我现在在初学zemax的
公差分析,找了一个双胶合
透镜 �-V||1@
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2*zMLI0. ul\FZT �4� 然后添加了默认公差分析,基本没变
*,wW�-��8 '8|joj>G=� 
�Wk]E6yz�6 oCB#i~|>�a 然后运行分析的结果如下:
Bo/i =/7%� [ _&���z�+ Analysis of Tolerances
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;.~��D!� W1O �Y}2kj File : E:\光学设计资料\zemax练习\f500.ZMX
� �+qyx3c+ Title:
�^]�$rh.7& Date : TUE JUN 21 2011
Y�,�X0x- � �eak+8UR�o Units are Millimeters.
P)UpUMt�;k All changes are computed using linear differences.
'�Y>@t6E4� qkq�^o�H�I Paraxial Focus compensation only.
/qXP��\ �a z-`4DlJU�S WARNING: Solves should be removed prior to tolerancing.
!�Ee�&e~�" :tL�Mh08�h Mnemonics:
;-kg3fGB1Q TFRN: Tolerance on curvature in fringes.
`W4Is~VVv� TTHI: Tolerance on thickness.
h� ?+vH{}j TSDX: Tolerance on surface decentering in x.
�<��&}�N[� TSDY: Tolerance on surface decentering in y.
oh >0}Gc�8 TSTX: Tolerance on surface tilt in x (degrees).
.c��_qMTm" TSTY: Tolerance on surface tilt in y (degrees).
4I;$��a;R! TIRR: Tolerance on irregularity (fringes).
Qr[�"�.�>+ TIND: Tolerance on Nd index of refraction.
\�0^Je>-:U TEDX: Tolerance on element decentering in x.
o��F5~|�&C TEDY: Tolerance on element decentering in y.
��4��z�f(� TETX: Tolerance on element tilt in x (degrees).
tnw6[U!rh= TETY: Tolerance on element tilt in y (degrees).
�S!7|vb*ko r7����*'s� WARNING: RAY AIMING IS OFF. Very loose tolerances may not be computed accurately.
`����AhTER $eh�>.c'&] WARNING: Boundary constraints on compensators will be ignored.
g<M�CvC@��
4-q8:�5�� Criterion : Geometric
MTF average S&T at 30.0000 cycles per mm
<�#7�j~�< Mode : Sensitivities
i7xBi:Si� Sampling : 2
�qLm
g18� Nominal Criterion : 0.54403234
[L>AU;�
�: Test Wavelength : 0.6328
�n�gH_�p�> !��ziO�1U� Yf�x'�7�gj Fields: XY Symmetric Angle in degrees
Ert`�
�]s~ # X-Field Y-Field Weight VDX VDY VCX VCY
P64<�O�5l/ 1 0.000E+000 0.000E+000 1.000E+000 0.000 0.000 0.000 0.000
o1u?�H�4z� &+8cI^�kp� Sensitivity Analysis:
I>s�pJ5ls -&r ���A<j |----------------- Minimum ----------------| |----------------- Maximum ----------------|
�RMBPm*H�� Type Value Criterion Change Value Criterion Change
�� 76EMS?e Fringe tolerance on surface 1
�z�T� jk�^ TFRN 1 -1.00000000 0.54257256 -0.00145977 1.00000000 0.54548607 0.00145374
UN`O*(k[ Change in Focus :
-0.000000 0.000000
�>�/DlxYG? Fringe tolerance on surface 2
R�"��[U<^ TFRN 2 -1.00000000 0.54177471 -0.00225762 1.00000000 0.54627463 0.00224230
�-l� q,~`v Change in Focus : 0.000000 0.000000
x=VLRh%Gvl Fringe tolerance on surface 3
Y� �kc�N- TFRN 3 -1.00000000 0.54779866 0.00376632 1.00000000 0.54022572 -0.00380662
C�YN��|��� Change in Focus : -0.000000 0.000000
~_"/\;��1� Thickness tolerance on surface 1
[xg&�`x9,. TTHI 1 3 -0.20000000 0.54321462 -0.00081772 0.20000000 0.54484759 0.00081525
�:<�`po4/ Change in Focus : 0.000000 0.000000
$oH?7s��j Thickness tolerance on surface 2
B�}S�l1�)E TTHI 2 3 -0.20000000 0.54478712 0.00075478 0.20000000 0.54327558 -0.00075675
O\)rp��!i� Change in Focus : 0.000000 -0.000000
�<I^Tug\M+ Decenter X tolerance on surfaces 1 through 3
�kV�+O��|9 TEDX 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
f#�zm}�+,` Change in Focus : 0.000000 0.000000
�L2^M#�G@t Decenter Y tolerance on surfaces 1 through 3
#N `�Z)}Jm TEDY 1 3 -0.20000000 0.54401464 -1.7700E-005 0.20000000 0.54401464 -1.7700E-005
x8E�!K�o]( Change in Focus : 0.000000 0.000000
�I�?%�i�J% Tilt X tolerance on surfaces 1 through 3 (degrees)
