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=PDF=
 
  
[[File:Sadiq_hesis_Latex.pdf]]
 
  
= Text =
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Sadiq Thesis in pdf: [[File:Sadiq_hesis_Latex.pdf]]
  
==Introduction==
 
\chapter{Introduction}
 
  
\section{Positron Beam}
 
  
Positrons have many potentials in many discipline of science, like chemistry, physics, material science, surface science, biology and nanoscience~\cite{Chemerisov:2009zz}. There are many different ways to generate positrons, and the main challenge is increasing the intensity (or current) of the positron beam.
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=Chapter 1: Introduction [[File:sadiq_thesis_chapt_1.txt]]=
  
\section{Motivation}
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=Chapter 2: Apparatus [[File:sadiq_thesis_chapt_2.txt]]=
  
The nucleon electromagnetic form factors are fundamental  quantities that related to the charge and magnetization distribution in the nucleon. Conventionally, the nucleon form factors are measured using Rosenbluth Technique (RT)~\cite{Rosenbluth1950}. 
+
=Chapter 3: Data Analysis [[File:sadiq_thesis_chapt_3.txt]]=
The form factor scaling ratio, \begin{math}R=\mu _p G_{Ep} / G_{Mp}\end{math}, measured using this technique is around unity as shown in the figure below~\cite{PhysRevD.49.5671}.
 
Since nighties, a technique using elastic electron-proton polarization transfer to measurement this ratio have been developed~\cite{PhysRevD.49.5671, PhysRevC.68.034325, WalkerThesis1989}. In this technique, form factor scaling ratio linearly decreases as the \begin{math}Q^2\end{math} increases, as shown in the Fig.~\ref{rosen-com-RPT}.
 
  
\begin{figure}[htb]
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=Chapter 4: Simulation [[File:sadiq_thesis_chapt_4.txt]]=
\centering
 
\includegraphics[scale=0.70]{1-Introduction/Figures/Sadiq_thesis_mot_RT_RPT_1.png}
 
\caption{Form factor ratio, obtained by Rosenbluth Technique (hollow square) and results from Recoil Polarization Technique~\cite{PhysRevC.68.034325}.}
 
\label{rosen-com-RPT}
 
\end{figure}
 
  
 
+
=Chapter 5: Conclusion [[File:sadiq_thesis_chapt_5.txt]]=
The disagreement could arise from the fact the Rosenbluth Techqniue assumes that One Photon Exchange (OPE) during the scattering while the two–photon exchange (TPE), which depends weakly on \begin{math}Q^2\end{math}, could also become considerable with increasing \begin{math}Q^2\end{math}~\cite{PhysRevC.68.034325}. The contribution of TPE can be obtained by comparing the ratio of \begin{math}e^+~p\end{math} to \begin{math}e^-~p\end{math} ratio. The interference of OPE and TPE can also be studied in the process \begin{math}e^+e^- \rightarrow p\bar p\end{math}
 
 
 
 
 
 
 
==  Theory ==
 
\chapter{Theory}
 
 
 
\section{Positron Beam Generation from Bremsstrahlung}
 
 
 
When a moving charged particle interacts with the electric field of another charged particle, it can be deflected and lose energy in the form of photons, as shown in Fig.~\ref{fig:Theo-Brem}. This interaction is known as the Bremsstrahlung process. The probability of this interaction increases with the atomic number of the material traversed by the incident charged particle. Fig.~\ref{fig:Brems_photon_Ene} shows the photon energy distribution when a 12 MeV electron distribution from Fig.~\ref{fig:Theo-Brems_ele_Ene} interacts with a 1 mm thick Tungsten target. The number of photons in this example produced decreases as the energy of the produced photon increases. The Bremsstrahlung photons are also likely to interact with the material.
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.40]{2-Theory/Figures/bremsstrahlung/brems.eps}
 
\caption{Photon generation from Bremsstrahlung processes.}
 
\label{fig:Theo-Brem}
 
\end{figure}
 
 
 
The cross section of Bremsstrahlung process is give by Eq.~\ref{eq:Brem-cross}~\cite{brms-cors}
 
 
 
\begin{equation}
 
d \sigma = 4 Z^2r_e^2 \alpha \frac{d \nu}{\nu} \left \{ \left (1 + \left( \frac{E}{E_0} \right )^2 \right ) \left [ \frac{\phi_1(\gamma)}{4} - \frac{1}{3} \ln Z -f(Z)\right ] - \frac{2E}{3E_0} \left [  \frac{\phi_2(\gamma)}{4} - \frac{1}{3} \ln Z -f(Z)\right ] \right \}
 
\label{eq:Brem-cross}
 
\end{equation}
 
 
 
where, $E_0$ is initial total energy of the electron, $E$ is final total energy of the electron, $\nu = \frac{E_0-E}{h}$ is energy of the emitted photon, and $Z$ is atomic number. $\gamma = \frac{100 m_ec^2 h \nu}{E_0 E Z^{1/3}}$ is charge screening parameter and $f(Z)$ is given by~\cite{tf-wiki}
 
 
 
\begin{equation}
 
f(Z) = (Z \alpha)^2 \sum_1^{\infty} \frac{1}{ n [ n^2 + (Z \alpha)^2]}
 
\end{equation}
 
 
 
where $\alpha = \frac{1}{137}$ is fine-structure constant, $\phi_1$ and $\phi_2$ are screening functions that depend on Z
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{2-Theory/Figures/Brems_photon_Ene.png}
 
\caption{Simulated Bremsstrahlung photon energy right after a tungsten foil.}
 
\label{fig:Brems_photon_Ene}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{2-Theory/Figures/Brems_ele_Ene.png}
 
\caption{Simulated electron energy distribution right before a tungsten foil.}
 
\label{fig:Theo-Brems_ele_Ene}
 
\end{figure}
 
 
 
