An example are the anomalies in abelian and non-abelian gauge quantum field theories.
For example, the abelian anomaly is $\tilde {F}_{\mu\nu}F^{\mu\nu}$ and the integral over this quantity is a topological invariant which measures a topological characteristic of the gauge field $A_\mu$.
All such quantities can be rewritten as total derivatives and then, using Gauss' law transformed into a surface integral.
What is the intuitive reason that quantities which describe topological properties can always be written as surface integrals?
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