Problem A.23- Immortal Property⇢ Commutativity in Normal Matrices Across Basis: Intro to QM Appendix

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This problem explores the fascinating phenomenon of commutativity preservation in normal matrices under basis transformations. We investigate how the unique properties of normal matrices, including Hermitian, skew-Hermitian, unitary, and symmetric matrices, contribute to their ability to maintain commutativity regardless of the chosen basis. The proof looks into the mathematical foundations of this "immortal property". By understanding the resilience of commutativity in normal matrices, we gain insights into the fundamental structure of linear transformations and their behavior in different coordinate systems.

• 𝙿𝚛𝚘𝚋𝚕𝚎𝚖 𝙱𝚛𝚎𝚊𝚔𝚍𝚘𝚠𝚗 𝚃𝚒𝚖𝚎 𝚂𝚝𝚊𝚖𝚙𝚜:
00:00 - Intro & Background.
00:17 - Problem Statement.
00:51 - Proof.
03:15 - Concluding Remarks.
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☞📚📖📓= Griffiths, David J., and Darrell F. Schroeter. “Appendix: Linear Algebra.” 𝘐𝘯𝘵𝘳𝘰𝘥𝘶𝘤𝘵𝘪𝘰𝘯 𝘵𝘰 𝘘𝘶𝘢𝘯𝘵𝘶𝘮 𝘔𝘦𝘤𝘩𝘢𝘯𝘪𝘤𝘴, 3rd ed., Cambridge University Press, 2018, pp. 464–485.

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Science is a phenomenal exploration of nature. We hope to hone our skills of problem solving by exposing ourselves to multiple contexts. In doing so, it can sometimes be challenging to see the connection between topics. I yearn to understand 𝙝𝙤𝙬 these aspects of physics, unite together. To accomplish this, I'll cover all of my old textbooks through QFT; the convergence point of the many modern scientists! These posts are very much in a "𝘯𝘰𝘵𝘦𝘴 𝘵𝘰 𝘴𝘦𝘭𝘧" style. 𝙈𝙮 𝙝𝙤𝙥𝙚 is that by sharing this exploration, I can help others navigate the beautiful world of mathematics & physics through problems and examples, connecting the mathematical tools to their physical ramifications.

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