Zeta function (operator) - Alchetron, the free social encyclopedia

The zeta function of a mathematical operator O is a function defined as

ζ O ( s ) = tr O − s

for those values of s where this expression exists, and as an analytic continuation of this function for other values of s. Here "tr" denotes a functional trace.

The zeta function may also be expressible as a spectral zeta function in terms of the eigenvalues λ i of the operator O by

ζ O ( s ) = ∑ λ i λ i − s .

It is used in giving a rigorous definition to the functional determinant of an operator, which is given by

det O := e − ζ O ′ ( 0 ) .

The Minakshisundaram–Pleijel zeta function is an example, when the operator is the Laplacian of a compact Riemannian manifold.

One of the most important motivations for Arakelov theory is the zeta functions for operators with the method of heat kernels generalized algebro-geometrically.

References

Zeta function (operator) Wikipedia

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