The optical efficiencies of a solar trough concentrator are important to the whole thermal performance of the solar collector, and the outer surface of the tube absorber is a key interface of energy flux. So it is necessary to simulate and analyze the concentrated solar flux density distributions on the tube absorber of a parabolic trough solar collector for various sun beam incident angles, with main optical errors considered. Since the solar trough concentrators are linear focusing, it is much of interest to investigate the solar flux density distribution on the cross-section profile of the tube absorber, rather than the flux density distribution along the focal line direction. Although a few integral approaches based on the “solar cone” concept were developed to compute the concentrated flux density for some simple trough concentrator geometries, all those integral approaches needed special integration routines, meanwhile, the optical parameters and geometrical properties of collectors also couldn’t be changed conveniently. Flexible Monte Carlo ray trace (MCRT) methods are widely used to simulate the more accurate concentrated flux density distribution for compound parabolic solar trough concentrators, while generally they are quite time consuming. In this paper, we first mainly introduce a new backward ray tracing (BRT) method combined with the lumped effective solar cone, to simulate the cross-section flux density on the region of interest of the tube absorber. For BRT, bundles of rays are launched at absorber-surface points of interest, directly go through the glass cover of the absorber, strike on the uniformly sampled mirror segment centers in the close-related surface region of the parabolic reflector, and then direct to the effective solar cone around the incident sun beam direction after the virtual backward reflection. All the optical errors are convoluted into the effective solar cone. The brightness distribution of the effective solar cone is supposed to be circular Gaussian type. Then a parabolic trough solar collector of Euro Trough 150 is used as an example object to apply this BRT method. Euro Trough 150 is composed of RP3 mirror facets, with the focal length of 1.71m, aperture width of 5.77m, outer tube diameter of 0.07m. Also to verify the simulated flux density distributions, we establish a modified MCRT method. For this modified MCRT method, the random rays with weighted energy elements are launched in the close-related rectangle region in the aperture plane of the parabolic concentrator and the optical errors are statistically modeled in the stages of forward ray tracing process. Given the same concentrator geometric parameters and optical error values, the simulated results from these two ray tracing methods are in good consistence. The two highlights of this paper are the new optical simulation method, BRT, and figuring out the close-related mirror surface region for BRT and the close-related aperture region for MCRT in advance to effectively simulate the solar flux distribution on the absorber surface of a parabolic trough collector.

1.
D. L.
Evens
, “
On the performance of cylindrical parabolic solar concentrators with flat absorbers
,” in
Solar Energy
19
,
379
385
(
1977
).
2.
J.A.
Harris
and
W.S.
Duff
, “
Focal plane flux distribution produced by solar concentrating reflectors
,” in
Solar Energy
27
,
403
411
(
1981
).
3.
S.M.
Jeter
, “
Calculation of the concentrated flux density distribution in parabolic trough collectors by a semifinite formulation
,” in
Solar Energy
37
,
335
345
(
1986
).
4.
S.M.
Jeter
, “
Analytical determination of the optical performance of practical parabolic trough collectors from design data
,” in
Solar Energy
39
,
11
21
(
1987
).
5.
P.L.
Leary
and
J.D.
Hankins
, “Users guide for MIRVAL: a computer code for comparing designs of heliostat- receiver optics for central receiver solar power plants,”
Sandia Report SAND-77-8280
,
1979
.
6.
T.
Wendelin
, “SolTRACE: a new optical modeling tool for concentrating solar optics,”
Proceedings of the ISEC 2003: International Solar Energy Conference
, 15–18 March
2003
, (
Kohala Coast, Hawaii, New York
,
American Society of Mechanical Engineers
), pp.
253
260
.
7.
Y.L.
He
,
J.
Xiao
,
Z.D.
Cheng
and
Y.B.
Tao
, “
A MCRT and FVM coupled simulation method for energy conversion process in parabolic trough solar collector
,” in
Renewable Energy
36
,
976
985
(
2011
).
8.
A.
Rabl
,
Active Solar Collectors and their Applications
(
Oxford University Press
,
New York
,
1985
), pp.
202
205
.
9.
F. W.
Lipps
, “
Four different views of the heliostat flux density integral
,” in
Solar Energy
18
,
555
560
(
1976
).
10.
K.
Pottler
,
S.
Ulmer
,
E.
Lüpfert
,
M.
Landmann
,
M.
Röger
,
C.
Prahl
, “
Ensuring performance by geometric quality control and specifications for parabolic trough solar fields
,” in
Energy Procedia
49
,
2170
2179
(
2013
).
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