我现在在初学zemax的
公差分析,找了一个双胶合
透镜 w�n Q% 'Eo 4R}$�P1 �E 
J�T�cE�{�i �1lL�X��u 然后添加了默认公差分析,基本没变
��?9�10ki_ o����K@�_
=38��c}��( �k�N��g�{� 然后运行分析的结果如下:
@v~<E�?Un� �-Pp =)_�O Analysis of Tolerances
�SdXA��L�� 2=�R�Q,@s� File : E:\光学设计资料\zemax练习\f500.ZMX
*r/o
�\pyH Title:
Ha/Gn��!l Date : TUE JUN 21 2011
#,S���0u�A "ivS�pec.V Units are Millimeters.
X�,`^z,M%I All changes are computed using linear differences.
y�D y���MI tSX�,*�c�z Paraxial Focus compensation only.
R+<M"LriR& uB;PaZ�G?{ WARNING: Solves should be removed prior to tolerancing.
fO{'$�?�K� G\C>fwrP_� Mnemonics:
z^�Y4:^L~I TFRN: Tolerance on curvature in fringes.
�,e@707d`\ TTHI: Tolerance on thickness.
4c�,{J��s� TSDX: Tolerance on surface decentering in x.
-�(VX+XH�W TSDY: Tolerance on surface decentering in y.
#9/S2m2\YG TSTX: Tolerance on surface tilt in x (degrees).
7J|e�L
�yj TSTY: Tolerance on surface tilt in y (degrees).
��RD6`b_]o TIRR: Tolerance on irregularity (fringes).
�A� 6j>KTU TIND: Tolerance on Nd index of refraction.
MT�^kr�v(G TEDX: Tolerance on element decentering in x.
t@c�Immh\T TEDY: Tolerance on element decentering in y.
H��|8i|vbi TETX: Tolerance on element tilt in x (degrees).
^K?M�q1"Db TETY: Tolerance on element tilt in y (degrees).
"ZR^��w5�� w9�,w?�%�F WARNING: RAY AIMING IS OFF. Very loose tolerances may not be computed accurately.
OE(!^"5�?[ �:^��J�'�_ WARNING: Boundary constraints on compensators will be ignored.
J%1� 2Ey@6 ��iu+rg(*% Criterion : Geometric
MTF average S&T at 30.0000 cycles per mm
G�|LcT�V�� Mode : Sensitivities
\��w=�*:Z� Sampling : 2
[�J6q(}��f Nominal Criterion : 0.54403234
�s-e<&*D�[ Test Wavelength : 0.6328
�+`+r�\*C5 WV,j
<x9w �\h�eQVWRl Fields: XY Symmetric Angle in degrees
��q/d��ja� # X-Field Y-Field Weight VDX VDY VCX VCY
G�0Wv=tX|� 1 0.000E+000 0.000E+000 1.000E+000 0.000 0.000 0.000 0.000
�KF�f6��um A0�8{]E#v> Sensitivity Analysis:
q/3 �)yG6s �8]A`W�DO3 |----------------- Minimum ----------------| |----------------- Maximum ----------------|
Pi'[�d7o� Type Value Criterion Change Value Criterion Change
P3+?gW��'� Fringe tolerance on surface 1
x�f��4�`+[ TFRN 1 -1.00000000 0.54257256 -0.00145977 1.00000000 0.54548607 0.00145374
o0FV��VS�l Change in Focus :
-0.000000 0.000000
��JAS!�eF� Fringe tolerance on surface 2
0��C�hdFf7 TFRN 2 -1.00000000 0.54177471 -0.00225762 1.00000000 0.54627463 0.00224230
?T��7n�dXX Change in Focus : 0.000000 0.000000
� &�D���X� Fringe tolerance on surface 3
l������^4! TFRN 3 -1.00000000 0.54779866 0.00376632 1.00000000 0.54022572 -0.00380662
-�n]E�\��" Change in Focus : -0.000000 0.000000
�Y5\=5r��/ Thickness tolerance on surface 1
{f�[X���) TTHI 1 3 -0.20000000 0.54321462 -0.00081772 0.20000000 0.54484759 0.00081525
iNE�E2BPp� Change in Focus : 0.000000 0.000000
8Bg�g�K6X Thickness tolerance on surface 2
��[�|d��QZ TTHI 2 3 -0.20000000 0.54478712 0.00075478 0.20000000 0.54327558 -0.00075675
�Sj9NhtF]f Change in Focus : 0.000000 -0.000000
��{"@E�_{\ Decenter X tolerance on surfaces 1 through 3
�"�Rq)%o$Z TEDX 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
_?�~)B\@~0 Change in Focus : 0.000000 0.000000
O`2��h�TY\ Decenter Y tolerance on surfaces 1 through 3
Fa9gr/.F,@ TEDY 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
b(?A^���a� Change in Focus : 0.000000 0.000000
5}he)2*�uD Tilt X tolerance on surfaces 1 through 3 (degrees)
