Optimization of achromatic refractive beam shapers

Optimization of achromatic refractive beam shapers

SPIE Optics + Photonics, Dan Diego, August 10th-14th 2008
Optimization of achromatic refractive
laser beam shaping systems
Frank Wyrowski, Friedrich-Schiller University, Jena, Germany
Hagen Schimmel, LightTrans GmbH, Jena, Germany
Introduction
Reshaping of spatial coherent laser beams into intensity
distribution with high homogeneity.
Input field
Beam Shaper
Lens System
Output field
Introduction
Phase of output field is not specified and can be used as
design freedom.
Conditions for Achromatization
• Output intensity must be independent of
wavelength
•
typically wavelength dependent
– Single Lens
– Free Space
– Achromatic Lens System
•
typically wavelength dependent
Conditions for Achromatization
• Three different options for achromatization of
beam shaping systems:
– Achromatization of lens system and beam shaper
– Compensation of chromatic effects of beam shaper by
special design of lens system
– Compensation of chromatic effects of lens system by
special design of beam shaper
We consider third choice for the most compact
beam shaping situation.
Compact Beam Shaping Setup
Free Space
Angular dispersion
Must compensate angular dispersion
Must be chromatic = Multiplexing
Mapping Type Beam Shaper Elements
• Beam shaper locally deflect light to reshape laser beams.
• Local light deflection can be described by wave number
vector
• Local deflection directions
Input field
x
x‘
Desired
output field
Achromatization of Compact Setup
• Achromatization of local deflection directions:
• Wavelength dependency of k-components must
be identical.
• With
it follows condition on local
deflection according to
Diffractive Beam Shapers
Free Space
Light Deflection Diffractive Beam Shaper
• Local light deflection of diffractive beam shapers
can be described by grating equation.
• 2D Grating equation
• D local grating period, m diffraction order
cannot be satisfied
• Condition
Design of Diffractive Beam Shaper
• Different design methods published.
• We use a two step design process.
• Optimization of transmission function for one
wavelength λ1.
• Calculation of diffractive height profile from
transmission phase.
Monochromatic Design of Beam Shaper
• Height profile of diffractive beam shaper
• Maximum height
h
hmax
x
Example: Diffractive Beam Shaper
Far Field
Input field
Diffractive
Diameter 1 mm
beam shaper
Wavelength 540 nm
Output field
5° half angle
Chromatic Effects of Diffractive Beam Shapers
Signal to Noise Ration in dB
SNR of diffractive beam shaper depending on wavelength
50
45
40
35
30
25
20
15
10
5
450
500
550
Wavelength in nm
600
650
Refractive Beam Shapers
Free Space
Light Deflection Refractive Beam Shaper
• Local light deflection of refractive beam shapers
can be described by Eikonal equation.
• It follows for thin element approximation
Light Deflection Refractive Beam Shaper
• Eikonal equation for thin element approximation

• Condition for k to achromatize light deflection
direction α, β
• Fulfilled if
• Fulfilled if material would not have dispersion
Achromatization of Refractive Beam Shapers
• Important result: Angular dispersion is “naturally”
compensated if refractive beam shapers are used.
• Since material dispersion is weak refractive beam
shapers create output intensities with small
chromatic effects.
• Material dispersion is to be achromatized to
improve result.
• Compensation can be for example by using
different materials.
Achromatization of Refractive Beam Shapers
h1(x,y)
n0
h2(x,y)
n1
hl-1
…
hl
nl-1
nl
• Materials with different dispersion characteristics and
multiple surfaces can be used to compensate chromatic
effects.
• Light propagation is assumed to be described by Thin
Element Approximation.
Method A: Design for 2 Wavelengths
• Two step design process.
• Optimization of a beam shaper transmission function
per design wavelength for creation of same output.
Optimization can be done for example by IFTA.
• Calculation of several height profiles between
different materials creating different transmission
functions for the design wavelengths.
• Solve problem exactly for two design wavelenghts.
• Expect smooth behaviour between both wavelengths,
because of nature of refractive shapers.
Achromatization of Refractive Beam Shapers
• Equation system with Q equations
• Q design wavelengths and Q transmissions
• L surfaces and L+1 materials
Example: Refractive Beam Shaper
Far Field
Input field
Fused Silica
Diameter 1 mm
Wavelengths 630 nm
and 450 nm
Schott/LASF40
Desired Output
5° half angle
Surfaces Height Profile
Height profile 1
Height profile 2
Wavelengths Dependency of Beam Shapers
Signal to Noise Ration in dB
SNR of different beam shaping systems depending on wavelength
Diffractive Beam Shaper
Refractive Beam Shaper
Refractive Achromate 2 Design Wavelengths
60
55
50
45
40
35
30
25
20
15
10
5
450
500
550
Wavelength in nm
600
650
Method B: Compensation of Dispersion
• Two step design process.
• Optimization of transmission function for a
central design wavelength.
• Calculation of several height profiles between
different materials to create the desired
transmission and setting of phase derivative
proportional 1/λ.
• Summary:
– Exact solution for one wavelength
– Reduction of material dispersion for others
Method B: Compensation of Dispersion
• Calculation of phase for multiple surfaces and
materials by thin element approximation.
• It follows with
difference (OPD) of
an optical path
Method B: Compensation of Dispersion
• As derived for refractive beam shapers to achieve
an achromatization of
the condition
must be fulfilled.
• This means
Method B: Compensation of Dispersion
• The following equation system must be solved:
• To solve this system typically two surfaces and
three materials are required. Materials should be
a low index, a high index and a surrounding
material.
Example: Refractive Beam Shaper
Far Field
Input field
Fused Silica
Diameter 1 mm
Wavelengths 630 nm
and 450nm
Schott/LASF40
Desired Output
5° half angle
Surfaces Height Profile
Height profile 1
Height profile 2
Wavelengths Dependency Beam Shapers
Signal to Noise Ration in dB
SNR of different beam shaping systems depending on wavelength
60
Refractive Beam Shaper
Refractive Achromate 2 Design Wavelengths
Refractive Achromate Dispersion Compensation
55
50
45
40
35
30
450
500
550
Wavelength in nm
600
650
Multiplexing of Output Intensity
• The design principle allowing the creation of
different transmission functions for different
design wavelengths can be also used for
multiplexing of output intensity.
• Beam shaper transmission functions can be
calculated for different wavelengths that create
different output intensities in the target plane.
• Height profiles can be calculated from these
transmission functions.
Example – Wavelengths Multiplexing
Far Field
Input field
Fused Silica Schott/LASF40
Diameter 1 mm
Wavelength 630 nm
and 450 nm
Desired Output
5° half angle
Surfaces Height Profile
Height profile 1
Height profile 2
Wavelengths Sensitivity
Output intensity
450 nm
540 nm
630 nm
Summary
• Achromatization of beam shaping systems means
to generate within a wavelength range the same
output intensity.
• Achromatization of the output intensity requires
typically a wavelength multiplexing feature of the
beam shaping element.
• Refractive beam shapers allow such kind of
achromatization.
• Two different methods were shown for achromatization which provide different optimization
characteristics.