There are three competing processes that a photon can undergo when interacting with matter. At electron volt (eV) energies comparable to the electron atomic binding energy, the dominant photon interaction is via photoelectric effect. As the photon energy increases up to kilo-electron volt (keV) range, the Compton scattering process starts to be more dominant. Although the photon is totally absorbed during the photoelectric effect, photons merely lose energy when undergoing Compton scattering. As the photon energy reaches twice the rest mass energy of electron, 2 \begin{math} \times \end{math} 511~keV, pair production begins to happen. Pair production becomes dominant interaction process only for energies above 5 MeV~\cite{Krane}. In this process, a photon interacts with the electric field of the nucleus or the bound electrons and decays into an electron and positron pair.
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{2-Theory/Figures/3pro-in-W.png}
 
\caption{Cross section of processes that photons interacts with tungsten~\cite{nistxcom}}
 
\label{fig:Theo-3pro-in-W}
 
\end{figure}
 
 
 
Using natural unit \begin{math}c \equiv 1\end{math}, the differential cross-section for pair production can be expressed as~\cite{pair-cors, tf-wiki},
 
 
 
\begin{equation}
 
\frac{d \sigma}{d \epsilon_1 d \theta_1 d \theta_2} = 8 \left ( \frac{\pi a}{\sinh (\pi a)} \right )^2 \frac{a^2}{2 \pi} \frac{e^2}{\hbar c} \left ( \frac{\hbar}{m_e c }\right )^2 \frac{\epsilon_1 \epsilon_2}{k^3}  \theta_1 \theta_2
 
\end{equation}
 
 
 
\begin{description}
 
\item[]
 
\begin{math}
 
\times \left \{ \frac{V^2(x)}{q^4} \left [ k^2 (u^2 + v^2) \xi \eta - 2 \epsilon_1 \epsilon_2 (u^2 \xi^2 + v^2 \eta^2 ) + 2 (\epsilon_1^2 + \epsilon_2^2)uv \xi \eta cos(\phi) \right ]  \right .
 
\end{math}
 
 
 
\end{description}
 
 
 
\begin{equation}
 
\left . + a^2W^2(x) \xi^2 \eta^2 \left [ k^2(1 - (u^2+v^2)\xi \eta - 2 \epsilon_1 \epsilon_2 (u^2 \xi^2 + v^2 \eta^2) -2 (\epsilon_1^2 + \epsilon_2^2) u v \xi \eta \cos(\phi)\right ]\right \}
 
\end{equation}
 
 
 
where $k$ is photon energy, $\theta_{1}1$ and $\theta_2$ are the scattering angle of $e^+$ and $e^-$ respectively, $ \phi = \phi_1 - \phi_2$ is the angle between the $e^+$ and $e^-$ pair, $\epsilon_1$ and $\epsilon_2$
 
are the energy of the  positron and electron respectively. Other constants are
 
 
 
\begin{equation}
 
u = \epsilon_1 \theta_1
 
\end{equation}
 
\begin{equation}
 
v=\epsilon_2 \theta_2
 
\end{equation}
 
\begin{equation}
 
\xi = \frac{1}{1+u^2}
 
\end{equation}
 
\begin{equation}
 
\eta= \frac{1}{1+v^2}
 
\end{equation}
 
\begin{equation}
 
q^2 = u^2 + v^2 + 2 u v \cos(\phi)
 
\end{equation}
 
\begin{equation}
 
x= 1-q^2 \xi \eta
 
\end{equation}
 
\begin{equation}
 
V(x) = 1 + \frac{a^2}{(1!)^2} +  \frac{a^2 (1+a^2) x^2}{(2!)^2} + \frac{a^2 (1+a^2)(2^2+a^2)x^4 x^2}{(3!)^2} + \cdots
 
\end{equation}
 
\begin{equation}
 
W(x) = \frac{1}{a^2} \frac{d V(x)}{d x}
 
\end{equation}
 
\begin{equation}
 
a = \frac{Ze^2}{\hbar c}
 
\end{equation}
 
 
 
The positron and electron pairs are created back to back in the center of mass frame. In the lab frame, electrons and positrons are boosted forward, as demonstrated in the Fig.~\ref{fig:Theo-pair-pro}. The positron and electron carry away the energy from the photon that is in excess of 1.022 MeV. In the center of mass frame, the kinetic energy is equally shared. Photons with an energy above 1.022~MeV in the bremsstrahlung spectrum of Fig.~\ref{fig:Brem} have the potential to create electron and positron pairs. When the process of annihilation is included in the simulation, Fig.~\ref{fig:brem} becomes Fig.~\ref{fig:annih} showing a clear 511~keV peak on top of the bremsstrahlung spectrum. This 511 keV peak represents photon produced when the created positrons, from pair production, annihilates with an atomic electrons inside the tungsten target.
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.650]{2-Theory/Figures/Pair_Production/Pair_Production.png}
 
\caption{Pair production.}
 
\label{fig:Theo-pair-pro}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{2-Theory/Figures/Brems_photon_Ene_log.png}
 
\caption{Simulated Bremsstrahlung photon energy right after a tungsten foil.}
 
\label{fig:Theo-gamma-pair-pro}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{2-Theory/Figures/Brems_photon_Ene_log.png}
 
\caption{Simulated Bremsstrahlung photon energy right after a tungsten foil.}
 
\label{fig:Theo-gamma-pair-pro}
 
\label{fig:Brem}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{2-Theory/Figures/Brems_photon_Ene_log.png}
 
\caption{Simulated Bremsstrahlung photon energy right after a tungsten foil.}
 
\label{fig:brem}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{2-Theory/Figures/Brems_photon_Ene_log.png}
 
\caption{Simulated Bremsstrahlung photon energy right after a tungsten foil.}
 
\label{fig:annih}
 
\end{figure}
 
 
 
 
 
= Apparatus =
 
 
 
\chapter{Apparatus}
 
 
 
\section{HRRL Beamline}
 
 
 
The first step of this experiment is to deliver an electron beam with energy around 10~MeV and with sufficient current to the tungsten foil. A 16~MeV S-band High Repetition Rate Linac (HRRL) located at the Beam Lab of the Department of the Physics, Idaho State University is used to generate incident electron beam. The energy of the HRRL can be tunable between 3 to 16~MeV and its rep and its repetition rate is tunable between 1-300 Hz. Some basic parameters of the HRRL is given in the~\ref{tab:app-hrrl-par}.
 
