Measurements regarding main laser beam parameters during laser cutting.
Chetreanu Don, Camil Octav ; Popa, Marcel Sabin ; Tirla, Andrei 等
1. INTRODUCTION
The aim of the research is to obtain results regarding some
parameters that define the quality and the characteristics of the laser
beam in order determine if raising the laser power changes the geometry
of the laser beam.
The combination of processing depth and productivity requirements
are the main factors in determining the laser power required (Ion,
2005). Regarding the laser beam the most common ways to quantify the
beam quality are:
--the beam parameter product (BPP), i.e., the product of beam
radius at the beam waist with the far-field beam divergence angle
--the [M.sup.2] factor, defined as the beam parameter product
divided by the corresponding product for a diffraction-limited Gaussian
beam with the same wavelength (Paschotta, 2004).
In any optical system, there is a limit, termed diffraction limit,
which determines the minimum focal area and hence the maximum irradiance that can be attained (Ready, 2001). ISO 11146-2:2005 specifies methods
for measuring beam widths (diameter), divergence angles and beam
propagation ratios of laser beams. The calculation of the beam quality
according to ISO Standard 11146 is represented:
[FIGURE 1 OMITTED]
According to ISO Standard 11146, the beam quality factor [M.sup.2]
can be calculated with a fitting procedure, applied to the measured
evolution of the beam radius along the propagation direction (the
so-called caustic).
2. EQUIPMENT
2.1 Laserscope UFF 100
The Laserscope UFF 100 is a diagnostic tool for measuring and
monitoring of laser systems with high performance for the material
processing. For a better Quality performance an optimal and constant
adjustment of the steel laser parameters, radius focus, focus position,
power distribution is of big importance. It is possible to measure
values to power densities of about [10.sup.7] W/[cm.sup.2] and up to 25
kW outputs in focus. That is why you can establish and verify the
optimal laser parameters for the task.
2.2 Bistronic ByVention 3015
Bistronic ByVention 3015 is a laser cutting system in 2 and a half
axis. It has a C[O.sub.2] laser source with a power up to 2200 W and a
pulse frequency from 1 Hz to 2500 Hz. The machine is designed to cut
metal sheets up to 8 mm for mild steel, 6 mm for stainless steel and 4
mm for aluminum. The Frame of the machine is build of polymeric
concrete. This material has been proved to be very efficient for the
construction of high precision machines because of its damping
capacities and its very low thermal influential. The C[O.sub.2] laser is
today the most important material processing laser in the industry
(Hugel, 1992). For optimal cutting the beam quality must be a suitable
combination of a small waist radius and a sufficiently long Rayleigh
length (Poprawe, 2005).
3. FOCUSED LASER BEAM MEASUREMENTS
3.1 Measurements at 1800W
The range of the caustic is cca. 12 mm. In function of the X axis
is the waist radius [w.sub.0] ([w.sub.x]) = 0.13 mm, the Rayleigh length
[z.sub.R] ([w.sub.x]) = 1.6 mm. The beam propagation factor K
([w.sub.x]) = 0.3 and the diffraction factor [M.sup.2] ([w.sub.x]) =
3.4.
In function of the Y axis is the waist radius [w.sub.0]([w.sub.y])
= 0.11 mm, the Rayleigh length [Z.sub.R] ([w.sub.y]) = 1.4 mm. The beam
propagation factor K ([w.sub.y]) = 0.4 and the diffraction factor
[M.sup.2] ([w.sub.y]) = 2.8
[FIGURE 2 OMITTED]
In function of w is the waist radius [w.sub.0](w) = 0.12 mm, the
Rayleigh length [z.sub.R](w) = 1.5. The beam propagation factor K (w) =
0.3 and the diffraction factor [M.sup.2] (w) =3.0.
[FIGURE 3 OMITTED]
3.2 Measurements at 2000 W
The range of the caustic is cca. 14 mm. In function of the X axis
is the waist radius [w.sub.0] ([w.sub.x]) = 0.13 mm, the Rayleigh length
[z.sub.R] ([w.sub.x]) = 1.7 mm. The beam propagation factor K
([w.sub.x])=0.3 and the diffraction factor [M.sup.2]([w.sub.x]) = 3.4.
[FIGURE 4 OMITTED]
In function of the Y axis is the waist radius [w.sub.0]([w.sub.y])
= 0.11 mm, the Rayleigh length [Z.sub.R] ([w.sub.y]) = 1.5 mm. The beam
propagation factor K ([w.sub.y]) = 0.4 and the diffraction factor
[M.sup.2] ([w.sub.y]) = 2.7.
In function of w is the waist radius [w.sub.0](w) = 0.12 mm, the
Rayleigh length [z.sub.R](w) = 1.5. The beam propagation factor K (w) =
0.3 and the diffraction factor [M.sup.2] (w) =3.0.
[FIGURE 5 OMITTED]
3.3 Measurements at 2200 W
The range of the caustic is cca. 10 mm. In function of X axis is
the waist radius w0 ([w.sub.x]) = 0.13 mm, the Rayleigh length [z.sub.R]
([w.sub.x]) = 1.7 mm. The beam propagation factor K ([w.sub.x]) = 0.3
and the diffraction factor [M.sup.2]([w.sub.x])=3.4.
[FIGURE 6 OMITTED]
In function of Y is the waist radius [w.sub.0]([w.sub.y]) = 0.11
mm, the Rayleigh length [Z.sub.R] ([w.sub.y]) = 1.4 mm. The beam
propagation factor K ([w.sub.y]) = 0.4 and the diffraction factor
[M.sup.2] ([w.sub.y]) = 2.7. In function of w is the waist radius
[w.sub.0](w) = 0.12 mm, the Rayleigh length [z.sub.R](w) = 1.5. The beam
propagation factor K(w) = 0.3 and the diffraction factor [M.sup.2] (w) =
3.0.
[FIGURE 7 OMITTED]
4. CONCLUSIONS
For the focused laser beam, based on the diagrams, one can say when
the power increases so grows the power density. The maximum power
density increases with cca. 6 x 105 W/[mm.sup.2] when the laser power is
raised with 200 W. The waist radius [w.sub.0](w) is for all powers cca.
0.12 mm and the Rayleigh length [Z.sub.r] (w) is approx. 1.5 mm. It
follows that raising the power has no influence on the waist radius and
on the Rayleigh length. The increase in power increases the power
density of the laser beam. The increase in power has no influence on the
beam propagations factor K and on the diffraction factor [M.sup.2]. They
remain constant. The laser beam geometry for the focused laser beam is
independent of the laser power. For increase or decrease of the laser
power the focused laser beam has a constant geometry and a constant
quality.
5. REFERENCES
Hugel, H. (1992). StrahlwerkzuegLaser. Teubner, ISBN 3-519-06134-1
Ion, J. C. (2005). Laser Processing of Engineering Materials:
Principles, Procedure, and Industrial Application. Elsevier Butterworth
Heinemann, Amsterdam, ISBN 0-7506-6079-1
Paschotta, R. (2004). Encyclopedia of Laser Physics and Technology,
available at: http://www.rp-photonics.com
Poprawe, R. (2005). Lasertechnik fur die Fertigung,
Springer-Verlag, Berlin Heidelberg
Ready, J.F. (2001). LIA handbook of laser materials processing.
Magnolia Publishing, Inc, ISBN 0-912035-15-3
