Invariants from classical field theory
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We introduce a method that generates invariant functions from perturbative classical field theories depending on external parameters. Applying our methods to several field theories such as abelian BF, Chern-Simons and 2-dimensional Yang-Mills theory, we obtain, respectively, the linking number for embedded submanifolds in compact varieties, the Gauss’ and the second Milnor’s invariant for links in S^3, and invariants under area-preserving diffeomorphisms for configurations of immersed planar curves.
💡 Research Summary
The paper proposes a general framework for extracting invariant functions from perturbative classical field theories that depend on external parameters. The authors start by augmenting a conventional classical action (S
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