 
 
\begin{table}[hbt]
 
\centering
 
\caption{Emittance Measurement Results.}
 
\begin{tabular}{lcc}
 
\toprule
 
{Parameter}        & {Unit}    &    {Value}    \\
 
\midrule
 
maximum energy   & MeV    &  16    \\
 
peak current        & mA     &  100    \\
 
repetition rate        & Hz    &    300  \\
 
absolute energy spread        & MeV     &  2-4    \\
 
macro pulse length        & ns    &  $>$50    \\
 
\bottomrule
 
\end{tabular}
 
\label{tab:app-hrrl-par}
 
\end{table}
 
 
 
To construct a beamline can run on both positron and electron mode, the cavity is relocated to its current position and quadrupole and dipole magnets to transport the beam. As shown in Fig.~\ref{fig:app-hrrl-line} and described in Tab.~\ref{tab:app-hrrl-parts} more diagnostic tools like OTR/YAG screens, Faraday cups and toroids are installed to the new beamline for diagnostic purposes of electron beam. Energy slits are added to the beamline for the control of energy/momentum spread of the beam. A insertable tungsten foil target (T1) is placed between the 1st and 2nd triplets to produce positrons when the electron beam hits it.
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.24]{3-Apparatus/Figures/HRRL_line.eps}
 
\caption{HRRL beamline layout and parts.}
 
\label{fig:app-hrrl-line}
 
\end{figure}
 
 
 
\begin{table}[hbt]
 
\centering
 
\caption{HRRL Beamline Parts.}
 
\begin{tabular}{ll}
 
\toprule
 
{Label}    & {Beamline Element}            \\
 
\midrule
 
T1         & positron production target    \\
 
T2          & positron annihilation target \\
 
Ens        & energy slit   \\
 
FC1, FC2    & Faraday cups        \\
 
Q1,..., Q10 & quadrupoles       \\
 
D1, D2      & dipoles            \\
 
NaI        & NaI detectors      \\
 
OTR    & optical transition radiation screen \\
 
YAG    & yttrium aluminium garnet screen    \\       
 
\bottomrule
 
\end{tabular}
 
\label{tab:app-hrrl-parts}
 
\end{table}
 
 
 
\section{Electron Beam Characterization}
 
 
 
\subsection{Emittance Measurement}
 
Emittance is an important parameter in accelerator physics. If emittance with Twiss parameters are given at the exit of the gun, we will be able to calculate beam size and divergence any point after the exit of the gun. Knowing the beam size and beam divergence on the positron target will greatly help us study the process of creating positron. Emittance with twiss parameters are also key parameters for any accelerator simulations. Also, energy and energy spread of the beam will be measured in the emittance measurement.
 
 
 
\subsubsection{Emittance}
 
In accelerator physics, Cartesian coordinate system was used to describe motion of the accelerated particles. Usually the z-axis of Cartesian coordinate system is set to be along the electron beam line as longitudinal beam direction. X-axis is set to be horizontal and perpendicular to the longitudinal direction, as one of the transverse beam direction. Y-axis is set to be vertical and perpendicular to the longitudinal direction, as another transverse beam direction.
 
For the convenience of representation, we use z to represent our transverse coordinates, while discussing emittance. And we would like to express longitudinal beam direction with s. Our transverse beam profile changes along the beam line, it makes $z$ is function of $s$, $z(s)$. The angle of a accelerated charge regarding the designed orbit can be defined as $z'=\frac{dz}{ds}$.
 
 
 
If we plot z vs. z', we will get an ellipse. The area of the ellipse is an invariant, which is called Courant-Snyder invariant~\cite{Conte}. The transverse emittance $\epsilon$ of the beam is defined to be the area of the ellipse, which contains 90\% of the particles. Beam divergence and Twiss parameters related to the beam size and beam divergence by Eq.~\ref{eq:twiss-emit},
 
 
 
\begin{equation}
 
\sigma_{x}(s)=\sqrt{\epsilon _x (s) \beta _x (s)},~ \sigma_{x'}(s)=\sqrt{\epsilon _x (s) \gamma _x (s)} .
 
\label{eq:twiss-emit}
 
\end{equation}
 
 
 
 
 
\subsubsection{Emittance Measurement}
 
 
 
The transition radiation first theoretically predicted by Ginzburg and Frank~\cite{Ginzburg-Frank} in 1946, that when a particle with charge passes the boundary of two medium emits radiation. The particle carries certain field when it passes through certain medium with certain motion~\cite{ENM-Jackson}. When it passes into the second medium, it has to reorganize its field characteristics at the boundary, and emit pieces of the field in the form electromagnetic radiation. The fields are emitted in the forward and backward directions~\cite{OTR-Gitter}. The backward radiated photons
 
 
 
An Optical Transition Radiation (OTR) based viewer was installed to allow measurements at the high electron currents available using the HRRL. The visible light from the OTR based viewer is produced when a relativistic electron beam crosses the boundary of two mediums with different dielectric constants.  Visible radiation is emitted at an angle of 90${^\circ}$ with respect to the incident beam direction when the electron beam intersects the OTR target at a 45${^\circ}$ angle. These backward-emitted photons are observed using a digital camera and can be used to measure the shape and intensity of the electron beam based on the OTR distribution. The emittance measurement can be performed in a several ways~\cite{emit-ways, sole-scan-Kim}. The Quadrupole scanning method~\cite{quad-scan} was used to measure the emittance, Twiss parameters, and beam energy.
 
 
\subsubsection{Quadrupole Scanning Method}
 
Fig.~\ref{q-scan-layout} illustrates the apparatus used to measure the emittance using the quadrupole scanning method. A quadrupole is positioned at the exit of the linac to focus or de-focus the beam as observed on a downstream view screen. The 3.1~m distance between the quadrupole and the screen was chosen in order to minimize chromatic effects and to satisfy the thin lens approximation.
 
