我现在在初学zemax的
公差分析,找了一个双胶合
透镜 'M��8aW�!~ !h��CS#�'� 
as�r=m{C�" vX+�.e1�m 然后添加了默认公差分析,基本没变
WL �l_'2�h g�g[�9��u- 
XJSa]P^B1� �0�z`�/Hn 然后运行分析的结果如下:
>,"�sHm}l% ;�i��\C]* Analysis of Tolerances
rJQ�=9�qn\ � H4:ZTl_$ File : E:\光学设计资料\zemax练习\f500.ZMX
�B'�}"AC" Title:
N�b;H`<JP� Date : TUE JUN 21 2011
',ZF5T�5z@ WPo:�^BD � Units are Millimeters.
bLbR I�Y"l All changes are computed using linear differences.
:p>�hW�!�~ \d�cdw*�v@ Paraxial Focus compensation only.
A�59�gIp*> ewn�f�eg�1 WARNING: Solves should be removed prior to tolerancing.
d~@q%�-`lA r`��6:Q&�& Mnemonics:
/v#)f-N%zs TFRN: Tolerance on curvature in fringes.
^ve14mbF#. TTHI: Tolerance on thickness.
hj!+HHYS�k TSDX: Tolerance on surface decentering in x.
Lj�aG�yj>) TSDY: Tolerance on surface decentering in y.
5�G(E�&>�~ TSTX: Tolerance on surface tilt in x (degrees).
�8>N�wCj�N TSTY: Tolerance on surface tilt in y (degrees).
+xp]:�h��| TIRR: Tolerance on irregularity (fringes).
Ei5��wel6! TIND: Tolerance on Nd index of refraction.
mS%4gx~~_n TEDX: Tolerance on element decentering in x.
+Ok%e.\�ZM TEDY: Tolerance on element decentering in y.
�oNM�?y:O TETX: Tolerance on element tilt in x (degrees).
bik*ZC�?�E TETY: Tolerance on element tilt in y (degrees).
\Q&,�IS�O\ &yIG�r`�;� WARNING: RAY AIMING IS OFF. Very loose tolerances may not be computed accurately.
g97�]Y1g� �S�fB8!V|; WARNING: Boundary constraints on compensators will be ignored.
@{�d\j]Nw� 2)
��?q�58 Criterion : Geometric
MTF average S&T at 30.0000 cycles per mm
NfzF.�{nh� Mode : Sensitivities
9+q�OP>m�� Sampling : 2
C�O���^Jz� Nominal Criterion : 0.54403234
3`F) AWzdr Test Wavelength : 0.6328
mfom=�-q3k :%�X Ls�,� n~g��LP�HY Fields: XY Symmetric Angle in degrees
�s8<gK.atl # X-Field Y-Field Weight VDX VDY VCX VCY
w%a8XnW�]1 1 0.000E+000 0.000E+000 1.000E+000 0.000 0.000 0.000 0.000
��x�/mp=
� �YF[f ���Z Sensitivity Analysis:
+(?>-�3_�z qOy=�O
[+9 |----------------- Minimum ----------------| |----------------- Maximum ----------------|
qp�p��/8�M Type Value Criterion Change Value Criterion Change
C#Bz��>2;# Fringe tolerance on surface 1
xT*d/Oa�w� TFRN 1 -1.00000000 0.54257256 -0.00145977 1.00000000 0.54548607 0.00145374
1n=_�y� o� Change in Focus :
-0.000000 0.000000
UM�MB0(0D� Fringe tolerance on surface 2
�>v+�j�h(^ TFRN 2 -1.00000000 0.54177471 -0.00225762 1.00000000 0.54627463 0.00224230
+��K~NV�?c Change in Focus : 0.000000 0.000000
|�/`%3'4H� Fringe tolerance on surface 3
��e3[:D�5� TFRN 3 -1.00000000 0.54779866 0.00376632 1.00000000 0.54022572 -0.00380662
�Yu3zM79'k Change in Focus : -0.000000 0.000000
/)>��S<�X� Thickness tolerance on surface 1
kc$)^�E��7 TTHI 1 3 -0.20000000 0.54321462 -0.00081772 0.20000000 0.54484759 0.00081525
)9v`f�9X){ Change in Focus : 0.000000 0.000000
xJ�wG=$�o� Thickness tolerance on surface 2
TN�wK��da+ TTHI 2 3 -0.20000000 0.54478712 0.00075478 0.20000000 0.54327558 -0.00075675
gTf|�^?vd Change in Focus : 0.000000 -0.000000
bzZ>�ly�H Decenter X tolerance on surfaces 1 through 3
\3XqH�f3|o TEDX 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
�$�V>yXhTh Change in Focus : 0.000000 0.000000
Biwie��F4x Decenter Y tolerance on surfaces 1 through 3
K^[#]�+�nQ TEDY 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
��$_;e>*+x Change in Focus : 0.000000 0.000000
Q<(YP.���k Tilt X tolerance on surfaces 1 through 3 (degrees)
`#mK*Buem} TETX 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
�l$xxrb9P! Change in Focus : 0.000000 0.000000
,*svtw:2') Tilt Y tolerance on surfaces 1 through 3 (degrees)
��G"�S�BYU TETY 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
�Wp�0
Dq( Change in Focus : 0.000000 0.000000
2� �QTZw�x Decenter X tolerance on surface 1
tt_o$D~kg TSDX 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
s5&�@Cx�zl Change in Focus : 0.000000 0.000000
*�Oj�Kc�s� Decenter Y tolerance on surface 1
'lz�"2@4{� TSDY 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
G}d�-(X��� Change in Focus : 0.000000 0.000000
