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The straight line, the catenary, the brachistochrone, the circle, and Fermat

This paper shows that the well-known curve optimization problems which lead to the straight line, the catenary curve, the brachistochrone, and the circle, can all be handled using a unified formalism. Furthermore, from the general differential equation fulfilled by these geodesics, we can guess additional functions and the required metric. The parabola, for example, is a geodesic under a metric guessed in this way. Numerical solutions are found for the curves corresponding to geodesics in the various metrics using a ray-tracing approach based on Fermat's principle.

preprint2014arXivOpen access
Raul Rojas
math.HO
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Imported metadata coverageMissing code, dataset, citation and institution fields are tracked without dominating the paper.Details
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Raul Rojas

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