��
.�'^Pg TETX 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
OG�}m+�K&< Change in Focus : 0.000000 0.000000
F�<A[S�"�� Tilt Y tolerance on surfaces 1 through 3 (degrees)
`'M}.q,k~� TETY 1 3 -0.20000000 0.54897548 0.00494314 0.20000000 0.54897548 0.00494314
|f��g{F�pc Change in Focus : 0.000000 0.000000
I]J��z[{~1 Decenter X tolerance on surface 1
�44(l1xEN+ TSDX 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
^j�Z4�tH3K Change in Focus : 0.000000 0.000000
haIH �`S�Y Decenter Y tolerance on surface 1
B�]�5G�"4, TSDY 1 -0.20000000 0.53999563 -0.00403671 0.20000000 0.53999563 -0.00403671
K�q2,J&Ca3 Change in Focus : 0.000000 0.000000
�o<8=@� ^T Tilt X tolerance on surface (degrees) 1
M��Ln�\�b0 TSTX 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
$&��[}+??� Change in Focus : 0.000000 0.000000
fs
w��Q�*� Tilt Y tolerance on surface (degrees) 1
XK�epk? �E TSTY 1 -0.20000000 0.42678383 -0.11724851 0.20000000 0.42678383 -0.11724851
v�6`TbIq�% Change in Focus : 0.000000 0.000000
u}I\!-EX!v Decenter X tolerance on surface 2
uGH>|V9�'c TSDX 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
{�9*k \d/; Change in Focus : 0.000000 0.000000
@��XFy�^?� Decenter Y tolerance on surface 2
�DZ~qk+,�I TSDY 2 -0.20000000 0.51705427 -0.02697807 0.20000000 0.51705427 -0.02697807
x6={�)�t�j Change in Focus : 0.000000 0.000000
.3yx�g}E>{ Tilt X tolerance on surface (degrees) 2
Ud�[Zv?tA: TSTX 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
�l9S�x�'<� Change in Focus : 0.000000 0.000000
�0NMekV�i� Tilt Y tolerance on surface (degrees) 2
+Q6}k�bD�I TSTY 2 -0.20000000 0.35349910 -0.19053324 0.20000000 0.35349910 -0.19053324
�1dahVc�1W Change in Focus : 0.000000 0.000000
RkuPMs
Hw; Decenter X tolerance on surface 3
�DKxzk~sOM TSDX 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
V8{5 y
<Y> Change in Focus : 0.000000 0.000000
-<Z��s�7( Decenter Y tolerance on surface 3
3G�)Wmmh"a TSDY 3 -0.20000000 0.53419039 -0.00984195 0.20000000 0.53419039 -0.00984195
s �j{�i��� Change in Focus : 0.000000 0.000000
fd}
U����l Tilt X tolerance on surface (degrees) 3
KM�;'Ml��O TSTX 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
[ex��I�K� Change in Focus : 0.000000 0.000000
_.�y0�QkwV Tilt Y tolerance on surface (degrees) 3
�W�bW@V_rr TSTY 3 -0.20000000 0.42861670 -0.11541563 0.20000000 0.42861670 -0.11541563
�Ot�#�O];3 Change in Focus : 0.000000 0.000000
=UW�!
7OzC Irregularity of surface 1 in fringes
T,eP&I�N�� TIRR 1 -0.20000000 0.50973587 -0.03429647 0.20000000 0.57333868 0.02930634
Y��sz&/ry Change in Focus : 0.000000 0.000000
DoA+B�wq�@ Irregularity of surface 2 in fringes
�,Bg�)p_B TIRR 2 -0.20000000 0.53400904 -0.01002330 0.20000000 0.55360281 0.00957047
|��p"E0a�v Change in Focus : 0.000000 0.000000
=Vm"2g�,aA Irregularity of surface 3 in fringes
g1��s\6�%g TIRR 3 -0.20000000 0.58078982 0.03675748 0.20000000 0.49904394 -0.04498840
kt�*""&��R Change in Focus : 0.000000 0.000000
8V$��:th(' Index tolerance on surface 1
>uN)��O��- TIND 1 -0.00100000 0.52606778 -0.01796456 0.00100000 0.56121811 0.01718578
#A '|O\RGP Change in Focus : 0.000000 0.000000
Ow\dk^\-G8 Index tolerance on surface 2
�#}�Qz�u~� TIND 2 -0.00100000 0.55639086 0.01235852 0.00100000 0.53126361 -0.01276872
&�58+-j�zW Change in Focus : 0.000000 -0.000000
E�1uyMh-dy z�rg#BXj7
Worst offenders:
`�Z:�5��E� Type Value Criterion Change
v8�>�?�,N# TSTY 2 -0.20000000 0.35349910 -0.19053324
