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Zeta-function method for regularization

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2020 Mathematics Subject Classification: Primary: 11M Secondary: 58G [MSN][ZBL]


zeta-function regularization

Regularization and renormalization procedures are essential issues in contemporary physics — without which it would simply not exist, at least in the form known today (2000). They are also essential in supersymmetry calculations. Among the different methods, zeta-function regularization — which is obtained by analytic continuation in the complex plane of the zeta-function of the relevant physical operator in each case — might well be the most beautiful of all. Use of this method yields, for instance, the vacuum energy corresponding to a quantum physical system (with constraints of any kind, in principle). Assuming the corresponding Hamiltonian operator, $H$, has a spectral decomposition of the form (think, as simplest case, of a quantum harmonic oscillator): $\{\def\l{\lambda}\l_i,\phi_i\}_{i\in I}$, with $I$ some set of indices (which can be discrete, continuous, mixed, multiple, etc.), then the quantum vacuum energy is obtained as follows [ElOdRoByZe], [El2]:

$\def\phi{\varphi}$ $$\sum_{i\in I}(\phi_i,H\phi_i) = {\rm tr}\; H = \sum_{i\in I}\l_i = \sum_{i\in I}\l_i^{-s}\Big|_{s=-1} = \zeta_H(-1), $$


where $\zeta_H$ is the zeta-function corresponding to the operator $H$. The formal sum over the eigenvalues is usually ill-defined, and the last step involves analytic continuation, inherent to the definition of the zeta-function itself. These mathematically simple-looking relations involve very deep physical concepts (no wonder that understanding them took several decades in the recent history of quantum field theory, QFT). The zeta-function method is unchallenged at the one-loop level, where it is rigorously defined and where many calculations of QFT reduce basically (from a mathematical point of view) to the computation of determinants of elliptic pseudo-differential operators ($\Psi$DOs, cf. also Pseudo-differential operator) [El]. It is thus no surprise that the preferred definition of the determinant for such operators is obtained through the corresponding zeta-function.

When one comes to specific calculations, the zeta-function regularization method relies on the existence of simple formulas for obtaining the analytic continuation above. These consist of the reflection formula of the corresponding zeta-function in each case, together with some other fundamental expressions, as the Jacobi theta-function identity, Poisson's resummation formula and the famous Chowla–Selberg formula [El]. However, some of these formulas are restricted to very specific zeta-functions, and it often turned out that for some physically important cases the corresponding formulas did not exist in the literature. This has required a painful process (it has taken over a decade already) of generalization of previous results and derivation of new expressions of this kind [ElOdRoByZe], [El2]. [ByCoVaZe].

References

[ByCoVaZe] A.A. Bytsenko, G. Cognola, L. Vanzo, S. Zerbini, "Quantum fields and extended objects in space-times with constant curvature spatial section" Phys. Rept., 266 (1996) pp. 1–126
[El] E. Elizalde, "Multidimensional extension of the generalized Chowla–Selberg formula" Commun. Math. Phys., 198 (1998) pp. 83–95 MR1657369
[El2] E. Elizalde, "Ten physical applications of spectral zeta functions", Springer (1995) MR1448403
[ElOdRoByZe] E. Elizalde, S.D. Odintsov, A. Romeo, A.A. Bytsenko, S. Zerbini, "Zeta regularization techniques with applications", World Sci. (1994) MR1346490
[Ha] S.W. Hawking, "Zeta function regularization of path integrals in curved space time" Commun. Math. Phys., 55 (1977) pp. 133–148 MR0524257
[Na] M. Nakahara, "Geometry, topology, and physics", Inst. Phys. (1995) pp. 7–8
How to Cite This Entry:
Zeta-function method for regularization. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Zeta-function_method_for_regularization&oldid=30442
This article was adapted from an original article by E. Elizalde (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article