Numerical methods for solving photonic crystal slabs

Numerical methods for solving photonic crystal slabs

Photonic crystal slabs: periodic structures of finite thickness IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Outline • Photonic crystal (PhC) slabs • Layered media (special case of PhC slabs) • Transfer and scattering matrices • Numerical stability of T and S-matrices • Fourier Modal Method (FMM) • Factorization rules • FMM examples • Nonrectangular unit cell • Scattering matrix for software combination • C method IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Layered stack (special case of PhC slabs) Goal: reflection, transmission, absorption, field distribution, dispersion diagrams IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Solution procedure: 4x4 • Solve Maxwell’s equation in each layer separately • Compute interface and layer transfer matrices • Assemble the matrix (S-matrix) which links the input amplitudes with output IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Maxwell’s equations in an individual layer: Maxwell’s equations in CGS units constitutive relations ε, μ are generally tensors IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Maxwell’s equations in an individual layer: Maxwell’s equations for curl operator 6 unknowns • All fields have time dependence • Look for a solution as a plane wave E,H~ , ky=0 • Eliminate Ez, Hz-components IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Maxwell’s equations in an individual layer: eigenvalue problem for kz 4x4 matrix IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Maxwell’s equations in an individual layer: 4 eigenvalues 4 eigenvectors For isotropic medium (μ, ε) – scalars: K+1=K+2=-K-3=-K-4 one can solve 2x2 matrices Solution of the Maxwell’s equations in a layer IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Transfer matrix: links the amplitudes at z1 and z2 z1 z2 tij are 2x2 block matrices IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Interface and layer matrices: layer transfer matrix through the layer dp interface transfer matrix total transfer matrix of the structure IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Transfer matrix is numerically unstable: Reason: loss of precision when adding/subtracting big and small numbers The error grows with the increase of the layer thicknesses S-matrix or R-matrix algorithms are numerically stable IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

S-matrix recursive algorithm: initial condition recursive formula If a layer of thickness L is added no mixing of small and large exponents Tikhodeev et al. 2002 IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Transfer and Scattering matrices: T-matrix fails with absorptive materials 4 periods of slabs: IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography 14

Example: dual band omnidirectional mirror N=14 layers IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Fourier modal method (FMM): some layers have 1D or 2D periodicity ε(x,y), μ=1 • Solve Maxwell’s equation in each layer separately (by Floquet-Fourier decomposition) • Compute interface and layer transfer matrices • Assemble the matrix (S-matrix) which links the input amplitudes with output IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Maxwell’s equation in an individual layer T. Weiss, Master's thesis, 4th Physics Institute University of Stuttgart (2008). IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Periodic layer: periodic function Ng=(2gx,max+1)(2gy,max+1) – truncation order decomposition of permittivity function IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Periodic layer: 2Ng eigenvalues • Compute interface and layer transfer matrices • Assemble the matrix (S-matrix) which links the input amplitudes with output 19 IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Plane wave convention and space discretization Single frequency analysis removes time from equations Rectangular discretization is proved to be better

Toeplitz matrix For the sake of simplicity we assume a permeability to be constant Fourier transform of functions multiplication Function “g” will be represented by vector and function “f” by Toeplitz matrix Derivatives are represented by diagonal matrices

Factorization rules Diploma thesis: Thomas Weiss (University of Stuttgart) (2008) L. Li, J. Opt. Soc. Am. A 13, 1870 (1996) It often happens that functions “g” and “h” have complementary jumps at certain points

Factorization rules From a continuity of functions E_z, D_x and D_y one can derive:

Factorization rules Factorization in x and y directions

FMM simulations The accuracy depends on a number of modes and layers

FMM simulations Simulation of nanowires array

Non-rectangular grid L. Li, J. Opt. Soc. Am. A, Vol. 14, No. 10 (1997) For some cases non-rectangular unit cell is the one with a smallest area Fourier decomposition in corresponding coordinates

Non-rectangular grid Co- and contravariant coordinates Incident light

Non-rectangular grid Modes in photonic crystal Field equations

Non-rectangular grid Matrix representation

Non-rectangular grid Material-matrix assembly • Order the modes • Modes normalization on a field magnitude • Discretization is made for x and y components but modes are TE and TM • For non-rectangular grid covariant components are used

Scattering matrix and software combinations CST-studio suite FEM solver The same structure with FEM and FMM

Scattering matrix and software combinations Connection between software • Order of modes should be the same • Modes normalization on the same field magnitude • Phase of modes depend on the normalization FEM-FMM combination • FEM is more suitable for complex geometries • FEM is volume dependable • FMM is good for rectangular geometries • FMM does not depend on layers thickness

Scattering matrix and software combinations

Scattering matrix and software combinations Ray tracing technique • Matrix with embedded photonic elements • Coupling wave with geometrical optics • Could be used for structures too big for wave analysis • Embedded photonic structures could have various shapes

Scattering matrix and software combinations Numerical optimization Evolutionary strategy

Mirror optimization The optimizer found a configuration with 3 Bragg reflectors

Methods for solving diffraction gratings Departement/Institut/Gruppe

C method: curved coordinates Multilayer approximation in FMM Introduce new coordinates No multilayer approximation, matching of boundary conditions is easy! Li et al. 1999 “Rigorous and efficient grating-analysis method made easy for optical engineers” IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

C method: curved coordinates IFH - Electromagnetic Field Theory Group and Laboratory of Crystallography

Numerical methods for solving photonic crystal slabs

Numerical methods for solving photonic crystal slabs

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