%The quadrupole and the screen are located far away to minimize chromatic effects and to increase the veracity of the thin lens approximation used to calculate beam optics.
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.60]{3-Apparatus/MOPPR087f1.eps}
 
\caption{Apparatus used to measure the beam emittance.}
 
\label{q-scan-layout}
 
\end{figure}
 
Assuming the thin lens approximation, $\sqrt{k_1}L << 1$, is satisfied, the transfer matrix of a quadrupole magnet may be expressed as
 
% thin lens approximation (sqrt{k1}*L << 1). In our case sqrt{k1}*L =0.07
 
\begin{equation}
 
\label{quad-trans-matrix}
 
\mathrm{\mathbf{Q}}=\Bigl(\begin{array}{cc}
 
1 & 0\\
 
-k_{1}L & 1
 
\end{array}\Bigr)=\Bigl(\begin{array}{cc}
 
1 & 0\\
 
-\frac{1}{f} & 1
 
\end{array}\Bigr),
 
\end{equation}
 
where $k_{1}$ is the quadrupole strength, $L$ is the length of quadrupole, and $f$ is the focal length. A matrix representing the drift space between the quadrupole and screen is given by
 
\begin{equation}
 
\label{drift-trans-matrix}
 
\mathbf{\mathbf{S}}=\Bigl(\begin{array}{cc}
 
1 & l\\
 
0 & 1
 
\end{array}\Bigr),
 
\end{equation}
 
where $l$ is the distance between the scanning quadrupole and the screen. The transfer matrix of the scanning region is given by the matrix product $\mathbf{SQ}$.
 
In the horizontal plane, the beam matrix at the screen ($\mathbf{\sigma_{s}}$) is related to the beam matrix of the quadrupole ($\mathbf{\sigma_{q}}$)  using the similarity transformation
 
\begin{equation}
 
\mathbf{\mathbf{\sigma_{s}=M\mathrm{\mathbf{\mathbf{\sigma_{q}}}}}M}^{\mathrm{T}}.
 
\end{equation}
 
where the $\mathbf{\sigma_{s}}$ and $\mathbf{\sigma_{q}}$ are defined as~\cite{SYLee}
 
\begin{equation}
 
\mathbf{\mathbf{\sigma_{s,\mathnormal{x}}=}}\Bigl(\begin{array}{cc}
 
\sigma_{\textnormal{s},x}^{2} & \sigma_{\textnormal{s},xx'} \\
 
\sigma_{\textnormal{s},xx'} & \sigma_{\textnormal{s},x'}^{2}
 
\end{array}\Bigr)
 
,\;
 
\mathbf{\mathbf{\sigma_{q,\mathnormal{x}}}}=\Bigl(\begin{array}{cc}
 
\sigma_{\textnormal{q},x}^{2} & \sigma_{\textnormal{q},xx'}\\
 
\sigma_{\textnormal{q},xx'} & \sigma_{\textnormal{q},x'}^{2}
 
\end{array}\Bigr).
 
\end{equation}
 
\noindent
 
%By defining the new parameters~\cite{quad-scan}, $A \equiv \sigma_{11},~B \equiv \frac{\sigma_{12}}{\sigma_{11}},~C \equiv\frac{\epsilon_{x}^{2}}{\sigma_{11}}$
 
By defining the new parameters~\cite{quad-scan}
 
\begin{equation}
 
A \equiv l^2\sigma_{\textnormal{q},x}^{2},~B \equiv \frac{1}{l} + \frac{\sigma_{\textnormal{q},xx'}}{\sigma_{\textnormal{q},x}^{2}},~C \equiv l^2\frac{\epsilon_{x}^{2}}{\sigma_{\textnormal{q},x}^{2}},
 
\end{equation}
 
the matrix element $\sigma_{\textnormal{s},x}^{2}$, the square of the rms beam size at the screen, may be expressed as a parabolic function of the product of $k_1$ and $L$
 
\begin{equation}
 
\sigma_{\textnormal{s},x}^{2}=A(k_{1}L)^{2}-2AB(k_{1}L)+(C+AB^{2}).
 
\label{par_fit}
 
\end{equation}
 
 
 
The emittance measurement was performed by changing the quadrupole current, which changes $k_{1}L$, and measuring the  corresponding beam image on the view screen. The measured two-dimensional beam image was projected along the image's abscissa and ordinate axes.  A Gaussian fitting function is used on each projection to determine the  rms value, $\sigma_{\textnormal{s}}$ in Eq.~(\ref{par_fit}). Measurements of $\sigma_{\textnormal{s}}$ for several quadrupole currents ($k_{1}L$) is then fit using the parabolic function in Eq.~(\ref{par_fit}) to determine the constants $A$, $B$, and $C$.  The emittance ($\epsilon$)  and the Twiss parameters ($\alpha$ and $\beta$) can be found using Eq.~(\ref{emit-relation}).
 
\begin{equation}
 
\epsilon=\frac{\sqrt{AC}}{l^2},~\beta=\sqrt{\frac{A}{C}},~\alpha=\sqrt{\frac{A}{C}}(B+\frac{1}{l}).
 
