我现在在初学zemax的
公差分析,找了一个双胶合
透镜 E%np-i�s{1 .j� l|�?�o 
:@c\a9�9Kx >2�1f�%�Z 然后添加了默认公差分析,基本没变
�u0?,CQP�L 01&�J�7�A2 
N~0~1
W�Qn �9y�WQ}h�� 然后运行分析的结果如下:
? 1
~C`I�; {OGv1\ol�& Analysis of Tolerances
�W,�-fnJk� ]zUvs6ksLG File : E:\光学设计资料\zemax练习\f500.ZMX
wz�NGL{3� Title:
G~FAChI8![ Date : TUE JUN 21 2011
T$vDw|KSVP �qpZR�-��O Units are Millimeters.
se��]q~<&� All changes are computed using linear differences.
?o��883!&v �#����z&@f Paraxial Focus compensation only.
f�XfO9{�E� �)DwHLaLW� WARNING: Solves should be removed prior to tolerancing.
I�u�N:�*P� QsC6�\�Gt# Mnemonics:
�JR�^#NefJ TFRN: Tolerance on curvature in fringes.
:W*']8 M�- TTHI: Tolerance on thickness.
S{7 �R6,B5 TSDX: Tolerance on surface decentering in x.
Lq�cHsUF�j TSDY: Tolerance on surface decentering in y.
�Xn3
\a81� TSTX: Tolerance on surface tilt in x (degrees).
�qdY*y&}"J TSTY: Tolerance on surface tilt in y (degrees).
iW$f1=��i TIRR: Tolerance on irregularity (fringes).
��u~�\�I�� TIND: Tolerance on Nd index of refraction.
5A`T�}~"X� TEDX: Tolerance on element decentering in x.
Yj#4�{2�A� TEDY: Tolerance on element decentering in y.
SQ0t28N3�h TETX: Tolerance on element tilt in x (degrees).
�TL�*8h7.( TETY: Tolerance on element tilt in y (degrees).
dWDM{t\}\� =l�G/A[66� WARNING: RAY AIMING IS OFF. Very loose tolerances may not be computed accurately.
���z(J�DLd *Iir/6myM� WARNING: Boundary constraints on compensators will be ignored.
��6E0{�(*� ,�b�nrVa(I Criterion : Geometric
MTF average S&T at 30.0000 cycles per mm
[�)L)���R` Mode : Sensitivities
BMxe)izT;� Sampling : 2
Ub���f@"B� Nominal Criterion : 0.54403234
,p�7W�4;?4 Test Wavelength : 0.6328
2Pz)�vn�V" 9:1[4o��)~ Mlm��dfO%Y Fields: XY Symmetric Angle in degrees
jt,d�r3|/n # X-Field Y-Field Weight VDX VDY VCX VCY
),;O3:�n 1 0.000E+000 0.000E+000 1.000E+000 0.000 0.000 0.000 0.000
cc�m(r~lhJ 8P[aX3T�7G Sensitivity Analysis:
RZr�Q^tI3" O�=2�SDuBZ |----------------- Minimum ----------------| |----------------- Maximum ----------------|
�at5>h� � Type Value Criterion Change Value Criterion Change
+:jx{*}jo� Fringe tolerance on surface 1
9�zs!rl�zQ TFRN 1 -1.00000000 0.54257256 -0.00145977 1.00000000 0.54548607 0.00145374
8 �O%� ?�t Change in Focus :
-0.000000 0.000000
��X^�c��2� Fringe tolerance on surface 2
y �L|�'K}� TFRN 2 -1.00000000 0.54177471 -0.00225762 1.00000000 0.54627463 0.00224230
�\;F_�Q�V Change in Focus : 0.000000 0.000000
/lqVMlz\77 Fringe tolerance on surface 3
O[Riv��HCY TFRN 3 -1.00000000 0.54779866 0.00376632 1.00000000 0.54022572 -0.00380662
@�M_p3[�c\ Change in Focus : -0.000000 0.000000
b<��1+q{0r Thickness tolerance on surface 1
y3{���F\K� TTHI 1 3 -0.20000000 0.54321462 -0.00081772 0.20000000 0.54484759 0.00081525
~;uc@GG�o� Change in Focus : 0.000000 0.000000
gt�Vnn�]Jh Thickness tolerance on surface 2
T**v�!L�s� TTHI 2 3 -0.20000000 0.54478712 0.00075478 0.20000000 0.54327558 -0.00075675
`Eq~W@';Q0 Change in Focus : 0.000000 -0.000000
�~f5��g\n; Decenter X tolerance on surfaces 1 through 3
5kbbeO|0�G TEDX 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
;eQOB��GX9 Change in Focus : 0.000000 0.000000
G��}8Zkz@+ Decenter Y tolerance on surfaces 1 through 3
E�nD��}|9
TEDY 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
Vq>$ZlvS Change in Focus : 0.000000 0.000000
5wgeA^HE2y Tilt X tolerance on surfaces 1 through 3 (degrees)
