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Auteurs principaux: Gaio, L. M., Rizzuti, B. F.
Format: Preprint
Publié: 2022
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Accès en ligne:https://arxiv.org/abs/2205.15408
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author Gaio, L. M.
Rizzuti, B. F.
author_facet Gaio, L. M.
Rizzuti, B. F.
contents Category theory plays a special character in mathematics - it unifies distinct branches under the same formalism. Despite this integrative power in math, it also seems to provide the proper foundations to the experimental physicist. In this work, we present another application of category in physics, related to the principle of relativity. The operational construction of (inertial) frames of reference indicates that only the movement between one and another frame is enough to differentiate both of them. This fact is hidden when one applies only group theory to connect frames. In fact, rotations and translations only change coordinates, keeping the frame inert. The change of frames is only attainable by boosts in the classical and relativistic regimes for both Galileo and Lorentz (Poincaré) groups. Besides providing a non-trivial example of application of category theory in physics, we also fulfill the presented gap when one directly applies group theory for connecting frames.
format Preprint
id arxiv_https___arxiv_org_abs_2205_15408
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle A Categorical View on the Principle of Relativity
Gaio, L. M.
Rizzuti, B. F.
Mathematical Physics
83A05, 18B99
Category theory plays a special character in mathematics - it unifies distinct branches under the same formalism. Despite this integrative power in math, it also seems to provide the proper foundations to the experimental physicist. In this work, we present another application of category in physics, related to the principle of relativity. The operational construction of (inertial) frames of reference indicates that only the movement between one and another frame is enough to differentiate both of them. This fact is hidden when one applies only group theory to connect frames. In fact, rotations and translations only change coordinates, keeping the frame inert. The change of frames is only attainable by boosts in the classical and relativistic regimes for both Galileo and Lorentz (Poincaré) groups. Besides providing a non-trivial example of application of category theory in physics, we also fulfill the presented gap when one directly applies group theory for connecting frames.
title A Categorical View on the Principle of Relativity
topic Mathematical Physics
83A05, 18B99
url https://arxiv.org/abs/2205.15408