=Paper=
{{Paper
|id=Vol-1490/paper20
|storemode=property
|title=Spectrum of spatial frequency of terahertz vortex Bessel beams formed using phase plates with spiral zones
|pdfUrl=https://ceur-ws.org/Vol-1490/paper20.pdf
|volume=Vol-1490
}}
==Spectrum of spatial frequency of terahertz vortex Bessel beams formed using phase plates with spiral zones==
https://ceur-ws.org/Vol-1490/paper20.pdf
Computer Optics and Nanophotonics
Spectrum of spatial frequency of terahertz vortex Bessel
beams formed using phase plates with spiral zones
Zhabin V.N.,
Novosibirsk State University
Volodkin B.O.,
Samara State Aerospace University
Knyazev B.A.,
Budker Institute of Nuclear Physics & Novosibirsk State University
Mitkov M.S.,
Budker Institute of Nuclear Physics
Pavelyev V.S.,
Samara State Aerospace University,
Image Processing Systems Institute, Russian Academy of Sciences
Choporova Yu.Yu.
Budker Institute of Nuclear Physics & Novosibirsk State University
Abstract. This paper presents the first numerical and experimental
investigation into the angular spectrum of terahertz Bessel beam with orbital
angular momentum generated by a phase plate with spiral zones. The plate was
exposed to a Gaussian beam of the Novosibirsk free electron laser. The Bessel
beam formed was passed through a collecting lens. The distribution of the
intensity of radiation with a wavelength of 141 microns before and after the
focusing lens was recorded by a microbolometer array, which was moved along
the optical axis by a motorized translation stage. The experimentally measured
intensity distributions over the beam cross section recorded along the optical
axis are in good agreement with numerical calculations.
Keywords: terahertz Bessel beam, free electron laser, phase plate with spiral
zones
Citation: Zhabin V.N., Volodkin B.O., Knyazev B.A., Mitkov M.S., Pavelyev
V.S., Choporova Yu.Yu. Spectrum of spatial frequency of terahertz vortex
Bessel beams formed using phase plates with spiral zones. Proceedings of
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�Computer Optics and Nanophotonics Zhabin V.N., Volodkin B.O., Knyazev B.A., Mitkov...
Information Technology and Nanotechnology (ITNT-2015), CEUR Workshop
Proceedings, 2015; 1490: 171-178. DOI: 10.18287/1613-0073-2015-1490-171-
178
1. Introduction
A plane electromagnetic wave is characterized by polarization in addition to the
amplitude and wave vector. In a general case, an elliptical polarization can be split
into the right and left circular polarizations corresponding to spin angular momentum
(SAM) of the photon . If the angular dependence of the wave function is eil , the
photon has, in addition to the spin, the orbital angular momentum (OAM) l , where
l is any integer. Such beams have helical phase fronts with the number of intertwined
helices depending on the magnitude of l [1].
In this work we investigated vortex Bessel beams, which are described by the
following formula:
F (r, , z, t ) = J l ( r )eil e z eit .
ik z
(1)
where J l ( x) is the Bessel function of the first kind of the l th order, is the radial
component of the wave vector.
In this paper we investigated the angular spectrum of Bessel beam formed by a
phase diffractive element [2]. Actually, the spectrum is an expansion of the initial
wave into plane waves, which enables better understanding of the structure and
behavior of such beams. In particular, one can experimentally check whether a beam
is a Bessel one. From the mathematical point of view, the angular spectrum is the
Fourier transform. If done with a thin lens, it can be written as follows:
k l 1 il R k r
i e rJ l ( r ) J l ( )dr. (2)
f 0 f
where R is the radius of the lens aperture; f is the focal distance; and are the
polar coordinates in the focal plane. With an infinite lens aperture, the angular
distribution takes the form of a thin ring described with the following formula:
i l 1
eil ( 0 ),
f
where 0 = is the radius of the ring. In case of finite lens aperture, the main ring
k
smears, and there are a number of subordinate concentric rings near it.
2. Generation of Bessel beams
There are many ways to produce a vortex beam from a plane wave, e.g. with
diffractive elements, which are particularly suitable for the terahertz range. They can
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be forked diffraction gratings or a spiral Fresnel plate. The application of amplitude
spiral Fresnel plate to formation of beams with a spatial singularity was proposed in
[3]. The boundaries of the zones of the plate are described by the following formula:
1 kr 2
l = (n ) ,
2 2f
where l is the topological charge of the beam; f is the focal distance of the plate;
n = 0, 1, 2, If l = 0 , it is a conventional Fresnel zone plate.
The experiment was conducted with similar binary phase plates of 30 mm in
diameter produced by reactive ion etching [4] on a high-resistivity silicon wafer but
with a constant width of the zones, as shown in Fig. 1. The boundaries of the zones
are described by the following formula:
l
= r ln.
2
Fig. 1. – Phase plates with spiral zones to form beams with topological charge l = 1 (left)
and l = 2 (right); the charge sign changes when the plate is rotated through an angle of 180º
around the vertical axis. The phase shift between the black and the white areas is
Hereinafter this phase plate with spiral zones is referred to as a spiral phase plate
(SPP). It was confirmed experimentally (see below) that a plane wave incident on it
forms a Bessel beam. If l = 0 , it is a usual axicon.
The numerical modelling was performed in the approximation of the scalar
diffraction theory. In the Fresnel approximation the Kirchhoff integral yields an
expression of the following form:
eikz ik
E ( , ) exp ( x ) 2 ( y ) 2 d d.
i z S
E ( x, y) =
2 z
This integral is a two-dimensional convolution of two functions and can be expressed
using the Fourier transform,
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eikz
E ( x, y) = 2 F {F [ E ( x, y)] F [ w( x, y)]},
i z
ik
where w( x, y) = exp ( x 2 y 2 ) . This approach can significantly facilitate the
2z
numerical simulation of diffraction with the fast Fourier transform.