\label{emit-relation}
 
\end{equation}
 
 
 
\subsection{The OTR Imaging System}
 
The OTR target is 10 $\mu$m thick aluminum foil with a 1.25 inch diameter. The OTR is emitted in a cone shape with the maximum intensity at an angle of $1/\gamma$ with respect to the reflecting angle of the electron beam~\cite{OTR}.  Three lenses, 2 inches in diameter, are used for the imaging system to avoid optical distortion at lower electron energies. The focal lengths and position of the lenses are shown in Fig.~\ref{image_sys}. The camera used was a JAI CV-A10GE digital camera with a 767 by 576 pixel area. The camera images were taken by triggering the camera synchronously with the electron gun.
 
\begin{figure}
 
\centering
 
{\scalebox{0.46} [0.46]{\includegraphics{3-Apparatus/MOPPR087f2.eps}}} {\scalebox{0.50} [0.50]{\includegraphics{3-Apparatus/MOPPR087f3}}}
 
\caption{The OTR Imaging system.}
 
\label{image_sys}
 
\end{figure}
 
\subsubsection{Quadrupole Scanning Experiment}
 
The quadrupole current is changed to alter the strength and direction of the quadrupole magnetic field such that a measurable change in the beam shape is seen by the OTR system.  Initially, the beam was steered by the quadrupole indicating that the beam was not entering along the quadrupole's central axis.  Several magnetic elements upstream of this quadrupole were adjusted to align the incident electron beam with the quadrupole's central axis.  First, the beam current observed by a Faraday cup located at the end of beam line was maximized using upstream steering coils within the linac nearest the gun.  Second, the first solenoid nearest the linac gun was used to focus the electron beam on the OTR screen. Steering coils were adjusted to maximize the beam current to the Faraday cup and minimize the deflection of the beam by the solenoid first then by the quadrupole.  A second solenoid and the last steering magnet, both near the exit of the linac, were used in the final step to optimize the beam spot size on the OTR target and maximize the Faraday cup current.  A configuration was found that minimized the electron beam deflection when the quadrupole current was altered during the emittance measurements.
 
 
The emittance measurement was performed using an electron beam energy of 15~MeV and a 200~ns long, 40~mA, macro pulse peak current.  The current in the first quadrupole after the exit of the linac was changed from $-$~5~A to 5~A with an increment of 0.2~A.  Seven measurements were taken at each current step in order to determine the average beam width and the variance.  Background measurements were taken by turning the linac's electron gun off while keep the RF on. Background image and beam images before and after background subtraction are shown in Fig.~\ref{bg}. A small dark current is visible in Fig.~\ref{bg}b that is known to be generated when electrons are pulled off the cavity wall and accelerated.
 
 
\begin{figure}
 
\begin{tabular}{ccc}
 
\centerline{\scalebox{0.42} [0.33]{\includegraphics{3-Apparatus/MOPPR087f4.eps}}} \\
 
(a)\\
 
\centerline{\scalebox{0.42} [0.33]{\includegraphics{3-Apparatus/MOPPR087f5.eps}}}\\
 
(b)\\
 
\centerline{\scalebox{0.42} [0.33]{\includegraphics{3-Apparatus/MOPPR087f6.eps}}}\\
 
(c)
 
\end{tabular}
 
\caption{Background subtracted to minimize impact of dark current; (a) a beam with the dark current and background noise, (b) a background image, (c) a beam image when dark background was subtracted.}
 
\label{bg}
 
\end{figure}
 
 
 
The electron beam energy was measured using a dipole magnet downstream of the quadrupole used for the emittance measurements.  Prior to energizing the dipole, the electron micro-pulse bunch charge  passing through the dipole was measured using a Faraday cup located approximately 50~cm downstream of the OTR screen.  The dipole current was adjusted until a maximum beam current was observed on another Faraday cup located just after the 45 degree exit port of the dipole.  A magnetic field map of the dipole suggests that the electron beam energy was 15~$\pm$~1.6~MeV.  Future emittance measurements are planned to cover the entire energy range of the linac.
 
 
 
\subsubsection{Data Analysis and Results}
 
Images from the JAI camera were calibrated using the OTR target frame.  An LED was used to illuminate the OTR aluminum frame  that has a known inner diameter of 31.75~mm.  Image processing software was used to inscribe a circle on the image to measure the circular OTR inner frame in units of pixels.  The scaling factor can be obtained by dividing this length with the number of pixels observed. The result is a horizontal scaling factor of 0.04327~$\pm$~0.00016~mm/pixel and vertical scaling factor of 0.04204~$\pm$~0.00018~mm/pixel.
 
Digital images from the JAI camera were extracted in a matrix format in order to take projections on both axes and perform a Gaussian fit. The observed image profiles were not well described by a single Gaussian distribution.  The profiles may be described using a Lorentzian distribution, however, the rms of the Lorentzian function is not defined. The super Gaussian distribution seems to be the best option~\cite{sup-Gau}, because rms values may be directly extracted.
 
 
Fig.~\ref{fig:par-fit}  shows the square of the rms ($\sigma^2_{\textnormal{s}}$) $vs$ $k_1L$ for $x$ (horizontal) and $y$ (vertical) beam projections along with the parabolic fits using Eq.~\ref{fig:par-fit}. The emittances and Twiss parameters from these fits are summarized in Table~\ref{tab:results}.
 
\begin{figure}
 
\begin{tabular}{cc}
 
{\scalebox{0.42} [0.4]{\includegraphics{3-Apparatus/MOPPR087f7.eps}}}
 
{\scalebox{0.42} [0.4]{\includegraphics{3-Apparatus/MOPPR087f8.eps}}}
 
\end{tabular}
 
\caption{Square of rms values and parabolic fittings.}
 
\label{fig:par-fit}
 
\end{figure}
 
 
\begin{figure}
 
\begin{tabular}{cc}
 
{\scalebox{0.42} [0.4]{\includegraphics{3-Apparatus/MOPPR087f7.eps}}}
 
{\scalebox{0.42} [0.4]{\includegraphics{3-Apparatus/MOPPR087f8.eps}}}
 
\end{tabular}
 
\caption{Square of rms values and parabolic fittings.}
 
\label{fig:par-fit}
 
\end{figure}
 
 
\begin{table}[hbt]
 
\centering
 
\caption{Emittance Measurement Results.}
 
\begin{tabular}{lcc}
 
\toprule
 
{Parameter}        & {Unit}    &    {Value}    \\
 
\midrule
 
projected emittance $\epsilon_x$        &  $\mu$m    &    $0.37 \pm 0.02$    \\
 
projected emittance $\epsilon_y$            &  $\mu$m    &    $0.30 \pm 0.04$    \\
 
