- Source: Distributed Bragg reflector
A distributed Bragg reflector (DBR) is a reflector used in waveguides, such as optical fibers. It is a structure formed from multiple layers of alternating materials with different refractive index, or by periodic variation of some characteristic (such as height) of a dielectric waveguide, resulting in periodic variation in the effective refractive index in the guide. Each layer boundary causes a partial reflection and refraction of an optical wave. For waves whose vacuum wavelength is close to four times the optical thickness of the layers, the interaction between these beams generates constructive interference, and the layers act as a high-quality reflector. The range of wavelengths that are reflected is called the photonic stopband. Within this range of wavelengths, light is "forbidden" to propagate in the structure.
Reflectivity
The DBR's reflectivity,
R
{\displaystyle R}
, for intensity is approximately given by
R
=
[
n
o
(
n
2
)
2
N
−
n
s
(
n
1
)
2
N
n
o
(
n
2
)
2
N
+
n
s
(
n
1
)
2
N
]
2
,
{\displaystyle R=\left[{\frac {n_{o}(n_{2})^{2N}-n_{s}(n_{1})^{2N}}{n_{o}(n_{2})^{2N}+n_{s}(n_{1})^{2N}}}\right]^{2},}
where
n
o
,
n
1
,
n
2
{\displaystyle n_{o},\ n_{1},\ n_{2}}
and
n
s
{\displaystyle n_{s}\,}
are the respective refractive indices of the originating medium, the two alternating materials, and the terminating medium (i.e. backing or substrate); and
N
{\displaystyle N}
is the number of repeated pairs of low/high refractive index material. This formula assumes the repeated pairs all have a quarter-wave thickness (that is
n
d
=
λ
/
4
{\displaystyle nd=\lambda /4}
, where
n
{\displaystyle n}
is the refractive index of the layer,
d
{\displaystyle d}
is the thickness of the layer, and
λ
{\displaystyle \lambda }
is the wavelength of the light).
The frequency bandwidth
Δ
f
0
{\displaystyle \Delta f_{0}}
of the photonic stop-band can be calculated by
Δ
f
0
f
0
=
4
π
arcsin
(
n
2
−
n
1
n
2
+
n
1
)
,
{\displaystyle {\frac {\Delta f_{0}}{f_{0}}}={\frac {4}{\pi }}\arcsin \left({\frac {n_{2}-n_{1}}{n_{2}+n_{1}}}\right),}
where
f
o
{\displaystyle f_{o}}
is the central frequency of the band. This configuration gives the largest possible ratio
Δ
f
0
f
0
{\displaystyle {\frac {\Delta f_{0}}{f_{0}}}}
that can be achieved with these two values of the refractive index.
Increasing the number of pairs in a DBR increases the mirror reflectivity and increasing the refractive index contrast between the materials in the Bragg pairs increases both the reflectivity and the bandwidth. A common choice of materials for the stack is titanium dioxide (n ≈ 2.5) and silica (n ≈ 1.5). Substituting into the formula above gives a bandwidth of about 200 nm for 630 nm light.
Distributed Bragg reflectors are critical components in vertical cavity surface emitting lasers and other types of narrow-linewidth laser diodes such as distributed feedback (DFB) lasers and distributed bragg reflector (DBR) lasers. They are also used to form the cavity resonator (or optical cavity) in fiber lasers and free electron lasers.
= TE and TM mode reflectivity
=This section discusses the interaction of transverse electric (TE)
and transverse magnetic (TM) polarized light with the DBR structure, over several
wavelengths and incidence angles. This reflectivity of the DBR structure (described below)
was calculated using the transfer-matrix method (TMM), where
the TE mode alone is highly reflected by this stack, while the TM modes are passed
through. This also shows the DBR acting as a polarizer.
For TE and TM incidence we have the reflection spectra of a DBR stack, corresponding
to a 6 layer stack of dielectric contrast of 11.5, between an air and dielectric layers.
The thicknesses of the air and dielectric layers are 0.8 and 0.2 of the period, respectively.
The wavelength in the figures below, corresponds to multiples of the cell period.
This DBR is also a simple example of a 1D photonic crystal. It has a complete TE band gap, but only a pseudo TM band gap.
Bio-inspired Bragg reflectors
Bio-inspired Bragg reflectors are 1D photonic crystals inspired by nature. Reflection of light from such a nanostructured matter results in structural colouration. When designed from mesoporous metal-oxides or polymers, these devices can be used as low-cost vapor/solvents sensors. For example, colour of this porous multi-layered structures will change when the matter filling up the pores is replaced by another, e.g. replacing air with water.
See also
Bragg's law – Physical law regarding scattering angles of radiation through a medium
Bragg diffraction – Physical law regarding scattering angles of radiation through a mediumPages displaying short descriptions of redirect targets
Diffraction – Phenomenon of the motion of waves
Diffraction grating – Optical component which splits light into several beams
Dielectric mirror – Mirror made of dielectric materials
Fabry–Pérot interferometer – Optical device with parallel mirrors
Fiber Bragg grating – Type of distributed Bragg reflector constructed in a short segment of optical fiber
Photonic-crystal fiber – Class of optical fiber based on the properties of photonic crystals
Vertical-cavity surface-emitting laser – Type of semiconductor laser diode
Photonic crystal sensor
References
Kata Kunci Pencarian:
- Distributed Bragg reflector
- Distributed Bragg reflector laser
- Fiber Bragg grating
- Laser diode
- Bragg's law
- Distributed-feedback laser
- Photonic integrated circuit
- Tunable laser
- Volume hologram
- Dielectric mirror
