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@@ -27,13 +27,13 @@ Section~\ref{sec:pinn}.
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\section{Mathematical Modelling using Functions}
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\section{Mathematical Modelling using Functions}
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\label{sec:domain}
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\label{sec:domain}
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-In order to model a mathematical problem, it is necessary to define a set of
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-fundamental numbers or quantities upon which the subsequent calculations will be
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-based. These sets may represent, for instance, a specific time interval or a
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-distance. The term \emph{domain} describes these fundamental sets of numbers or
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-quantities~\cite{Rudin2007}. A \emph{variable} is a changing entity living in a
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-certain domain. In this thesis, we will focus on domains of real numbers in
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-$\mathbb{R}$.\\
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+To model a physical problem using mathematical tools, it is necessary to define
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+a set of fundamental numbers or quantities upon which the subsequent calculations
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+will be based. These sets may represent, for instance, a specific time interval
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+or a distance. The term \emph{domain} describes these fundamental sets of
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+numbers or quantities~\cite{Rudin2007}. A \emph{variable} is a changing entity
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+living in a certain domain. In this thesis, we will focus on domains of real
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+numbers in $\mathbb{R}$.\\
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The mapping between variables enables the modeling of the process and depicts
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The mapping between variables enables the modeling of the process and depicts
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the semantics. We use functions in order to facilitate this mapping. Let
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the semantics. We use functions in order to facilitate this mapping. Let
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@@ -78,7 +78,8 @@ the rate of change and is called the second order derivative. Iterating this $n$
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times results in $\frac{d^nf}{dx^n}$, the derivative of the $n$'th order.
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times results in $\frac{d^nf}{dx^n}$, the derivative of the $n$'th order.
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Another method for obtaining a differential equation is to create it from the
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Another method for obtaining a differential equation is to create it from the
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semantics of a problem. This method is useful if no basic function exists for a
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semantics of a problem. This method is useful if no basic function exists for a
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-system.\\
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+system. Differential equations find application in several areas such as
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+engineering, physics, economics, epidemiology, and beyond.\\
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In the context of functions, it is possible to have multiple domains, meaning
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In the context of functions, it is possible to have multiple domains, meaning
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that function has more than one parameter. To illustrate, consider a function
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that function has more than one parameter. To illustrate, consider a function
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@@ -90,91 +91,123 @@ domains. In contrast, \emph{ordinary differential equations} (\emph{ODE}'s) are
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the single derivatives for a function having only one domain. In this thesis, we
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the single derivatives for a function having only one domain. In this thesis, we
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only need ODE's.\\
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only need ODE's.\\
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-A \emph{differential system} is the name for a collective of differential
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-equations. The derivatives in a differential system each have their own
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-codomain, which is part of the problem, while they all share the same domain.\\
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+A \emph{system of differential equations} is the name for a set of differential
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+equations. The derivatives in a system of differential equations each have their
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+own codomain, which is part of the problem, while they all share the same
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+domain.\\
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-Tenenbaum and Pollard~\cite{Tenenbaum1985} provides many examples for ODE's,
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-including the \emph{Motion of a Particle Along a Straight Line}. Newton's second
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-law states that ``the rate of change of the momentum of a body
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+Tenenbaum and Pollard~\cite{Tenenbaum1985} provide many examples for ODE's,
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+including the \emph{Motion of a Particle Along a Straight Line}. Further,
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+Newton's second law states that ``the rate of change of the momentum of a body
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($momentum = mass \cdot velocity$) is proportional to the resultant external
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($momentum = mass \cdot velocity$) is proportional to the resultant external
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force $F$ acted upon it''~\cite{Tenenbaum1985}. Let $m$ be the mass of the body
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force $F$ acted upon it''~\cite{Tenenbaum1985}. Let $m$ be the mass of the body
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-in kilograms, $v$ its velocity in seconds per meter and $t$ the time in seconds.
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+in kilograms, $v$ its velocity in meters per second and $t$ the time in seconds.
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Then, Newton's second law translates mathematically to
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Then, Newton's second law translates mathematically to
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\begin{equation} \label{eq:newtonSecLaw}
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\begin{equation} \label{eq:newtonSecLaw}
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F = m\frac{dv}{dt}.
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F = m\frac{dv}{dt}.
