Title :
Optical waveguide modes: an approximate solution using Galerkin´s method with Hermite-Gauss basis functions
Author :
Gallawa, Robert L. ; Goyal, I.C. ; Tu, Yinggang ; Ghatak, Ajoy K.
Author_Institution :
Nat. Inst. of Stand. & Technol., Boulder, CO, USA
fDate :
3/1/1991 12:00:00 AM
Abstract :
In Galerkin´s method, an orthogonal set of functions is used to convert a differential equation into a set of simultaneous linear equations. The authors choose the Hermite-Gauss functions as the set of orthogonal basis functions to solve the eigenvalue problem based on the two-dimensional scalar-wave equation subject to the radiation boundary conditions at infinity. The method gives an accurate prediction of modal propagation constant and of the field distribution. The method is tested by using the step-index optical fiber, which has a known exact solution, and the truncated parabolic profile fiber, which has a known exact solution. The authors also test the method using square and elliptic core fibers. The method is found to agree with known results
Keywords :
approximation theory; eigenvalues and eigenfunctions; optical fibres; optical waveguide theory; 2D scalar-wave equation; Galerkin´s method; Hermite-Gauss basis functions; approximate solution; differential equation; eigenvalue problem; elliptic core fibers; field distribution; modal propagation constant; orthogonal basis functions; orthogonal set; radiation boundary conditions; simultaneous linear equations; square core fibres; step-index optical fiber; truncated parabolic profile fiber; Boundary conditions; Eigenvalues and eigenfunctions; Electromagnetic waveguides; H infinity control; Moment methods; Optical fiber testing; Optical fibers; Optical waveguides; Physics; Rectangular waveguides;
Journal_Title :
Quantum Electronics, IEEE Journal of