%   normalized \footnote{normalization procedure assumes appropriate beam chromaticity.} emittance $\epsilon_{n,x}$  &  $\mu$m    &  $10.10 \pm 0.51$        \\
 
%normalized emittance $\epsilon_{n,y}$      &  $\mu$m    &  $8.06 \pm 1.1$          \\
 
$\beta_x$-function                            &  m                          &  $1.40  \pm  0.06$          \\
 
$\beta_y$-function                                &  m                          &  $1.17  \pm 0.13$        \\
 
$\alpha_x$-function                          &  rad                        &  $0.97  \pm  0.06$          \\
 
$\alpha_y$-function                              &  rad                        &  $0.24  \pm 0.07$        \\
 
micro-pulse charge                                    &  pC                          &  11        \\
 
micro-pulse length                                    &  ps                          &  35          \\
 
energy of the beam $E$                                &  MeV                        &  15    $\pm$ 1.6    \\
 
relative energy spread $\Delta E/E$                                &  \%                        &  10.4        \\
 
 
\bottomrule
 
\end{tabular}
 
\label{tab:results}
 
\end{table}
 
 
\subsection{Conclusions}
 
A diagnostic tool was developed and used to measure the beam emittance of the High Rep Rate Linac at the Idaho Accelerator Center. The tool relied on measuring the images generated by the optical transition radiation of the electron beam on a polished thin aluminum target.  The electron beam profile was not described well using a single Gaussian distribution but rather by a super Gaussian or Lorentzian distribution. The larger uncertainties observed for $\sigma^2_y$ are still under investigation. The projected emittance of the High Repetition Rate Linac, similar to medical linacs, at ISU was measured to be less than 0.4~$\mu$m as measured by the OTR based tool described above when accelerating electrons to an energy of 15~MeV. The normalized emittance may be obtained by multiplying the projected emittance by the average relativistic factor $\gamma$ and $\beta$ of the electron beam. We plan to perform similar measurements over the energy range of the linac in the near future.
 
 
 
\section{Energy Scan}
 
Energy scan was done to measure the energy profile of HRRL at nominal 12~MeV. A Faraday cup was placed at the end of the 45 degree beamline to measure the electron beam current bent by the first dipole. Dipole coil current were changed by 1~A increment and the Faraday cup currents were recorded. The relation between dipole current and beam energy is given in the appendix. A 12~MeV peak observed with long low energy tail. The energy distribution of HRRL can be described by two skewed Gaussian fits overlapping~\cite{sup-Gau}. The measurement result and fit are shown in Fig.~\ref{fig:En-Scan} and in Table~\ref{tab:En-Scan_resluts}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.70]{3-Apparatus/HRRL-En-Scan_2_Assym_Gaussian_fit.png}
 
\caption{HRRL energy scan (blue dots) and fit (red line) with two skewed Gaussian distribution.}
 
\label{fig:En-Scan}
 
\end{figure}
 
 
 
\begin{table}[hbt]
 
\centering
 
\caption{Two Skewed Gaussian Parameters Describes Energy Distribution.}
 
\begin{tabular}{lccc}
 
\toprule
 
{Parameter}            & Unit  & {First Gaussian}    &    {Second Gaussian}    \\
 
\midrule
 
amplitude  A          &      &  2.14 &  10.88  \\
 
mean        $\mu$      & MeV  & 12.07 &  12.32  \\
 
sigma left  $\sigma_L$ & MeV  & 4.47  &  0.70  \\
 
sigma right $\sigma_R$ & MeV  & 1.20  &  0.45  \\             
 
\bottomrule
 
\end{tabular}
 
\label{tab:En-Scan_resluts}
 
\end{table}
 
 
 
 
 
 
 
\section{Positron Detection}
 
 
 
Positrons are transported to the end of the 90 degree beamline, experimental side of the room, which is located at the other side of the wall. A 6-way cross is placed at the end of the beamline to hold T2 and thin windows. 2 NaI detectors are used to detect photons generated during the annihilation process. The setup is shown in Fig.~\ref{fig:HRRL-pos-det-setup}.
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{3-Apparatus/HRRL_Pos_detection.png}
 
\caption{Positron Detection System. T2 (pink) is placed with horizontal plane, then rotated towards left detector 45 degree.}
 
\label{fig:HRRL-pos-det-setup}
 
\end{figure}
 
 
 
\subsection{NaI Detectors}
 
 
 
NaI crystals, shown as in Fig.~\ref{fig:PMT}, acquired from IAC were used to detect 511~keV photons from positron annihilation. Since the detectors had pulse length around 400~$\mu$s, the PMT bases were redesigned and rebuilt.  The NaI detectors have two outputs, one is at second last dynode and one anode signal. PMT base configuration of the NaI detectors is shown in the Fig.~\ref{fig:PMT_base} and bases made shown in Fig.~\ref{fig:new_base_made}. It takes ADC 5.7~$\mu$s to convert analog signal to digital signal. The signal from anode was delayed 6~$\mu$s by long cable and sent to the ADC. PMT base take HV around -1150~V.
 
 
 
Rebuilt PMT bases because old base  pulse length is around 400~μs.The new base pulse length around 1~μs. The NaI crystal is SAINT-GOBAIN CRYSTAL \& DETECTORS (MOD. 3M3/3) with sizes of 3”x3”. Bases were calibrated using Na-22 and Co-60 sources with  photon peaks indicated in the Table~\ref{tab:Na22_Co60}.
 