�'7;b+Vbl# TETX 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
�g�uc�[d�u Change in Focus : 0.000000 0.000000
�_C�n�l|�' Tilt Y tolerance on surfaces 1 through 3 (degrees)
zC<�k4�[�. TETY 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
K#_x�.:�<J Change in Focus : 0.000000 0.000000
PbpnjvVr�M Decenter X tolerance on surface 1
GX-V|hLaGX TSDX 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
��Z��?�"f# Change in Focus : 0.000000 0.000000
(eE���s0� Decenter Y tolerance on surface 1
W3aFao>!OZ TSDY 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
�/.m��&rS Change in Focus : 0.000000 0.000000
{�.mP��e| Tilt X tolerance on surface (degrees) 1
q47�:k�B{d TSTX 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
�1
|�T{RY5 Change in Focus : 0.000000 0.000000
!${7�)=|=1 Tilt Y tolerance on surface (degrees) 1
14Y<-OO:
k TSTY 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
&�� c�V$`L Change in Focus : 0.000000 0.000000
M|��DVF�C� Decenter X tolerance on surface 2
�+�$�y%�H TSDX 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
BWG*UjP
M Change in Focus : 0.000000 0.000000
qGVf!����R Decenter Y tolerance on surface 2
%!X�9>i�>� TSDY 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
X"��� m0|| Change in Focus : 0.000000 0.000000
�97 eEqI$# Tilt X tolerance on surface (degrees) 2
0tb%h[%,M TSTX 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
RJhafUJ zH Change in Focus : 0.000000 0.000000
���:�plN<8 Tilt Y tolerance on surface (degrees) 2
�=R6IW,�* TSTY 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
7G]v(ay��� Change in Focus : 0.000000 0.000000
R q�
|�,�@ Decenter X tolerance on surface 3
�1�~�aP)q� TSDX 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
���HY!�R�| Change in Focus : 0.000000 0.000000
!9p;%N�y`� Decenter Y tolerance on surface 3
d�"�:GsI?3 TSDY 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
�OAw-� -rl Change in Focus : 0.000000 0.000000
z}z 6�V�g� Tilt X tolerance on surface (degrees) 3
�[Zx�v&$SQ TSTX 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
DE�lrY)3O. Change in Focus : 0.000000 0.000000
$s.:�H4:�I Tilt Y tolerance on surface (degrees) 3
(�<�KF�A,� TSTY 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
5x?��YFq6k Change in Focus : 0.000000 0.000000
d��YxX%"J� Irregularity of surface 1 in fringes
-g\��;��B TIRR 1 -0.20000000 0.50973587 -0.03429647 0.20000000 0.57333868 0.02930634
�"&�R��t&S Change in Focus : 0.000000 0.000000
sF�bN)C��x Irregularity of surface 2 in fringes
ZULnS*V;5 TIRR 2 -0.20000000 0.53400904 -0.01002330 0.20000000 0.55360281 0.00957047
��!��%X#;{ Change in Focus : 0.000000 0.000000
A�}3dx!?7j Irregularity of surface 3 in fringes
zN3b`K. �i TIRR 3 -0.20000000 0.58078982 0.03675748 0.20000000 0.49904394 -0.04498840
Nbvs_>�N�� Change in Focus : 0.000000 0.000000
j[Q9_0R~lR Index tolerance on surface 1
r?2EJE2{�V TIND 1 -0.00100000 0.52606778 -0.01796456 0.00100000 0.56121811 0.01718578
�{$x�t.�< Change in Focus : 0.000000 0.000000
N5d�)&a
7? Index tolerance on surface 2
�S��E��<?l TIND 2 -0.00100000 0.55639086 0.01235852 0.00100000 0.53126361 -0.01276872
s~'"&�0G�z Change in Focus : 0.000000 -0.000000
4��^(�a�G7 FKBI.}A?!' Worst offenders:
VS�jt�|F)t Type Value Criterion Change
f"R�S�,�] TSTY 2 -0.20000000 0.35349910 -0.19053324
H ]z83:Z� TSTY 2 0.20000000 0.35349910 -0.19053324
O;l��Gh1. TSTX 2 -0.20000000 0.35349910 -0.19053324