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\end{equation}
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\end{equation}
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It is evident that the acceleration, $a=\frac{dv}{dt}$, as the rate of change of
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It is evident that the acceleration, $a=\frac{dv}{dt}$, as the rate of change of
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-the velocity is part of the equation. Additionally, is the velocity of a body
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+the velocity is part of the equation. Additionally, the velocity of a body is
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the derivative of the distance traveled by that body. Based on these findings,
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the derivative of the distance traveled by that body. Based on these findings,
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we can rewrite the equation~\ref{eq:newtonSecLaw} to
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we can rewrite the equation~\ref{eq:newtonSecLaw} to
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\begin{equation}
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\begin{equation}
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F=ma=m\frac{d^2s}{dt^2}.
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F=ma=m\frac{d^2s}{dt^2}.
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-\end{equation}
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+\end{equation}\\
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+This explanation of differential equations focuses on the aspects deemed crucial
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+for this thesis and is not intended to be a complete explanation of the subject.
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+To gain a better understanding of it, we recommend the books mentioned
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+above~\cite{Rudin2007,Tenenbaum1985}. In the following section we
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+describe the application of these principles in epidemiological models.
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% -------------------------------------------------------------------
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% -------------------------------------------------------------------
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\section{Epidemiological Models}
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\section{Epidemiological Models}
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\label{sec:epidemModel}
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\label{sec:epidemModel}
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-After a pandemic like \emph{COVID-19}, which has resulted in a significant
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-number of fatalities, the question remains: How should we fight a pandemic
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-correctly. Also, it is necessary to study whether the employed countermeasures
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-efficacious in combating the pandemic. In the light of the unfavorable public
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-responce to measures such as lockdowns, it is imperative to investigate that
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-their efficacy remains commensurate with the costs incurred to those affected.
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-In the event that alternative and novel technologies were in use, such as the
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-mRNA vaccines in the context of COVID-19, it is needful to test the effect and
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-find the optimal variant. In order to conduct the aforementioned investigations
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-we need to develop a method to quantize the pandemic and its course of progression.
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+Pandemics, like \emph{COVID-19}, which has resulted in a significant
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+number of fatalities. The question arises: How should we fight a pandemic
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+correctly? Also, it is essential to study whether the employed countermeasures
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+efficacious in combating the pandemic. Given the unfavorable public response to
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+measures such as lockdowns, it is imperative to investigate that their efficacy
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+remains commensurate with the costs incurred to those affected. In the event
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+that alternative and novel technologies were in use, such as the mRNA vaccines
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+in the context of COVID-19, it is needful to test the effect and find the
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+optimal variant. In order to shed light on the aforementioned events we need to
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+develop a method to quantize the pandemic along with its course of
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+progression.\\
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+
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The real world is a highly complex system, which presents a significant
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The real world is a highly complex system, which presents a significant
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-challenge attempting to describe it fully in a model. The model must therefor
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+challenge attempting to describe it fully in a model. Therefore, the model must
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reduce the complexity while retaining the essential information. Furthermore, it
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reduce the complexity while retaining the essential information. Furthermore, it
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must address the issue of limited data availability. For instance, during
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must address the issue of limited data availability. For instance, during
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-COVID-19 institutions such as the Robert Koch Institute (RKI) were only able to
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-collect data on infections and mortality cases. Consequently, we require a model
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-that employs an abstraction of the real world to illustrate the events and
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-relations that are pivotal to understanding the problem.
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+COVID-19 institutions such as the Robert Koch Institute
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+(RKI)\footnote[1]{\url{https://www.rki.de/EN/Home/homepage_node.html}} were only
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+able to collect data on infections and mortality cases. Consequently, we require
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+a model that employs an abstraction of the real world to illustrate the events
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+and relations that are pivotal to understanding the problem.
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% -------------------------------------------------------------------
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% -------------------------------------------------------------------
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\subsection{SIR Model}
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\subsection{SIR Model}
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\label{sec:pandemicModel:sir}
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\label{sec:pandemicModel:sir}
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-One of the most influential epidemiological models is the \emph{SIR Model}
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-introduced by Kermack and McKendrick~\cite{1927} in 1927. The book
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-\emph{Mathematical Models in Biology}~\cite{EdelsteinKeshet2005} re-iterates the
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-model and the following explanation will be based on it.\\
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-
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-The SIR Model is able to depict diseases, which are transferred by contact or
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-close proximity of an individual carrying the illness and a healthy one. This is
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-possible due to the distinction between infected beings carrying the disease and
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-the group if people that are healthy but can be infected. In the model the
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-mentioned are able to change, by healthy individuals getting infected. In the
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-real world the size of a population has many causes to change. Births increase
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-the population, while deaths make it decease. There are different reasons for
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-people dying, for instance old age, or another disease. To omit this factor of
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-complexity, the model assumes the size $N$ of the population is constant across
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-the duration of the epidemic. Three groups make up the population $N$: the
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-\emph{susceptible} group $S$, the \emph{infectious} group $I$ and the
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-\emph{removed} group $R$ (hence SIR Model). For $S$, $I$, $R$ and $N$ applies:
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+In 1927, Kermack and McKendrick~\cite{1927} introduced the \emph{SIR Model},
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+which subsequently became one of the most influential epidemiological models.