 
 
\begin{table}[hbt]
 
\centering
 
\caption{Radioactive sources and photon peaks.}
 
\begin{tabular}{lccc}
 
\toprule
 
{Radioactive Sources} & Unit  & First Peak  & Second Peak \\
 
\midrule
 
Co-60                & keV  &  1173      &  1332      \\
 
Na-22                & keV  &  511        &  1275      \\             
 
\bottomrule
 
\end{tabular}
 
\label{tab:Na22_Co60}
 
\end{table}
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.6]{3-Apparatus/Modified_PMT.png}
 
\caption{Modified PMT base design.}
 
\label{fig:PMT_base}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.4]{3-Apparatus/SAINT-GOBAIN_3M33.png}
 
\caption{NaI crystal dimension.}
 
\label{fig:PMT}
 
\end{figure}
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.13]{3-Apparatus/IAC_NaI.png}
 
\caption{NaI crystals and new bases.}
 
\label{fig:new_base_made}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.4]{3-Apparatus/NaI_Na22_Scope.png}
 
\caption{Pulses from Na-22 source observed on the scope.}
 
\label{fig:NaI_Na22_Scope}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.4]{3-Apparatus/NaI_Co60_Scope.png}
 
\caption{Pulses from Co-60 source observed on the scope.}
 
\label{fig:NaI_Co60_Scope}
 
\end{figure}
 
   
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.35]{3-Apparatus/NaI-Calb.png}
 
\caption{Calibrated NaI spectrum of with sources.}
 
\label{fig:NaI-Calb}
 
\end{figure}     
 
     
 
 
 
\subsection{Trigger for DAQ}
 
 
 
The trigger for DAQ required a coincidence between one or more NaI detectors and the electron accelerator gun pulse. The last dynode signals from left and right NaI detectors were inverted using a Ortec 474 amplifier and sent to a Constant Fraction Discriminator (CFD Model specs).
 
RF noise from the accelerator is as large as the signal from the NaI detector. Since it is correlated in time with the gun pulse, the gun pulse was used to generate a VETO pulse that prevent the CFD from triggering on this RF noise.
 
After this discrimination and RF noise rejection, the discriminated dynode signals were sent to an Octalgate Generator (Model) that increased the width of the logic signals to prevent multiple pulses during a single electron pulse. Then the signals were sent to Quad Coincidence to generate AND logic between electron gun and dynode signals. The logic is set as:
 
 
 
\begin{equation}
 
(NaI~Left~\&\&~Gun~Trigger)~\&\&~(NaI~Rgiht~\&\&~Gun~Trigger).
 
\end{equation}
 
 
 
This is to make sure we have trigger when photons back to back scatter to the NaI detectors when electron gun is on.
 
Then this trigger was sent to ORTEC Gate \& Delay Generator. One of the out from gate generator was used to generate a gate to read analog signal from anode. Another output was delayed by 6 μs, necessary time to convert the analog signal from anode to digital signal, and used as trigger for the DAQ.
 
 
 
 
 
= Experiment =
 
\chapter{Experiment}
 
 
 
\section{Runs}
 
 
 
The annihilation target T2 is can be inserted or removed from the center of the beamline. This allow two kind runs, T2 in and T2 out. When T2 is in the positions are delivered to T2 and thermalize and annihilate produces 511 KeV photons. This photons are detected by the NaI detectors as shown in Fig.~\ref{fig:HRRL-En-Scan}. When T2 is out, positrons exits beamlien and transported to the beam dump. NaI detectors are shielded with Pb bricks from the beam dump. T2 out runs serve as background measurements.
 
 
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.50]{3-Apparatus/NaI_Setup.png}
 
\caption{Positron detection using T2 and NaI detectors.}
 
\label{fig:HRRL-En-Scan}
 
\end{figure}
 
 
 
T2 is placed inside a 6-way cross and two horizontal side it sealed with thin windows. Two NaI detectors placed horizontally to T2, perpendicular to the 90 degree beamline and pointed to this windows. 
 
 
 
 
 
 
\begin{table}[hbt]
 
\centering
 
\caption{Run 3735}
 
\begin{tabular}{cc}
 
 
 
{\scalebox{0.73} [0.70]{\includegraphics[scale=0.40]{3-Apparatus/r3737_sub_r3736_left.png}}}    &    {\scalebox{0.73} [0.70]{\includegraphics[scale=0.40]{3-Apparatus/r3737_sub_r3736_right.png}}}    \\
 
(a) & (b) \\
 
 
 
& \\
 
& \\
 
 
 
{\scalebox{0.73} [0.70]{\includegraphics[scale=0.40]{3-Apparatus/r3737_sub_r3736_right_with_cut.png}}}    &      {\scalebox{0.73} [0.70]{\includegraphics[scale=0.40]{3-Apparatus/r3737_sub_r3736_right_with_cut.png}}}    \\
 
 
 
(c) & (d) \\
 
& \\
 
 
 
\end{tabular}
 
\label{fig:in-out-runs}
 
\caption{Top row: original spectrum. Bottom row: incidents only happens around 511~keV peak and on both detectors.}
 
\end{table}
 
 
 
 
 
 
 
\section{Signal Extraction}
 
 
 
For 3 MeV and on detector show all the steps
 
1. Raw counts target in and out (calibrated energy)
 
2. Normalized counts
 
3. background subtracted
 
4. Integral (zoomed in and with error)
 
Example of error propagation for the above
 
 
 
Raw counts target in and out
 
Lets take example of run\#3735 for the data analysis. The integral shown in red is from the background is subtracted spectrum.
 
 
 
\begin{table}[hbt]
 
\centering
 
\caption{Run 3735}
 
\begin{tabular}{lll}
 
\toprule
 
{Parameter}        & {Unit}    &    {Value}    \\
 
\midrule
 
run number         &            &    3735      \\
 
repetition rate             &  Hz        &    300        \\
 
run time         &  s        &    1002      \\
 
pulses              &            &    301462    \\
 
events              &            &    9045      \\
 
e+ Counts NaI Detectors  &      &    256 $\pm$ 16\\
 
\bottomrule
 
\end{tabular}
 
\label{tab:run3735}
 
\end{table}
 
 
 
 
 
\section{Electron Current Estimation}
 
 
 
A photon scintillator was placed between quadrupole 9 and quarupole 10 shown as in the Fig.~\ref{fig:Scint_e-} and used as electron beam monitor. To calibrate this scintillator electron beam changed incrementally and the charge was measured both on oscilloscope and ADC. As the electron beam increases the beam charge observed on the scope increased and the photon peak in the ADC also shifted towards right end of the spectrum. The result shows that the relation between electron beam current and scintillator ADC channel number is linear, $(0.93 \pm 0.14)/50$ nVs/(ADC channel). The spectrum taken is shown in Fig~\ref{fig:ADC-CH9}.
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.10]{4-DataAnalysis/Hrrl_pos_jul2012_setup_Scint_e-_current.jpg}
 
\caption{Electron beam monitor.}
 
\label{fig:Scint_e-}
 
\end{figure}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.70]{4-DataAnalysis/Figures/r3735_ADC9.png}
 
\caption{Electron beam monitor ADC signal}
 
\label{fig:ADC-CH9}
 
\end{figure} 
 
 
 
To find the average charge in a run two methods were used. One method calculates charge bin by bin.
 
