我现在在初学zemax的
公差分析,找了一个双胶合
透镜 K]c���4"JJ ohUdGO�[/� 
�rQ/���,XH ��"(v%1tGk 然后添加了默认公差分析,基本没变
? B@&#E!/f ��MJ�`N,E[ 
^�W~p..�DF S}�(8f�!9< 然后运行分析的结果如下:
]�hA,LY �f V
A<5uk04K Analysis of Tolerances
+� �WVIZZ8 "-�31'��R- File : E:\光学设计资料\zemax练习\f500.ZMX
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4[�,4 Title:
]1D%zKY%$Z Date : TUE JUN 21 2011
k|xtrW`qo; h�fqqQ!,l! Units are Millimeters.
!*aP�Ef270 All changes are computed using linear differences.
5;��\gJ��f c~0���{s>� Paraxial Focus compensation only.
-'`�T��L�$ $�<nCXVqL, WARNING: Solves should be removed prior to tolerancing.
.f:n\eT):� S4N(�cn&�� Mnemonics:
oR�M)%�N#� TFRN: Tolerance on curvature in fringes.
}lP;�U��$� TTHI: Tolerance on thickness.
eSEq�{��?> TSDX: Tolerance on surface decentering in x.
]0c+/ \b�& TSDY: Tolerance on surface decentering in y.
(@r
`$5D.b TSTX: Tolerance on surface tilt in x (degrees).
#�*9-d/�K� TSTY: Tolerance on surface tilt in y (degrees).
.B72�C[' c TIRR: Tolerance on irregularity (fringes).
BHA9�2�3p? TIND: Tolerance on Nd index of refraction.
;�{#^MD MB TEDX: Tolerance on element decentering in x.
<q
(z>*�-e TEDY: Tolerance on element decentering in y.
U!�(@q!>�G TETX: Tolerance on element tilt in x (degrees).
v>Lm;q(��� TETY: Tolerance on element tilt in y (degrees).
SJ?��6{2�^ 7%�MbhlN. WARNING: RAY AIMING IS OFF. Very loose tolerances may not be computed accurately.
X��(A.�X:" 7y^%7U� \� WARNING: Boundary constraints on compensators will be ignored.
GOT1�@.Y� >�&,[H:�Z Criterion : Geometric
MTF average S&T at 30.0000 cycles per mm
:s�={[KBP� Mode : Sensitivities
�q[3x��2sR Sampling : 2
�-�d+aV�1n Nominal Criterion : 0.54403234
5%zXAQD�=< Test Wavelength : 0.6328
��mY�xyWB� �2�)X4y"�l �m<���rhIq Fields: XY Symmetric Angle in degrees
3S*�AxA�eg # X-Field Y-Field Weight VDX VDY VCX VCY
t?�c�}L7ht 1 0.000E+000 0.000E+000 1.000E+000 0.000 0.000 0.000 0.000
WW��K��vh� 0NDf�tcB]� Sensitivity Analysis:
oF]cTAqhC. �80b;I|-T, |----------------- Minimum ----------------| |----------------- Maximum ----------------|
O.G'?m<:�# Type Value Criterion Change Value Criterion Change
>D�w~P�OMy Fringe tolerance on surface 1
n��DS}^Ba� TFRN 1 -1.00000000 0.54257256 -0.00145977 1.00000000 0.54548607 0.00145374
);V2?�G`/� Change in Focus :
-0.000000 0.000000
_"@�CGX�u� Fringe tolerance on surface 2
�7�c|bc6? TFRN 2 -1.00000000 0.54177471 -0.00225762 1.00000000 0.54627463 0.00224230
cD*�}..-/4 Change in Focus : 0.000000 0.000000
dU)��]:>Uz Fringe tolerance on surface 3
�\Ig68dFf% TFRN 3 -1.00000000 0.54779866 0.00376632 1.00000000 0.54022572 -0.00380662
!�RB)��_�7 Change in Focus : -0.000000 0.000000
b[�9&�l|y^ Thickness tolerance on surface 1
mw�$r$C��{ TTHI 1 3 -0.20000000 0.54321462 -0.00081772 0.20000000 0.54484759 0.00081525
K6/�@]y%Wr Change in Focus : 0.000000 0.000000
�Z��xr!:t7 Thickness tolerance on surface 2
:W#r�h�uzC TTHI 2 3 -0.20000000 0.54478712 0.00075478 0.20000000 0.54327558 -0.00075675
uvDzKMw~�R Change in Focus : 0.000000 -0.000000
fm��q�b`�% Decenter X tolerance on surfaces 1 through 3
C+[%7�vF1� TEDX 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
)�J]9 lW&y Change in Focus : 0.000000 0.000000
;~fT,7qBah Decenter Y tolerance on surfaces 1 through 3
1 `�^Rdi0� TEDY 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
ca� i�<,3H Change in Focus : 0.000000 0.000000
�<+MyZM(z> Tilt X tolerance on surfaces 1 through 3 (degrees)
��I�V%z�O+ TETX 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
6E(Qx~�i�L Change in Focus : 0.000000 0.000000
> �f�nh�+M Tilt Y tolerance on surfaces 1 through 3 (degrees)
CT�X9zrY*T TETY 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
��6+r$t#�� Change in Focus : 0.000000 0.000000
�L86n}+
P\ Decenter X tolerance on surface 1
gE��#>RM5D TSDX 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
,.eWQK~��� Change in Focus : 0.000000 0.000000
<,o�>Wx*1C Decenter Y tolerance on surface 1
7�C#`6:�tI TSDY 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
b@RHc!,>jV Change in Focus : 0.000000 0.000000
:w}{$v}#D; Tilt X tolerance on surface (degrees) 1
\�(226�^|j TSTX 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
L�,y6^�J!� Change in Focus : 0.000000 0.000000
sn7AR88M; Tilt Y tolerance on surface (degrees) 1
�?