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+The book \emph{Mathematical Models in Biology}~\cite{EdelsteinKeshet2005}
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+reiterates the model and serves as the foundation for the following explanation
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+of SIR models.\\
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+
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+The SIR Model is capable of illustrating diseases, which are transferred through
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+contact or proximity of an individual carrying the illness and a healthy
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+individual. This is possible due to the distinction between infected beings
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+who are carriers of the disease and the part of the population, which is
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+susceptible to infection. In the model, the mentioned groups are capable to
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+change, by healthy individuals becoming infected. In the real world the size of
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+a population is subject to a number of factors that can contribute to change.
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+The population is increased by the occurrence of births and decreased by the
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+occurrence of deaths. There are different reasons for mortality, including the
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+natural aging process or the development of other diseases. To omit this factor
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+of complexity, the model assumes the size $N$ of the population remains constant
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+throughout the duration of the epidemic. The population $N$ is comprised of
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+three distinct groups: the \emph{susceptible} group $S$, the \emph{infectious}
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+group $I$ and the \emph{removed} group $R$ (hence SIR Model). For $S$, $I$, $R$
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+and $N$ applies:
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\begin{equation}
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\begin{equation}
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N = S + I + R.
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N = S + I + R.
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\end{equation}
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\end{equation}
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-The model makes another assumption by stating that
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-recovered people are immune to the illness and infectious individual can not
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-infect them. The individuals in the $R$ group are either recovered and dead,
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-which both cannot carry the disease anymore. As visualized in the
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-Figure~\ref{fig:sir_model} the individuals can traverse from one group to
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-another on the bases of rates. The transmission rate $\beta$ is responsible for
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-people being infected, while the rate of removal or recovery rate $\alpha$
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-(in literature also $\delta$ or $\nu$) moves people from $I$ to $R$.
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+The model makes another assumption by stating that recovered people are immune
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+to the illness and infectious individual can not infect them. The individuals in
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+the $R$ group are either recovered or deceased, and thus unable to transmit or
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+carry the disease.
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\begin{figure}[h]
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\begin{figure}[h]
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\centering
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\centering
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\includegraphics[scale=0.3]{sir_graph.png}
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\includegraphics[scale=0.3]{sir_graph.png}
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\caption{SIR Model}
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\caption{SIR Model}
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\label{fig:sir_model}
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\label{fig:sir_model}
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\end{figure}
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\end{figure}
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+As visualized in the Figure~\ref{fig:sir_model} the
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+individuals may transition between groups based on rates. The transmission rate
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+$\beta$ is responsible for individuals becoming infected, while the rate of
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+removal or recovery rate $\alpha$ (also referred to as $\delta$ or $\nu$ in the
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+literature) moves individuals from $I$ to $R$.\\
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+
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+Having established all components of the model, all that is left is to describe
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+the relations using mathematical modelling specifically employing a system of
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+differential equations as mentioned in Section~\ref{sec:differentialEq}. To be
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+capable to create this system another assumption is made: ``The rate of
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+transmission of a microparasitic disease is proportional to the rate of
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+encounter of susceptible and infective individuals modelled by the product
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+($\beta S I$)''~\cite{EdelsteinKeshet2005}. The system of differential equations
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+by Kermack and McKendrick is thus
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+\begin{equation}
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+ \begin{split}
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+ \frac{dS}{dt} &= -\beta S I,\\
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+ \frac{dI}{dt} &= \beta S I - \alpha I,\\
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+ \frac{dR}{dt} &= \alpha I.
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+ \end{split}
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+\end{equation}
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+The system shows the change of size of the groups per day due to infections,
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+recoveries, and deaths.
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\begin{figure}
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\begin{figure}
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\centering
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\centering
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Phillip Rothenbeck