For numerical calculations it is necessary to turn from the continuous Fourier
transform to the discrete Fourier transform (DFT), which can be done in accordance
with the following formulas:
M 1N 1 2 i 2 i
mk
X mn = xkl e M
nl
e N ,
k =0 l =0
2 i 2 i
1 M 1 N 1
mk nl
xkl = X mn e M e N .
MN n =0 m =0
3. Modeling and experimental verification
Computer program Huygens for OS Windows on x86-64 processors was
designed for numerical simulation. The library FFTW was used to calculate fast
Fourier transform. We carried out the numerical simulation by a scheme
corresponding exactly to the experimental set-up shown in Fig. 2. The radiation
source was the Novosibirsk free electron laser [5]. In this experiment it was tuned to a
wavelength of 141 microns, the phase plates to generate beams with the topological
charge were calculated for.
Fig. 2. – Schematic of the experiment. SPP is spiral phase plate
A series of numerical simulations was carried out. In the first numerical
simulation, the diffraction of plane wave on a spiral phase plate was investigated, as
well as diffraction of ideal Bessel beam on a circular aperture, the radius of which
corresponded to the aperture of the plate. From the simulation results the
corresponding parameters of the Bessel beam were found. For example, it was found
that a plate with the index l = 2 is best matched by a Bessel beam with the radial
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parameter = 1.6 mm1 . Fig. 3 presents the respective images. Hereinafter, the
brightness corresponds to the intensity and the phase distribution is shown with color.
Fig. 3. – Comparison of plane wave diffraction on SPP (left) and Bessel beam diffraction on
aperture (right)
The second simulation modeled images of ideal Bessel beam of finite radius and
plane wave diffracted on a SPP in the Fourier plane of a converging lens with the
focal length f = 50 mm , which are shown at Fig. 4. A comparison with theoretical
data shows the images in the Fourier plane to be in qualitative agreement with the
theoretical predictions, i.e. there is a ring-shape spot. However, there is some
difference, i.e. the ring shape is distorted into a fragment of a number of spirals when
SPP was used. An analysis of distribution formed by a spiral phase plate is given in
[6, 7].
Fig. 4. – Images in Fourier plane of ideal Bessel beam (left), and plane wave diffracted on SPP
with l = 2 (right)
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In the real experiment, the spiral phase plates were exposed to a Gaussian beam
of the Novosibirsk free electron laser I : exp(2r 2 / w2 ) with w = 15.1 mm. The
radiation intensity distribution along the Bessel beam and in the area behind a TPX
lens with a focal length of 50 mm or 100 mm was recorded with a microbolometer
array (MBA) as a video at 20 frames per second. The MBA was moved along the
optical axis by a motorized translation stage 300 mm long. The size of the sensitive
elements (pixel) of the MBA was 51 51 m2 , which is three times as small as the
wavelength of the radiation used. The physical size of the matrix was
16.36 12.24 mm2 .
Then the experimental data were compared with the results of the numerical
simulation. The calculated and experimentally measured intensity distributions are
shown in Fig. 5. It is seen that the experiment and the numerical simulation yield a
difference from the ring-shaped image as a spiral fragment. There is a visible
substantial difference, the bright spot in the center of the image in the experiment,
which indicates that after passing through the SPP some radiation retains the initial
direction of the wave vector. As for the rest, the numerical simulation and the
experiment are in qualitative agreement, including the observation of spiral fragment
instead of ring as predicted by the theory for an ideal Bessel beam.
Fig. 5. – Distribution of radiation intensity in lens focal plane (inverted and gamma-corrected).
Left: images recorded with MBA. Right: results of numerical modeling for SPP with l = 1
(top) and l = 2 (bottom) with lens with f = 50 mm
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To explain the experimental results, we have carried out additional calculations
in which we varied the structure of the plates. The results are presented in Fig. 6. To
reveal weak higher-order angular spectrum components, we present images with a
low contrast = 0.15 ( = 0.10 for the amplitude plate). For both amplitude and
phase binary plates, spiral-like distorted angular distributions were obtained similar to
those shown in Fig. 5. For the plates with linearly growing phase within a zone
(kinoform phase plate), the angular distribution is a ring which has to be a perfect
Bessel beam. Technically valuable to investigate how the angular distribution
changes, if besides the binary plates to use multilevel ones. The last two pictures
clearly demonstrate that the three-level and four-level plates generate combination of
practically perfect Bessel beam with weak components of higher orders. The latter
can be easily removed using a simple system of optical filtering.
Fig. 6. – Distributions of radiation intensity in the lens focal plane ( f = 50 mm) for vortex
beams with l = 2 formed with the spiral plase plates of different structure
4. Conclusion
In summary, this study was the very first investigation into the angular
distribution of Bessel beam formed by a spiral phase plate in the terahertz frequencies
range, which showed good agreement between the results of computer simulation, the
theory and the results of the optical experiments. It is shown that perfect Bessel beam
can be achieved using multi-level phase spiral plates.
Acknowledgements
The experimental studies were supported by the Ministry of Education of the
Russian Federation and RFBR grant 15-02-06444. The DOEs were developed and
fabricated with the support of the Ministry of Education of the Russian Federation,
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including the program for enhancement of the competitiveness of SSAU for years
2013–2020, the State targets to universities and scientific organizations in the field of
scientific activity, project 1879 and RFBR grant 13-02-97007. The equipment for
investigating the characteristics of the DOEs was made with the support of Russian
Science Foundation grant 14-50-00080. The experiments were performed using the
equipment of the shared-equipment center "Siberian Center for Synchrotron and
Terahertz Radiation (SEC SCSTR)."
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