TY - GEN
T1 - Dispersion analysis of periodic structures by solving corresponding excitation problems
AU - Eibert, Thomas
AU - Weitsch, Yvonne
AU - Chen, Huanlei
PY - 2011
Y1 - 2011
N2 - Dispersion analysis of periodic structures with complicated material distributions is conventionally performed by solving eigenproblems where a unit cell with periodic boundary conditions is appropriately discretized and an algebraic eigenproblem solver is applied to the resulting linear equation system. In this paper, the same discretization models are employed but the solution of an algebraic eigenproblem is avoided. In contrast, the equation system is solved for an appropriately designed excitation and the dispersion behaviour is obtained from the resonance behaviour of the solution. This solution procedure is often much more robust than algebraic eigenproblem solutions and provides for particular physical insight into the problems.
AB - Dispersion analysis of periodic structures with complicated material distributions is conventionally performed by solving eigenproblems where a unit cell with periodic boundary conditions is appropriately discretized and an algebraic eigenproblem solver is applied to the resulting linear equation system. In this paper, the same discretization models are employed but the solution of an algebraic eigenproblem is avoided. In contrast, the equation system is solved for an appropriately designed excitation and the dispersion behaviour is obtained from the resonance behaviour of the solution. This solution procedure is often much more robust than algebraic eigenproblem solutions and provides for particular physical insight into the problems.
UR - http://www.scopus.com/inward/record.url?scp=79957527184&partnerID=8YFLogxK
M3 - Conference contribution
AN - SCOPUS:79957527184
SN - 9783981266825
T3 - 2011 German Microwave Conference, GeMiC 2011 - Proceedings
BT - 2011 German Microwave Conference, GeMiC 2011 - Proceedings
T2 - 2011 German Microwave Conference, GeMiC 2011
Y2 - 14 March 2011 through 16 March 2011
ER -