In differential geometry and mathematical physics (especially string theory), the Polyakov formula expresses the conformal variation of the zeta functional determinant of a Riemannian manifold.
Proposed by Alexander Markovich Polyakov this formula arose in the study of the quantum theory of strings.
The corresponding density is local, and therefore is a Riemannian curvature invariant.
In particular, whereas the functional determinant itself is prohibitively difficult to work with in general, its conformal variation can be written down explicitly.
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