Analytical regularization

Analytical regularization proceeds as follows. First, the boundary value problem is formulated as an integral equation. Written as an operator equation, this will take the form

${\displaystyle GX=Y}$

with ${\displaystyle Y}$ representing boundary conditions and inhomogeneities, ${\displaystyle X}$ representing the field of interest, and ${\displaystyle G}$ the integral operator describing how Y is given from X based on the physics of the problem. Next, ${\displaystyle G}$ is split into ${\displaystyle G_{1}+G_{2}}$, where ${\displaystyle G_{1}}$ is invertible and contains all the singularities of ${\displaystyle G}$ and ${\displaystyle G_{2}}$ is regular. After splitting the operator and multiplying by the inverse of ${\displaystyle G_{1}}$, the equation becomes

${\displaystyle X+G_{1}^{-1}G_{2}X=G_{1}^{-1}Y}$

or

${\displaystyle X+AX=B}$

which is now a Fredholm equation of the second type because by construction ${\displaystyle A}$ is compact on the Hilbert space of which ${\displaystyle B}$ is a member.

In general, several choices for ${\displaystyle \mathbf {G} _{1}}$ will be possible for each problem.[1]

• Santos, F C; Tort, A C; Elizalde, E (10 May 2006). "Analytical regularization for confined quantum fields between parallel surfaces". Journal of Physics A: Mathematical and General. IOP Publishing. 39 (21): 6725–6732. arXiv:quant-ph/0511230. doi:10.1088/0305-4470/39/21/s73. ISSN 0305-4470.
• Panin, Sergey B.; Smith, Paul D.; Vinogradova, Elena D.; Tuchkin, Yury A.; Vinogradov, Sergey S. (5 January 2009). "Regularization of the Dirichlet Problem for Laplace's Equation: Surfaces of Revolution". Electromagnetics. Informa UK Limited. 29 (1): 53–76. doi:10.1080/02726340802529775. ISSN 0272-6343.
• Kleinert, H.; Schulte-Frohlinde, V. (2001), Critical Properties of φ⁴-Theories, pp. 1–474, ISBN 978-981-02-4659-4, archived from the original on 2008-02-26, retrieved 2011-02-24, Paperpack ISBN 978-981-02-4659-4 (also available online). Read Chapter 8 for Analytic Regularization.

• E-Polarized Wave Scattering from Infinitely Thin and Finitely Width Strip Systems
• Tuchkin, Yu. A. "Analytical Regularization Method for Wave Diffraction by Bowl-Shaped Screen of Revolution". Ultra-Wideband, Short-Pulse Electromagnetics 5. Boston: Kluwer Academic Publishers. pp. 153–157. doi:10.1007/0-306-47948-6_18. ISBN 0-306-47338-0.