draw[thick, ->] (3cm, 1cm) -- (5cm, 0.6cm) node[anchor=south] {$X^2_{(t)}$};
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\draw[thick, ->] (3cm, 1cm) -- (3cm, 2.75cm) node[anchor=east] {$X^{3,\, 4}_{(t)}$};
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\end{tikzpicture}
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% vim: ft=tex
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86
thesis.tex
86
thesis.tex
@@ -44,6 +44,7 @@
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\usetikzlibrary{decorations.markings}
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\usetikzlibrary{decorations.pathmorphing}
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\usetikzlibrary{decorations.pathreplacing}
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\usetikzlibrary{arrows}
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\newenvironment{equationblock}[1]{%
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@@ -480,7 +481,7 @@
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\begin{equationblock}{Twist Fields Correlators}
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\begin{equation*}
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\left\langle \prod\limits_{t = 1}^N \upsigma_{\mathrm{M}_{(t)}}\qty( x_{(t)} ) \right\rangle
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\left\langle \prod\limits_{t = 1}^{N_B} \upsigma_{\mathrm{M}_{(t)}}\qty( x_{(t)} ) \right\rangle
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=
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\mathcal{N}\qty( \qty{ x_{(t)},\, \mathrm{M}_{(t)} }_{1 \le t \le N_B} )
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e^{- S_{E\, (\text{cl})}\qty( \qty{ x_{(t)},\, \mathrm{M}_{(t)} }_{1 \le t \le N_B} )}
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@@ -514,6 +515,89 @@
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\end{columns}
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\end{frame}
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\begin{frame}{$\mathrm{SO}(4)$ Rotations}
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Consider \highlight{$\mathds{R}^4 \times \mathds{R}^2$} (focus on $\mathds{R}^4$):
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\pause
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\begin{columns}
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\begin{column}{0.5\linewidth}
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\centering
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\resizebox{0.9\columnwidth}{!}{\import{img}{welladapted.pgf}}
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\end{column}
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\begin{column}{0.6\linewidth}
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\begin{equation*}
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\qty( X_{(t)} )^I
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=
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\tensor{\qty( R_{(t)} )}{^I_J}\, X^J - g_{(t)}^I
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\quad
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\text{s.t.}
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\quad
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R_{(t)} \in \frac{\mathrm{SO}(4)}{\mathrm{S}\qty( \mathrm{O}(2) \times \mathrm{O}(2) )}
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\end{equation*}
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\pause
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that is
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\begin{equation*}
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\qty[ R_{(t)} ]
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=
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\qty{ R_{(t)} \sim \mathcal{O}_{(t)} R_{(t)} }
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\end{equation*}
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\end{column}
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\end{columns}
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\end{frame}
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\begin{frame}{Boundary Conditions}
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What are the consequences for \highlight{open strings?}
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\pause
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\begin{columns}
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\begin{column}{0.6\linewidth}
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\begin{itemize}
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\item consider $u = x + i y = e^{\uptau_e + i \upsigma}$ and $\overline{u} = u^*$
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\item let $x_{(t)} < x_{(t-1)}$ be the \textbf{worldsheet intersection points} on \textbf{real axis}
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\item $X_{(t)}^{1,\, 2}$ are \textbf{Neumann}, $X_{(t)}^{3,\, 4}$ are \textbf{Dirichlet}
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\end{itemize}
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\end{column}
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\begin{column}{0.4\linewidth}
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\centering
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\resizebox{0.9\columnwidth}{!}{\import{img}{branchcuts.pgf}}
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\end{column}
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\end{columns}
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\pause
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\begin{equationblock}{Branch Cuts and Discontinuities for $x \in D_{(t)}$}
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\begin{equation*}
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\begin{cases}
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\partial_u X( x + i 0^+ )
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& =
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U_{(t)}
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\cdot
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\partial_{\overline{u}} \overline{X}( x - i 0^+ )
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=
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\qty[%
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R_{(t)}^{-1}
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\cdot
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\qty( \upsigma_3 \otimes \mathds{1}_2 )
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\cdot
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R_{(t)}
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]
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\cdot
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\partial_{\overline{u}} \overline{X}( x - i 0^+ )
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\\
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X( x_{(t)},\, x_{(t)} )
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& =
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f_{(t)}
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\end{cases}
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\end{equation*}
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\end{equationblock}
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\end{frame}
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\section[Time Divergences]{Cosmological Backgrounds and Divergences}
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\begin{frame}{BBB}
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