Analytical regularization explained

In physics and applied mathematics, analytical regularization is a technique used to convert boundary value problems which can be written as Fredholm integral equations of the first kind involving singular operators into equivalent Fredholm integral equations of the second kind. The latter may be easier to solve analytically and can be studied with discretization schemes like the finite element method or the finite difference method because they are pointwise convergent. In computational electromagnetics, it is known as the method of analytical regularization. It was first used in mathematics during the development of operator theory before acquiring a name.^[1]

Method

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

GX=Y

with

representing boundary conditions and inhomogeneities,

representing the field of interest, and

the integral operator describing how Y is given from X based on the physics of the problem. Next,

is split into

G₁+G₂

, where

G₁

is invertible and contains all the singularities of

and

G₂

is regular. After splitting the operator and multiplying by the inverse of

G₁

, the equation becomes

X+

	-1
G
	1

G₂X=

	-1
G
	1

X+AX=B

which is now a Fredholm equation of the second type because by construction

is compact on the Hilbert space of which

is a member.

In general, several choices for

G₁

will be possible for each problem.

References

Santos . F C . Tort . A C . Elizalde . E . Analytical regularization for confined quantum fields between parallel surfaces . Journal of Physics A: Mathematical and General . IOP Publishing . 39 . 21 . 10 May 2006 . 0305-4470 . 10.1088/0305-4470/39/21/s73 . 6725–6732. quant-ph/0511230 . 2006JPhA...39.6725S . 18855340 .
Panin . Sergey B. . Smith . Paul D. . Vinogradova . Elena D. . Tuchkin . Yury A. . Vinogradov . Sergey S. . Regularization of the Dirichlet Problem for Laplace's Equation: Surfaces of Revolution . Electromagnetics . Informa UK Limited . 29 . 1 . 5 January 2009 . 0272-6343 . 10.1080/02726340802529775 . 53–76. 121978722 .
, Paperpack (also available online). Read Chapter 8 for Analytic Regularization.

External links

E-Polarized Wave Scattering from Infinitely Thin and Finitely Width Strip Systems
Book: Tuchkin, Yu. A. . Ultra-Wideband, Short-Pulse Electromagnetics 5 . Analytical Regularization Method for Wave Diffraction by Bowl-Shaped Screen of Revolution . 2002 . Kluwer Academic Publishers . Boston . 0-306-47338-0 . 10.1007/0-306-47948-6_18 . 153–157.

Notes and References

Nosich . A.I. . The method of analytical regularization in wave-scattering and eigenvalue problems: foundations and review of solutions . IEEE Antennas and Propagation Magazine . Institute of Electrical and Electronics Engineers (IEEE) . 41 . 3 . 1999 . 1045-9243 . 10.1109/74.775246 . 34–49. 1999IAPM...41...34N .