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@ -15,6 +15,10 @@ $0 = f^2(x(\theta),\theta)$,
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allowing one to find $x(\dot)$ as the solution to a minimization problem.
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By choosing a neural network as the functional approximation, we are able to
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use the fact that a NN with a single hidden layer can be used to approximate
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functions arbitrarily well
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under certain conditions\footnote{FIND REFERENCE, SEE MALIAR}.
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We can also
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take advantage of the significant computational and practical improvements
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currently revolutionizing Machine Learning.
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In particular, we can now use common frameworks, such as python, PyTorch,
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@ -22,7 +26,7 @@ and various online accerators (Google Colab)
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which have been optimized for relatively high performance and
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straightforward development.
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\subsubsection{Computational Plan}
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\subsection{Computational Plan}
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I have decided to use python and the PyTorch Neural Network library for this project.
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The most difficult step is creating the euler equations.
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@ -120,4 +124,17 @@ I am currently working on a plan to guarantee existence of solutions.
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Some of what I want to do is check numerically crucial values as well as
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examine the necessary Inada conditions.
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\subsection{Computational Results}
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Cases to consider
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\begin{itemize}
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\item Reproduce Rao Rondina model
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\item Reproduce Adilov, perfect competition, cornot-like market.
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\item Add military operators to Adilov's model.
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This will involve some sort of complementarities.
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\item Competitive market where the number of satellites improves quality, i.e. allows
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for pricing differences (Orbital Internet and comms).
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\item Interacting orbital shells, using a vector of debris.
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\end{itemize}
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\end{document}
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youainti
5 years ago