Title :
On DPT representations of solutions to the Helmholtz equation in a convex N-gon
Author :
Chumachenko, V.P.
Author_Institution :
Dept. of Higher Math., Zaporizhzhya Nat. Tech. Univ., Zaporizhzhya, Ukraine
Abstract :
The conditions of linear independence of systems of functions which arise in the framework of the domain-product technique (DPT) to expand the sought-for function within a convex N - gon when solving boundary-value problems for the 2D Helmholtz equation are discussed. It is established that linear dependence appears for at most countable set of values of the spectral parameter. Outside this set and resonant sets of auxiliary domains the expansions unambiguously represent the solution provided it exists and is unique.
Keywords :
Helmholtz equations; boundary-value problems; spectral-domain analysis; waveguide theory; DPT representation; Helmholtz equation; auxiliary domain resonant set; boundary-value problem; convex n-gon; convex polygon; domain-product technique; guided wave theory; linearly independent system; spectral parameter; Electromagnetic waveguides; Electromagnetics; Equations; Vectors; Waveguide junctions; Helmholtz equation; Linearly independent systems; convex polygon;
Conference_Titel :
Mathematical Methods in Electromagnetic Theory (MMET), 2014 International Conference on
Conference_Location :
Dnipropetrovsk
Print_ISBN :
978-1-4799-6863-3
DOI :
10.1109/MMET.2014.6928711