�F'3-*>�]P TETX 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
JTfG^Nv>K� Change in Focus : 0.000000 0.000000
L�7� �g4'� Tilt Y tolerance on surfaces 1 through 3 (degrees)
\�"AzT{l!; TETY 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
�cP��&XkAQ Change in Focus : 0.000000 0.000000
8~eYN-�#W& Decenter X tolerance on surface 1
+�i6XC�N1= TSDX 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
Q\{$&0M�cF Change in Focus : 0.000000 0.000000
707-iLkt.1 Decenter Y tolerance on surface 1
W6L}�T,epX TSDY 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
� mIk�c�+X Change in Focus : 0.000000 0.000000
4KT-U6z�Nx Tilt X tolerance on surface (degrees) 1
7?EC
kuSv� TSTX 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
Xd�GA8%^cY Change in Focus : 0.000000 0.000000
��F<|x_6a\ Tilt Y tolerance on surface (degrees) 1
<O30X
!QuK TSTY 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
�[�;8v�O=Z Change in Focus : 0.000000 0.000000
@�Yy']!J�u Decenter X tolerance on surface 2
� 4xn�M7t\ TSDX 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
�,`��;D�re Change in Focus : 0.000000 0.000000
=~F.7wq*^� Decenter Y tolerance on surface 2
z\�r�|5Z�� TSDY 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
?j-��;;NNf Change in Focus : 0.000000 0.000000
(H-�Y-L�k+ Tilt X tolerance on surface (degrees) 2
=�VM4Q+�'K TSTX 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
3���FpS�o+ Change in Focus : 0.000000 0.000000
��$][$ e� Tilt Y tolerance on surface (degrees) 2
(�#%R'9R�v TSTY 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
U�8s&5~IPn Change in Focus : 0.000000 0.000000
ju%t�'u\�' Decenter X tolerance on surface 3
PXJ�`<�XM TSDX 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
Y�MTB�4|{� Change in Focus : 0.000000 0.000000
M�g}8� 3kS Decenter Y tolerance on surface 3
��P1�Chm�g TSDY 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
1pHt�3Vc(G Change in Focus : 0.000000 0.000000
K_�t�!�P� Tilt X tolerance on surface (degrees) 3
_$YT*o�@0J TSTX 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
"8YXF����g Change in Focus : 0.000000 0.000000
268�H!'�!\ Tilt Y tolerance on surface (degrees) 3
V=DT����.u TSTY 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
K^fH:�p��V Change in Focus : 0.000000 0.000000
k| Ye[GM*� Irregularity of surface 1 in fringes
� t_Rp�eav TIRR 1 -0.20000000 0.50973587 -0.03429647 0.20000000 0.57333868 0.02930634
a0=5G>�G9c Change in Focus : 0.000000 0.000000
T{Rh��n V1 Irregularity of surface 2 in fringes
Lr}>M��d�� TIRR 2 -0.20000000 0.53400904 -0.01002330 0.20000000 0.55360281 0.00957047
�b+3QqbJ[F Change in Focus : 0.000000 0.000000
qD?-&>dBWi Irregularity of surface 3 in fringes
0'O*Y
]h+� TIRR 3 -0.20000000 0.58078982 0.03675748 0.20000000 0.49904394 -0.04498840
XI*�cu\7sy Change in Focus : 0.000000 0.000000
35�X4]
�t Index tolerance on surface 1
��H<bK9k)E TIND 1 -0.00100000 0.52606778 -0.01796456 0.00100000 0.56121811 0.01718578
�X�P'�7+/A Change in Focus : 0.000000 0.000000
��9Di@r!Db Index tolerance on surface 2
g4fe(.?c,� TIND 2 -0.00100000 0.55639086 0.01235852 0.00100000 0.53126361 -0.01276872
5\�|u]
~b Change in Focus : 0.000000 -0.000000
h,�W��F'X+ `OWw<6�`k Worst offenders:
�=9@t�6� � Type Value Criterion Change
?�E�8�8��y TSTY 2 -0.20000000 0.35349910 -0.19053324
�KsMC�+:`F TSTY 2 0.20000000 0.35349910 -0.19053324
