"$MaterialParameter" 修訂間的差異

於 2018年8月6日 (一) 10:31 的修訂

Format

$MaterialParameter
 type_dis       N         ε_r,∞        μ_r          σ_E          σ_H
 par₁(1)    par₁(2)    par₁(3)    par₁(4)
 par₂(1)    par₂(2)    par₂(3)    par₂(4)
   .          .          .          .
   .          .          .          .
   .          .          .          .
 par_p(1)    par_p(2)    par_p(3)    par_p(4)
   .          .          .          .
   .          .          .          .
   .          .          .          .
 par_N(1)    par_N(2)    par_N(3)    par_N(4)                // where type_dis and N are integers, but the others are floating points.

Refer to Chap. 9 at p.353 - p.368.
type_dis means the type of dispersive model. N means the number of poles in this material. ε_r,∞ is the relative permittivity at infinite frequency, μ_r is relative permeability, σ_E is electric conductivity, and σ_H is equivalent magnetic loss, respectively.


Models	type_dis	par_p(1)	par_p(2)	par_p(3)	par_p(4)
non-dispersive	0	0	0	0	0
Debye	1	ε_s,p	ε_∞,p	τ_p	0
Lorentz	2	ε_s,p	ε_∞,p	ω_p	δ_p
Drude	3	ω_i	γ_p	0	0

$\varepsilon(\omega) = \varepsilon_\infty + \sum_{p=1}^P \chi_p(\omega)$

Debye model: $\chi_p(\omega) = \frac{(\varepsilon_{s,p}-\varepsilon_{\infty,p})}{1+j\omega\tau_p}$

Lorentz model: $\chi_p(\omega) = \frac{(\varepsilon_{s,p}-\varepsilon_{\infty,p})\omega_p^2}{\omega_p^2+2j\omega\delta_p-\omega^2}$

Drude model: $\chi_p(\omega) = -\frac{\omega_p^2}{\omega^2-j\omega\gamma_p}$

Example

$NumberofObject
 2
$MaterialParameter
 2 3 10 1 0 0
 10 7 1.2566e15 1e14
 10 7 2.5133e15 2e14
 10 7 3.7699e15 3e14

Related commands

Input file 1: $NumberofObject, $MaterialStructure

Input file 2: $Backgroundparameter

"$MaterialParameter" 修訂間的差異

於 2018年8月6日 (一) 10:31 的修訂

Format

Example

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