W�J> p� TSTY 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
S$���KFf=0 Change in Focus : 0.000000 0.000000
P96pm6�H_; Decenter X tolerance on surface 2
!.2<�| 24 TSDX 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
720P��jQ�� Change in Focus : 0.000000 0.000000
C{T�A.\� � Decenter Y tolerance on surface 2
m/#a0~d�B TSDY 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
*8~86u GU Change in Focus : 0.000000 0.000000
n�>@o�BG)! Tilt X tolerance on surface (degrees) 2
��}Zl&]e�� TSTX 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
dJ�$"l|$$� Change in Focus : 0.000000 0.000000
)`^p�%�k� Tilt Y tolerance on surface (degrees) 2
[MuEoWrq(} TSTY 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
OL4z%�mDZi Change in Focus : 0.000000 0.000000
s�4&^�D<�� Decenter X tolerance on surface 3
U
qG
.:@T� TSDX 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
��8�r3�A~� Change in Focus : 0.000000 0.000000
UK�9@o�CIB Decenter Y tolerance on surface 3
06jqQ-_`h TSDY 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
���Uj&W<'I Change in Focus : 0.000000 0.000000
d,Y_GCZ7|W Tilt X tolerance on surface (degrees) 3
X,9 �M"E
2 TSTX 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
(�sV�i�\�R Change in Focus : 0.000000 0.000000
S�G6�sw]�x Tilt Y tolerance on surface (degrees) 3
^v�G8#�A}] TSTY 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
�9UvX�C)R1 Change in Focus : 0.000000 0.000000
M���q';�S^ Irregularity of surface 1 in fringes
N !T���W�! TIRR 1 -0.20000000 0.50973587 -0.03429647 0.20000000 0.57333868 0.02930634
!�w&kyW?e Change in Focus : 0.000000 0.000000
R<B7K?SxV~ Irregularity of surface 2 in fringes
��� i�2�~� TIRR 2 -0.20000000 0.53400904 -0.01002330 0.20000000 0.55360281 0.00957047
3fN.�bU9_� Change in Focus : 0.000000 0.000000
OY?y�^45�y Irregularity of surface 3 in fringes
Df3rV�'/~� TIRR 3 -0.20000000 0.58078982 0.03675748 0.20000000 0.49904394 -0.04498840
�R8.C�C1Ix Change in Focus : 0.000000 0.000000
Y�@PI {;!� Index tolerance on surface 1
2NB L���}x TIND 1 -0.00100000 0.52606778 -0.01796456 0.00100000 0.56121811 0.01718578
q^6���+!&" Change in Focus : 0.000000 0.000000
V�!)O�6�?l Index tolerance on surface 2
j0@[�Br�%7 TIND 2 -0.00100000 0.55639086 0.01235852 0.00100000 0.53126361 -0.01276872
O%r;�5�k�P Change in Focus : 0.000000 -0.000000
We�b�|\CH� Mc�PN�B`.H Worst offenders:
RT%�pDym�\ Type Value Criterion Change
2h?uNW(0�Q TSTY 2 -0.20000000 0.35349910 -0.19053324
*L!�!]Q�2c TSTY 2 0.20000000 0.35349910 -0.19053324
)V!d�Bl"Gq TSTX 2 -0.20000000 0.35349910 -0.19053324
L~���s�3b� TSTX 2 0.20000000 0.35349910 -0.19053324
�~a�xj�jv� TSTY 1 -0.20000000 0.42678383 -0.11724851
�W�_0>�y9? TSTY 1 0.20000000 0.42678383 -0.11724851
Z�yE�HzM{$ TSTX 1 -0.20000000 0.42678383 -0.11724851
6~*�9;!t�h TSTX 1 0.20000000 0.42678383 -0.11724851
*Vho?P6y\Y TSTY 3 -0.20000000 0.42861670 -0.11541563
MxB�TX4E�S TSTY 3 0.20000000 0.42861670 -0.11541563
