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Topology in Physics Mathematical Foundations and Applications in Quantum Systems
Abstract
Topology has converted to be an essential framework in contemporary physics concentrating on international assets and unceasing distortions instead of outmoded geometry. It has altered our views of quantum structures and reduced material through notions like berry segments and Chern statistics. This mathematical tactic is vital for amplification topological soundproofing and superconductors, leading for progressive significant machineries. The study also grounds itself in well-established Mathematical .by drawing on homeomorphism and the classification of manifolds. It uses the Gauss Bonnet theory to prove how local curvature, and global topological invariants are deeply connected.
Article information
Journal
Journal of Mathematics and Statistics Studies
Volume (Issue)
7 (5)
Pages
32-36
Published
Copyright
Copyright (c) 2026 https://creativecommons.org/licenses/by/4.0/
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This work is licensed under a Creative Commons Attribution 4.0 International License.

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