Solution of Laplace Equation on Non Axially Symmetrical Volumes

Author

Punzo, V. ; Besio, S. ; Pittaluga, S. ; Trequattrini, A.

Volume

16

Issue

2

fYear

2006

fDate

6/1/2006 12:00:00 AM

Firstpage

1815

Lastpage

1818

Abstract

The homogeneity of the magnetic field plays a fundamental role in MRI. Standard shimming techniques of the magnetic field are usually applied on volumes such as spheres or (less frequently) on surfaces of revolution (oblate and prolate spheroids) and are based on well-known solutions of the Laplace equation. We present a complete mathematical formalism for the solution of the Laplace equation with Dirichlet conditions defined on a tri-axial ellipsoid through the transformation of the equation in ellipsoidal coordinates. The importance of the ellipsoid lies in the fact that this surface can be more easily conformed to most districts of the human body (e.g. extremities) and this is of interest for dedicated MRI systems

Keywords

Laplace equations; biomedical MRI; Dirichlet conditions; Gauss quadrature; Laplace equation; dedicated MRI systems; ellipsoidal coordinates; extremities; homogeneity; human body; magnetic field; mathematical formalism; nonaxially symmetrical volumes; oblate spheroids; prolate spheroids; standard shimming techniques; triaxial ellipsoid; Astrophysics; Ellipsoids; Extremities; Gaussian processes; Geodesy; Helium; Humans; Laplace equations; Magnetic fields; Magnetic resonance imaging; Ellipsoids; Gauss quadrature; Laplace equation;

fLanguage

English

Journal_Title

Applied Superconductivity, IEEE Transactions on

Publisher

ieee

ISSN

1051-8223

Type

jour

DOI

10.1109/TASC.2005.864858

Filename

1643216