�3"F`ZJ�]= ET��B�6�f� Estimated Performance Changes based upon Root-Sum-Square method:
���!t���i6 Nominal MTF : 0.54403234
�4b:s<$T�Z Estimated change : -0.36299231
j�M\*A#Jo5 Estimated MTF : 0.18104003
`9� {m�r< ��u[{t�b�� Compensator Statistics: %Q!`NCe+[� Change in back focus: }��.��z&P' Minimum : -0.000000 ��5+f�LeC; Maximum : 0.000000 @BNE�iOAZ# Mean : -0.000000 KM`eIw��>8 Standard Deviation : 0.000000 Q�:$����Zy $y�
b4xU�� Monte Carlo Analysis:
g�(#�f:��" Number of trials: 20
��[V}S�<Xp �. BiCBp< Initial Statistics: Normal Distribution
uPniLx\t:� &7_Qd4=08w Trial Criterion Change
T�6~_�Q�}6 1 0.42804416 -0.11598818
UQ4%� �Xp� Change in Focus : -0.400171
u a\,�-��> 2 0.54384387 -0.00018847
"]����\�+? Change in Focus : 1.018470
+���+DG5�` 3 0.44510003 -0.09893230
x|{�I�wA9� Change in Focus : -0.601922
k#5���}\w! 4 0.18154684 -0.36248550
5�^j45�'%I Change in Focus : 0.920681
r#6_]ep}<' 5 0.28665820 -0.25737414
2ZQ}7��`Y� Change in Focus : 1.253875
`�l*;t�`h� 6 0.21263372 -0.33139862
<r3J�0)r�} Change in Focus : -0.903878
ek
N�'�k�� 7 0.40051424 -0.14351809
�O2"�g�j"D Change in Focus : -1.354815
It75R}B��� 8 0.48754161 -0.05649072
M2U&?V� C! Change in Focus : 0.215922
�@9�&P~mo/ 9 0.40357468 -0.14045766
}�@r{?8�Ru Change in Focus : 0.281783
'KPA�S�fC� 10 0.26315315 -0.28087919
�J�nv@�.� Change in Focus : -1.048393
>fIk;6��<{ 11 0.26120585 -0.28282649
?:Bv
iF);/ Change in Focus : 1.017611
�lvp8z�)�G 12 0.24033815 -0.30369419
TFuR@KaBR� Change in Focus : -0.109292
=r���@vc�� 13 0.37164046 -0.17239188
\.g\Zib� ) Change in Focus : -0.692430
~gu3�g^<0v 14 0.48597489 -0.05805744
�)Tm�H�hNo Change in Focus : -0.662040
i.:.���� Y 15 0.21462327 -0.32940907
��Zo��{$� Change in Focus : 1.611296
�ce6__f�5? 16 0.43378226 -0.11025008
EJ�`T�$JD� Change in Focus : -0.640081
h��`MF#617 17 0.39321881 -0.15081353
m%PC8bf`S Change in Focus : 0.914906
Xj*vh
m�%i 18 0.20692530 -0.33710703
�f�J��WC)E Change in Focus : 0.801607
wRrnniqf8� 19 0.51374068 -0.03029165
�HQ{JwW�!m Change in Focus : 0.947293
Y\0�}R,]a- 20 0.38013374 -0.16389860
03j]d&P%d
Change in Focus : 0.667010
w�K}\_2?�� �S'HnBn / Number of traceable Monte Carlo files generated: 20
CwJD�mz\tk 'u` .P:u? Nominal 0.54403234
>� 0<��)= Best 0.54384387 Trial 2
i>_u_�)-� Worst 0.18154684 Trial 4
8�KH\`��5< Mean 0.35770970
Oq3��A#�6~ Std Dev 0.11156454
nQ���GQWg` ZR\V�CVH\^ �L_w+���y Compensator Statistics:
Iz[@^IUx=� Change in back focus:
�d�`�1I".y Minimum : -1.354815
|!F5.%P�Y� Maximum : 1.611296
g&�n��)f�F Mean : 0.161872
p^���iR�PI Standard Deviation : 0.869664
3�R�&lqxhg wd/<
�8>2X 90% > 0.20977951 eX_D/2�5 $ 80% > 0.22748071 b}Z�d)2��G 50% > 0.38667627 {��3!E4"p� 20% > 0.46553746 B:Z_9,gj-N 10% > 0.50064115 jzK5-��;b� s{w[b\r��A End of Run.
+t�2SzQ j> &[&r2��>a� 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
�0c�T*z(�� 
���{�Ha8]y }za[�E>�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
�=�tU{7i*+ !�d&C�>7nb 不吝赐教