)��c�2�_b Tilt X tolerance on surface (degrees) 1
Z|�lU�8`'5 TSTX 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
q2�aYEuu, Change in Focus : 0.000000 0.000000
w'T�q�3-%V Tilt Y tolerance on surface (degrees) 1
�S$q�=��;" TSTY 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
U(>4�s]O�6 Change in Focus : 0.000000 0.000000
�u.XQ���&� Decenter X tolerance on surface 2
9�!',�b>C6 TSDX 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
oqd;6[��%G Change in Focus : 0.000000 0.000000
Z8O n%Mx{" Decenter Y tolerance on surface 2
NpP')m!`} TSDY 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
�yay�<G�P? Change in Focus : 0.000000 0.000000
\nNXxTxX!� Tilt X tolerance on surface (degrees) 2
K>Fq�f
�+_ TSTX 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
n�/d��`q�S Change in Focus : 0.000000 0.000000
g=L]��S-�e Tilt Y tolerance on surface (degrees) 2
YY(�(#"o;l TSTY 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
\Q?�i�p&R� Change in Focus : 0.000000 0.000000
N�"tF�P9;K Decenter X tolerance on surface 3
�y9H�%
Xl� TSDX 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
�gV;��H6"� Change in Focus : 0.000000 0.000000
4R�^�m��I� Decenter Y tolerance on surface 3
�+n0r0:z�0 TSDY 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
Lkr�uL�_E> Change in Focus : 0.000000 0.000000
S0,R�_d'�) Tilt X tolerance on surface (degrees) 3
$@-P5WcR�s TSTX 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
�s8"8y��`u Change in Focus : 0.000000 0.000000
ipnV�$!z � Tilt Y tolerance on surface (degrees) 3
*D}�0�[|O TSTY 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
Fxs;F����p Change in Focus : 0.000000 0.000000
tc�;�'oMUP Irregularity of surface 1 in fringes
��S^@S%Eg� TIRR 1 -0.20000000 0.50973587 -0.03429647 0.20000000 0.57333868 0.02930634
Dr&('�RZ�4 Change in Focus : 0.000000 0.000000
f
3V Dv9( Irregularity of surface 2 in fringes
gN8�hJG'0� TIRR 2 -0.20000000 0.53400904 -0.01002330 0.20000000 0.55360281 0.00957047
{Bs~lC���$ Change in Focus : 0.000000 0.000000
!�3n)|~r;K Irregularity of surface 3 in fringes
2,2�Z`�X� TIRR 3 -0.20000000 0.58078982 0.03675748 0.20000000 0.49904394 -0.04498840
P�t:e!qX�) Change in Focus : 0.000000 0.000000
GG�064zPq7 Index tolerance on surface 1
8
;d$54
b� TIND 1 -0.00100000 0.52606778 -0.01796456 0.00100000 0.56121811 0.01718578
Ix@&�$!�'k Change in Focus : 0.000000 0.000000
=uk�0@hy9b Index tolerance on surface 2
z<sg0K8z63 TIND 2 -0.00100000 0.55639086 0.01235852 0.00100000 0.53126361 -0.01276872
H`bS�YjgM! Change in Focus : 0.000000 -0.000000
�"I?Am&>�' :bV mgLgG� Worst offenders:
�l�:�0s2 Type Value Criterion Change
q\��Q{�sv_ TSTY 2 -0.20000000 0.35349910 -0.19053324
{e[%;W%�c& TSTY 2 0.20000000 0.35349910 -0.19053324
'|]e<Mt-� TSTX 2 -0.20000000 0.35349910 -0.19053324
:P,sxDlG)� TSTX 2 0.20000000 0.35349910 -0.19053324
uzmk��6G
v TSTY 1 -0.20000000 0.42678383 -0.11724851
]�xC#rwHUC TSTY 1 0.20000000 0.42678383 -0.11724851
LZJ�A4��?C TSTX 1 -0.20000000 0.42678383 -0.11724851
�Q?ahr~q�o TSTX 1 0.20000000 0.42678383 -0.11724851
Q$&� s�T�M TSTY 3 -0.20000000 0.42861670 -0.11541563
E�#J';tUQ� TSTY 3 0.20000000 0.42861670 -0.11541563
CTt ��v�yr � ~\�,w� { Estimated Performance Changes based upon Root-Sum-Square method:
D��0�k
8^� Nominal MTF : 0.54403234
{2/�L�R�PT Estimated change : -0.36299231
2X�TPBZN�e Estimated MTF : 0.18104003
]-oJ[5cQ0v �|�b-9b&�� Compensator Statistics: !TZhQior�C Change in back focus: N8qDdr9p?c Minimum : -0.000000 Wcb7
;~K�� Maximum : 0.000000 z�,q�R�cO& Mean : -0.000000 ] h-,o
R?e Standard Deviation : 0.000000 5w��%_$x�� \k;`}3��uO Monte Carlo Analysis:
� Q~R
~�xz Number of trials: 20
,Nnh�Hb�2\
�R�ZM"~ 0 Initial Statistics: Normal Distribution
�}�X x(^Zh 56^�+;^f^` Trial Criterion Change
;^*Unyt[4] 1 0.42804416 -0.11598818
hjaT^(Y��� Change in Focus : -0.400171
�8��N:�owK 2 0.54384387 -0.00018847
!d<"nx[�2` Change in Focus : 1.018470
D:k�3"
E"S 3 0.44510003 -0.09893230
o�]nw�0q?