 
 
\begin{math}
 
\underset{i}{\sum} i \times (bin~content[i]) \times Q_{Calb} \times (pulses/events).
 
\end{math}
 
 
 
Another method uses the mean of the of the spectrum, multiply it with total number of pulses and the multiplies it with calibration factor. The average of the two methods is taken.
 
 
For example, the electron rate calculation in run 3735 is calculated as following.
 
 
 
 
 
\indent
 
 
 
\begin{math}
 
\underset{i}{\sum} i \times (bin~content[i]) \times (856.9 \pm 1.0)(ADC~channel) \times (301462/9045) = (4.8 \pm 0.7 ) \times 10^{-3}~C.
 
\end{math}
 
 
 
Total charge of electrons in this run with method 2 is
 
 
 
\begin{math}
 
Q_{e^-} = (856.9 \pm 1.0)(ADC~channel) \times 301462 \times (0.93 \pm 0.14)/50 (nVs/(ADC~channel)) =(4.8 \pm 0.7 ) \times 10^{-3}~C.
 
\end{math}
 
 
 
 
The average of the two is\begin{math} (4.8 \pm 0.5 ) \times 10^{-3}~C.\end{math}. Then this total charge can be used to calculate total numbers of the electrons or average current of electron beam in this run.
 
 
 
\section{Positron Current Estimation}
 
 
 
Fig.~\ref{fig:e+_NaILR} are the background subtracted spectrum. The (a) and (b) are NaI left and right detectors' spectrum. The (c) and (d) are NaI left and right detectors' spectrum with cut around 511 keV peak and after requiring coincident event on both detectors. 
 
 
 
\begin{table}[hbt]
 
\centering
 
\caption{Run 3735}
 
\begin{tabular}{cc}
 
 
 
{\scalebox{0.73} [0.70]{\includegraphics[scale=0.40]{4-DataAnalysis/Figures/NaI_L/whole/r3735_sub_r3736.png}}}    &    {\scalebox{0.73} [0.70]{\includegraphics[scale=0.40]{4-DataAnalysis/Figures/NaI_R/whole/r3735_sub_r3736.png}}}    \\
 
(a) Left NaI & (b) Right NaI \\
 
 
 
& \\
 
& \\
 
 
 
{\scalebox{0.73} [0.70]{\includegraphics[scale=0.40]{4-DataAnalysis/Figures/NaI_L/event_at_511_region_on_both/r3735_sub_r3736.png}}}    &      {\scalebox{0.73} [0.70]{\includegraphics[scale=0.40]{4-DataAnalysis/Figures/NaI_R/event_at_511_region_on_both/r3735_sub_r3736.png}}}    \\
 
 
 
(c) Left NaI with cut and coincidence & (d) Right NaI with cut and coincidence \\
 
& \\
 
 
 
\end{tabular}
 
\label{fig:e+_NaILR}
 
\caption{NaI positron run spectrum.}
 
\end{table}
 
 
\subsection{Positron to Electron Ratio} 
 
 
 
The measured ratio of positron to electron ratio is given the following Table~\ref{tab:e+2e-} and Fig.~\ref{fig:e+2e-}.
 
 
\begin{table}[hbt]
 
\centering
 
\caption{Run 3735}
 
\begin{tabular}{lll}
 
\toprule
 
{Energy}            & {Positron to Electron Ratio}      \\
 
\midrule
 
$1.03\pm0.13$    &    $0.19 \pm 0.19$  \\
 
$2.15\pm0.13$    &    $0.69 \pm 0.24$  \\
 
$3.0 \pm0.13$    &    $8.25 \pm 0.96$  \\
 
$4.02\pm0.13$    &    $4.20 \pm 0.80$  \\
 
$5.0 \pm0.13$    &    $0.62 \pm 0.16$  \\
 
             
 
\bottomrule
 
\end{tabular}
 
\label{tab:e+2e-}
 
\end{table}
 
 
 
\begin{figure}[htb]
 
\centering
 
\includegraphics[scale=0.70]{4-DataAnalysis/Figures/Ratio/Ratio.png}
 
\caption{Left NaI}
 
\label{fig:e+2e-}
 
\end{figure} 
 
 
 
\subsection{Sources of Systematic Errors}
 
 
 
 
 
\subsubsection{Error on Energy}
 
 
 
To find Error on the energy, the electron beam is directed to the phosphorous screen at the end of the 90 degree beamline. The beam centered then steering away from the center. The current change on the dipole ΔI when beam is center and at the edge is 0.2 A. This is corresponding to 0.13 MeV in beam energy.
 
 
 
\subsubsection{Error on Ratio}
 
 
 
Error on electron beam is derived from:
 
 
 
Error on positron beam rate is derived from: $\sqrt{\frac{positron~rate}{run~time}}$
 
 
\subsubsection{Annihilation target angle}
 
Use simulation to determine how sensitive annihilation of positrons is to angle.
 
 
 
What is the dependence of the annihilation target angle with the probability of a positron annihilating in the target and producing a photon that is detected by the NaI detector, 
 
 
 
What is the distribution of 511s as a function of angle phi when theta is 90 degrees?  Are they uniformly produced?
 
\subsubsection{Energy cut systematics}
 
 
 
How does the positron production efficiency change when you change the range of the 511 cut.
 

Latest revision as of 17:42, 14 March 2014