��a*Oc:$�� TSTY 2 0.20000000 0.35349910 -0.19053324
G�c�s��e�q TSTX 2 -0.20000000 0.35349910 -0.19053324
|/R)�FT�#i TSTX 2 0.20000000 0.35349910 -0.19053324
{:;5�9�9l� TSTY 1 -0.20000000 0.42678383 -0.11724851
;�Xw'WMb*= TSTY 1 0.20000000 0.42678383 -0.11724851
B8'e,�9 �� TSTX 1 -0.20000000 0.42678383 -0.11724851
8��;��C_@ TSTX 1 0.20000000 0.42678383 -0.11724851
�mu�?�6Phj TSTY 3 -0.20000000 0.42861670 -0.11541563
"
�tUS>�c/ TSTY 3 0.20000000 0.42861670 -0.11541563
!F�_�BLHig �9�$u'2TV Estimated Performance Changes based upon Root-Sum-Square method:
�Z�`�=[hu� Nominal MTF : 0.54403234
cJnAwIs_e` Estimated change : -0.36299231
e)�Wpq�a�I Estimated MTF : 0.18104003
g{}{gBplnl x�A-u%Vf7@ Compensator Statistics: �^K#PcPF-j Change in back focus: eXqS9`zK�r Minimum : -0.000000 cCoa3U��/ Maximum : 0.000000 �$�]�Vv�u{ Mean : -0.000000 G�s�%� cod Standard Deviation : 0.000000 v&NC` �dVR ]�}~[2k�.� Monte Carlo Analysis:
8U5L�|Ny.q Number of trials: 20
��RvQ�l{aL zdo�J+zRtK Initial Statistics: Normal Distribution
>B�j+!)96q �tCJ+O�U5/ Trial Criterion Change
$cx�ulcay= 1 0.42804416 -0.11598818
YB^[�HE\#y Change in Focus : -0.400171
f�<`�is+"� 2 0.54384387 -0.00018847
Z*����}5M4 Change in Focus : 1.018470
}T}9AQ��}| 3 0.44510003 -0.09893230
B~�o;�,�} Change in Focus : -0.601922
��me+F0:L� 4 0.18154684 -0.36248550
!8Rsz:7^�- Change in Focus : 0.920681
�nnV(MB4z1 5 0.28665820 -0.25737414
b0�A*zQA_) Change in Focus : 1.253875
]��5+d�b�0 6 0.21263372 -0.33139862
�J��5N�z< Change in Focus : -0.903878
��i,{�'}�B 7 0.40051424 -0.14351809
+$hqwNh@Z@ Change in Focus : -1.354815
d�Q�5_=(�9 8 0.48754161 -0.05649072
�3�9|4�)1e Change in Focus : 0.215922
m�eHn�T9a^ 9 0.40357468 -0.14045766
!��f\q0Gnl Change in Focus : 0.281783
U9d0nj9 j 10 0.26315315 -0.28087919
�&vf%�E@< Change in Focus : -1.048393
�|6%�B2I&c 11 0.26120585 -0.28282649
�%V>Ss9;/8 Change in Focus : 1.017611
t4a/\{/#9| 12 0.24033815 -0.30369419
q��H�3|x08 Change in Focus : -0.109292
BrdHTk= Vy 13 0.37164046 -0.17239188
`kn �'RZR Change in Focus : -0.692430
L"w%�� ew� 14 0.48597489 -0.05805744
�#bqc}�h9 Change in Focus : -0.662040
�x��:h0/f 15 0.21462327 -0.32940907
\,�-t�]$�9 Change in Focus : 1.611296
]}3�AP!�:� 16 0.43378226 -0.11025008
C��n�JrJ>l Change in Focus : -0.640081
h��P�=^�JH 17 0.39321881 -0.15081353
:|�s!_G��< Change in Focus : 0.914906
s&<6{AU(id 18 0.20692530 -0.33710703
�K8sge�X|� Change in Focus : 0.801607
qP�"+SVq�C 19 0.51374068 -0.03029165
nhfHY-l}�7 Change in Focus : 0.947293
g�D"]��uj< 20 0.38013374 -0.16389860
/�'�V(F* g Change in Focus : 0.667010
�]��wH,534 ���vo9DmW Number of traceable Monte Carlo files generated: 20
Op&�i6V}<s �t�:D�Zo�w Nominal 0.54403234
Zf�P�WH�'P Best 0.54384387 Trial 2
d-=RS]j;j� Worst 0.18154684 Trial 4
��Me�XzWLH Mean 0.35770970
0w0\TWz*�� Std Dev 0.11156454
CCC�d=s��. �Xkn��p*(9 uM!$�`�JN� Compensator Statistics:
i8F^�� N=� Change in back focus:
Qi
3���d�i Minimum : -1.354815
B�O#X��Q,� Maximum : 1.611296
.?L&k|wX-� Mean : 0.161872
Uxla,CCp-� Standard Deviation : 0.869664
c�s�]N%M^s ��~�uF�%�* 90% > 0.20977951 y4%�u<��/� 80% > 0.22748071 3{gD'�y4�j 50% > 0.38667627 :ET05MFs\# 20% > 0.46553746 pz��X684� 10% > 0.50064115 ���V� Ae@P
1o&�]��=( End of Run.
RTPxAp+\5� -d�CM�
e�C 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
�MIbl���x� 
Q9-o$4#�R[ W�'�3&��\} 是大于0.6左右的,难道我按照这个默认的公差来加工的话,只有10%的才可能大于0.5?那太低了啊,请问这该怎么进行进一步处理。或者之前哪有问题
f�OE8{O^�W >k:BG{$Kae 不吝赐教