Change in Focus : -0.601922
NCx�q�h��< 4 0.18154684 -0.36248550
D9`0Dr}/2� Change in Focus : 0.920681
x~.:�6���4 5 0.28665820 -0.25737414
&]
�\�X�]p Change in Focus : 1.253875
J]m{�b09�F 6 0.21263372 -0.33139862
da1]mb=4 5 Change in Focus : -0.903878
k�>t�)g-,2 7 0.40051424 -0.14351809
? uYu`Ojzr Change in Focus : -1.354815
Sy�A�vKd`g 8 0.48754161 -0.05649072
�UzX�E_�S� Change in Focus : 0.215922
�[tM�Z G%h 9 0.40357468 -0.14045766
��4iW'k�uK Change in Focus : 0.281783
2o>)7^9|#< 10 0.26315315 -0.28087919
�vG \a1H�� Change in Focus : -1.048393
�,J`'Y+7W 11 0.26120585 -0.28282649
y���p��J". Change in Focus : 1.017611
n@ w^�V �� 12 0.24033815 -0.30369419
RI�68�%ZoL Change in Focus : -0.109292
Wrr����cx( 13 0.37164046 -0.17239188
?"z]A7�<Hj Change in Focus : -0.692430
��B||���;' 14 0.48597489 -0.05805744
G_>�#J�s�� Change in Focus : -0.662040
)DY��I
��. 15 0.21462327 -0.32940907
W8�lx~:�v Change in Focus : 1.611296
w8g,�a]p�� 16 0.43378226 -0.11025008
�e<�/$� �s Change in Focus : -0.640081
AfG/JW�So} 17 0.39321881 -0.15081353
�jy]Ji�Q�B Change in Focus : 0.914906
p{P�E@KO�: 18 0.20692530 -0.33710703
'#(v�=|�J Change in Focus : 0.801607
%,hV�[[�@. 19 0.51374068 -0.03029165
��:�ss,Hl Change in Focus : 0.947293
{O|'���U'� 20 0.38013374 -0.16389860
���!Q�DQ_� Change in Focus : 0.667010
Y�?ez9o:/# |+�`c3*PV� Number of traceable Monte Carlo files generated: 20
W>q H�FoKa �+za8�=`2o Nominal 0.54403234
c1�%H�4j4/ Best 0.54384387 Trial 2
"�B�_K
�XL Worst 0.18154684 Trial 4
H�cc"b0>}{ Mean 0.35770970
>5Wlc�$bc Std Dev 0.11156454
�5��e
sQ;� rHP%0f��9: bFA!=uv�A Compensator Statistics:
h�DV20&�hq Change in back focus:
�F @T�e@�n Minimum : -1.354815
"*,X�L
uv> Maximum : 1.611296
�%F k��Mv� Mean : 0.161872
L28*1]�\Jh Standard Deviation : 0.869664
�t%530�EB3 �M>M�`baM1 90% > 0.20977951 zD�3m�X<sw 80% > 0.22748071 m�rV!��teP 50% > 0.38667627 0euuT@�_$� 20% > 0.46553746 V'w@rc\XN� 10% > 0.50064115 kh%{C]�".1 �?YeWH
�WM End of Run.
�=TqQbad�p ?8W�(�"W�� 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
9:I6( Zv�0 
��/x{s5P�3 $ "Bh��]�- 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
e)��E�$}�4 �J<Pw+6B�~ 不吝赐教