�q��d�<-{� TSTX 2 0.20000000 0.35349910 -0.19053324
�lx\9��Y�8 TSTY 1 -0.20000000 0.42678383 -0.11724851
c]%�~X&Tg` TSTY 1 0.20000000 0.42678383 -0.11724851
q�>rDxmP�< TSTX 1 -0.20000000 0.42678383 -0.11724851
?�Gqq]oz�m TSTX 1 0.20000000 0.42678383 -0.11724851
:Xi&H.�k)p TSTY 3 -0.20000000 0.42861670 -0.11541563
NH'Dz6K5� TSTY 3 0.20000000 0.42861670 -0.11541563
�uL{CU�t
B�",;�z)(% Estimated Performance Changes based upon Root-Sum-Square method:
6�o
d�^+>U Nominal MTF : 0.54403234
+���l hJ8& Estimated change : -0.36299231
LU $=j�� Estimated MTF : 0.18104003
p?�2^JJpUb �=�6'Fm$R Compensator Statistics: 8I[=iU�7]l Change in back focus: ]?%�S0DO*� Minimum : -0.000000 �UQ�#�t &� Maximum : 0.000000 @1N��.;]|� Mean : -0.000000 ?DGg�.�2f� Standard Deviation : 0.000000 H�<9_B�A�? ub��;:"ns} Monte Carlo Analysis:
��&u2H^� j Number of trials: 20
Z`<5S�HQd� X;]I�jha<* Initial Statistics: Normal Distribution
B~B,�L*kC2 _#K?�yP��? Trial Criterion Change
���R�-YNg 1 0.42804416 -0.11598818
wx�o*\WLe Change in Focus : -0.400171
UC��_o�;�� 2 0.54384387 -0.00018847
=�P�%?{��7 Change in Focus : 1.018470
{l"(E�eW6) 3 0.44510003 -0.09893230
�+i�b&�6IU Change in Focus : -0.601922
�K7�X�*�N 4 0.18154684 -0.36248550
Ae\:�{[c_D Change in Focus : 0.920681
h~�lps?.#b 5 0.28665820 -0.25737414
Z�!-V�&H.� Change in Focus : 1.253875
"5��2�04�I 6 0.21263372 -0.33139862
�K��0~=�9/ Change in Focus : -0.903878
�3rB�I�D�� 7 0.40051424 -0.14351809
���2�HO2�� Change in Focus : -1.354815
6� �2#@Y-5 8 0.48754161 -0.05649072
xXl�x�}�C� Change in Focus : 0.215922
K�@�%gvLa\ 9 0.40357468 -0.14045766
(8baa.��ge Change in Focus : 0.281783
+Sc2'z�>R� 10 0.26315315 -0.28087919
,xg-H6Xfa{ Change in Focus : -1.048393
x�R�8y"CpE 11 0.26120585 -0.28282649
+
}$�(j#�h Change in Focus : 1.017611
&N�OCRab�c 12 0.24033815 -0.30369419
n&,X��']z. Change in Focus : -0.109292
�P?�^%��i� 13 0.37164046 -0.17239188
osc �A\r�� Change in Focus : -0.692430
pk`5�RD�Bu 14 0.48597489 -0.05805744
X�.�sOZb?$ Change in Focus : -0.662040
\l%##7DRp] 15 0.21462327 -0.32940907
Z;S)GU�G�^ Change in Focus : 1.611296
�d3\KUR��^ 16 0.43378226 -0.11025008
#�� [
+�n( Change in Focus : -0.640081
�#"8����'y 17 0.39321881 -0.15081353
j�\"�d/{7Q Change in Focus : 0.914906
y�uC�|_�nL 18 0.20692530 -0.33710703
M3Qi]jO�98 Change in Focus : 0.801607
l$[,�V�:N 19 0.51374068 -0.03029165
m%'T90�mi� Change in Focus : 0.947293
hX�vC>ie(i 20 0.38013374 -0.16389860
L�1W���vX6 Change in Focus : 0.667010
Xv�k�+�1:D \r9E6LL�X' Number of traceable Monte Carlo files generated: 20
ii&ckg>�]z -B�SO$'{7� Nominal 0.54403234
f�:��t j
� Best 0.54384387 Trial 2
cY� Qm8TR< Worst 0.18154684 Trial 4
c>�3j�$�D+ Mean 0.35770970
}u�8g�7�Nj Std Dev 0.11156454
q6�b&b^r+H �8�
&v)Vi- �'Fc�$?$c\ Compensator Statistics:
p"7[heExw Change in back focus:
P,b�&����F Minimum : -1.354815
!�@*= �b1� Maximum : 1.611296
jcjl� q-�x Mean : 0.161872
Q+/P>5�O/� Standard Deviation : 0.869664
R �T~oJ~t; �A2p%��Y}, 90% > 0.20977951 f]mVM(X�ZN 80% > 0.22748071 9-vQ�n/O^D 50% > 0.38667627 oIQ$�98�M 20% > 0.46553746 6y "]2UgQk 10% > 0.50064115 >^�IU�S�8v I-=Ieq"R�9 End of Run.
�!]�5�V{3� 3[m2F �O,Z 这就有了些疑问,为什么我选择的补偿器是近轴焦点,而分析结果近轴焦点都不变化??应该是变得。另外最后的蒙特卡洛分析,只有10%的大于0.5(我用的是MTF作为评价方式),可是我设计的MTF如图
�LM �1Vsh< 
U(Bmffn4�Z x6$�3�KDQm 是大于0.6左右的,难道我按照这个默认的公差来加工的话,只有10%的才可能大于0.5?那太低了啊,请问这该怎么进行进一步处理。或者之前哪有问题
bR�1Q77<G\ Z$��r�7Hi� 不吝赐教