>84:1��`�� TSTX 2 -0.20000000 0.35349910 -0.19053324
i9%c�pPrg8 TSTX 2 0.20000000 0.35349910 -0.19053324
�gkN
)`/`* TSTY 1 -0.20000000 0.42678383 -0.11724851
�_B�h�m\|t TSTY 1 0.20000000 0.42678383 -0.11724851
j/+e5.EX�/ TSTX 1 -0.20000000 0.42678383 -0.11724851
�aur4Ky> : TSTX 1 0.20000000 0.42678383 -0.11724851
9V�5�d=�^� TSTY 3 -0.20000000 0.42861670 -0.11541563
hRW�R�XC�9 TSTY 3 0.20000000 0.42861670 -0.11541563
$7bl�,��~Z 2|��C(|fD4 Estimated Performance Changes based upon Root-Sum-Square method:
��j(�SBpM Nominal MTF : 0.54403234
\L@DDK|"`6 Estimated change : -0.36299231
��a6&+�>\o Estimated MTF : 0.18104003
D��D]e0 pa y�Dd���i+ Compensator Statistics: E"�)g1xGaK Change in back focus: '&#YaD=""� Minimum : -0.000000 ��k_}aiHdG Maximum : 0.000000 �ca{u�"�n Mean : -0.000000 ^Td��_B03) Standard Deviation : 0.000000 PF4"�J^�V� +~~&F�O��2 Monte Carlo Analysis:
D+�"�-(��k Number of trials: 20
Y�rW�C\HR_ c�ii]-%J}c Initial Statistics: Normal Distribution
r��Ig5Wcd 8A��3pYW- Trial Criterion Change
�UZ"�jQJ�Q 1 0.42804416 -0.11598818
Q5:8$�
C}+ Change in Focus : -0.400171
vS$_H<;P�� 2 0.54384387 -0.00018847
w6� x{�<d Change in Focus : 1.018470
��s/"?P�/R 3 0.44510003 -0.09893230
��|d B`URP Change in Focus : -0.601922
Pfv| K�;3i 4 0.18154684 -0.36248550
4tb �y� N� Change in Focus : 0.920681
+�9[/> JM� 5 0.28665820 -0.25737414
�jbU=D�:| Change in Focus : 1.253875
dmkd�.aP4� 6 0.21263372 -0.33139862
�#r ;;d�(� Change in Focus : -0.903878
,p�y:e>+^t 7 0.40051424 -0.14351809
k�]<�E1 c/ Change in Focus : -1.354815
Y�m �W�Vb� 8 0.48754161 -0.05649072
U0Y;�*�_>4 Change in Focus : 0.215922
.<L�bv5m 9 0.40357468 -0.14045766
AUk��,sCxd Change in Focus : 0.281783
L
�=kc�^dU 10 0.26315315 -0.28087919
n��b�GB84� Change in Focus : -1.048393
w�f�=
s-C� 11 0.26120585 -0.28282649
��B)bq@�jM Change in Focus : 1.017611
_� �`RCY^t 12 0.24033815 -0.30369419
�69o,T�`B Change in Focus : -0.109292
<�e
s>�F�D 13 0.37164046 -0.17239188
� GT)6��3| Change in Focus : -0.692430
5:o$]LkOWC 14 0.48597489 -0.05805744
�*nPB+��@f Change in Focus : -0.662040
A* =r�~T5B 15 0.21462327 -0.32940907
��[9:'v@Ph Change in Focus : 1.611296
*+-L`b{S�X 16 0.43378226 -0.11025008
��?y@��RE� Change in Focus : -0.640081
G�w0�_M�&� 17 0.39321881 -0.15081353
.[�E"Kb}=� Change in Focus : 0.914906
45u\v2,�C3 18 0.20692530 -0.33710703
$��\DO�y&e Change in Focus : 0.801607
z�� ��D��P 19 0.51374068 -0.03029165
F�Hu
-';�� Change in Focus : 0.947293
k�r�w�_1Mm 20 0.38013374 -0.16389860
Bj ~bsT@a. Change in Focus : 0.667010
Go�mT�ec9. aa'�u5<<�W Number of traceable Monte Carlo files generated: 20
I4%p?'i,C 0
�t��Z>yR Nominal 0.54403234
h#�o3�qY�� Best 0.54384387 Trial 2
yJ���h�eni Worst 0.18154684 Trial 4
f~RS��[h`: Mean 0.35770970
&7�{/ x~S{ Std Dev 0.11156454
�4�r&S�&�^ x*EzX4�$x� $8{|�25
*E Compensator Statistics:
d=�TZaVL$$ Change in back focus:
_ 2W�G6�y; Minimum : -1.354815
P?y3Yx�S�� Maximum : 1.611296
T�JB)��]d< Mean : 0.161872
wO&edZ]zb^ Standard Deviation : 0.869664
j�#��C1+Us $ON4��nx� 90% > 0.20977951 �x}`]�9XQ� 80% > 0.22748071 .�)7r /1o 50% > 0.38667627 fVU9?^0/)9 20% > 0.46553746 �yC�]xYn) 10% > 0.50064115 R3G+�tE/�Y T4�O��H,^J End of Run.
��<h$Nh0�� �j�L�|�y�4 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
=�*i�cC�ng 
A?Dg�eS�m "w)Y0Qq*z 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
Myl!tXawe8 p m4g),s�� 不吝赐教
