[求助]ansys分析后面型数据如何进行zernike多项式拟合？ [复制链接]

小弟不是学光学的，所以想请各位大侠指点啊！谢谢啦 uXxc2}  
就是我用ansys计算出了镜面的面型的数据，怎样可以得到zernike多项式的系数，然后用zemax各阶得到像差！谢谢啦！ 6.]x@=Wm  

可以用matlab编程，用zernike多项式进行波面拟合，求出zernike多项式的系数，拟合的算法有很多种，最简单的是最小二乘法，你可以查下相关资料，挺简单的

泽尼克多项式的前9项对应象差的

非常感谢啊，我手上也有zernike多项式的拟合的源程序，也不知道对不对，不怎么会有 UL0%oJ#  
function z = zernfun(n,m,r,theta,nflag) RfP>V/jy5  
%ZERNFUN Zernike functions of order N and frequency M on the unit circle. fFG, ^;7-O  
%   Z = ZERNFUN(N,M,R,THETA) returns the Zernike functions of order N n[zP}YRr  
%   and angular frequency M, evaluated at positions (R,THETA) on the ]fH U/%  
%   unit circle.  N is a vector of positive integers (including 0), and -eKi}e  
%   M is a vector with the same number of elements as N.  Each element :r^c_Ui  
%   k of M must be a positive integer, with possible values M(k) = -N(k) 3JuWG\r)l  
%   to +N(k) in steps of 2.  R is a vector of numbers between 0 and 1, S"FIQ&n  
%   and THETA is a vector of angles.  R and THETA must have the same 1i;-mYGaMn  
%   length.  The output Z is a matrix with one column for every (N,M) <I.anIB:U  
%   pair, and one row for every (R,THETA) pair. N 3IF j  
% RhM]OJd'  
%   Z = ZERNFUN(N,M,R,THETA,'norm') returns the normalized Zernike `I$'Lp#5  
%   functions.  The normalization factor sqrt((2-delta(m,0))*(n+1)/pi), \79KU  
%   with delta(m,0) the Kronecker delta, is chosen so that the integral 2#z6=M~A  
%   of (r * [Znm(r,theta)]^2) over the unit circle (from r=0 to r=1, t#s?:  
%   and theta=0 to theta=2*pi) is unity.  For the non-normalized q'kZ3G   
%   polynomials, max(Znm(r=1,theta))=1 for all [n,m]. _=RA-qZ"  
% x\qS|q\N  
%   The Zernike functions are an orthogonal basis on the unit circle. nZ?BCO  
%   They are used in disciplines such as astronomy, optics, and M{Ss?G4H  
%   optometry to describe functions on a circular domain. as\6XW$;Q  
% v,t&t9}/  
%   The following table lists the first 15 Zernike functions. !,}W|(P)  
%
A^+G w\  
%       n    m    Zernike function           Normalization J[9yQ  
%       -------------------------------------------------- =ogzq.+|  
%       0    0    1                                 1 bH}6N>Fp  
%       1    1    r * cos(theta)                    2 4&r+K`C0  
%       1   -1    r * sin(theta)                    2 Kg0Vbzvb  
%       2   -2    r^2 * cos(2*theta)             sqrt(6) V|.3Z\(  
%       2    0    (2*r^2 - 1)                    sqrt(3) H\A!oB,sw  
%       2    2    r^2 * sin(2*theta)             sqrt(6) HC,YmO:df"  
%       3   -3    r^3 * cos(3*theta)             sqrt(8) ODn6%fp%  
%       3   -1    (3*r^3 - 2*r) * cos(theta)     sqrt(8) JZ6{W  
%       3    1    (3*r^3 - 2*r) * sin(theta)     sqrt(8) XGE:ZVpW  
%       3    3    r^3 * sin(3*theta)             sqrt(8) M7"I]$|\  
%       4   -4    r^4 * cos(4*theta)             sqrt(10) /E'cy  
%       4   -2    (4*r^4 - 3*r^2) * cos(2*theta) sqrt(10) ^p#f B4z  
%       4    0    6*r^4 - 6*r^2 + 1              sqrt(5) f$a%&X6"-  
%       4    2    (4*r^4 - 3*r^2) * cos(2*theta) sqrt(10) td^2gjr^5  
%       4    4    r^4 * sin(4*theta)             sqrt(10) Q+/:5Z C  
%       -------------------------------------------------- %)
[mbb  
% QF/A-[V
 
%   Example 1: h4CDZ  
% 2XJn3wPi  
%       % Display the Zernike function Z(n=5,m=1) w[w{~`([",  
%       x = -1:0.01:1;
;2"#X2B  
%       [X,Y] = meshgrid(x,x); YH33E~f  
%       [theta,r] = cart2pol(X,Y); 55xv+|k  
%       idx = r<=1; KE\p|Xi  
%       z = nan(size(X)); |B&KT  
%       z(idx) = zernfun(5,1,r(idx),theta(idx)); V6l*!R  
%       figure g]|K@sm  
%       pcolor(x,x,z), shading interp mIVnc`3s  
%       axis square, colorbar @/}{Trmg/  
%       title('Zernike function Z_5^1(r,\theta)') M0`nr}g  
% 5Cxh>,k  
%   Example 2: BCV<( @c  
% Wj
ZJQK  
%       % Display the first 10 Zernike functions =T5vu~[J/e  
%       x = -1:0.01:1; )&di c6r  
%       [X,Y] = meshgrid(x,x); wH1E7LY|R  
%       [theta,r] = cart2pol(X,Y); xq_%|p}y  
%       idx = r<=1; xlVQ[Mt  
%       z = nan(size(X)); "?_adot5v  
%       n = [0  1  1  2  2  2  3  3  3  3]; G)\s{qk  
%       m = [0 -1  1 -2  0  2 -3 -1  1  3]; )@.
bkzW  
%       Nplot = [4 10 12 16 18 20 22 24 26 28]; Iu6KW:x  
%       y = zernfun(n,m,r(idx),theta(idx)); @AUx%:}0Y:  
%       figure('Units','normalized') !=C4=xv  
%       for k = 1:10 87%t=X  
%           z(idx) = y(:,k); ^_b+
o  
%           subplot(4,7,Nplot(k)) qq}EXq^  
%           pcolor(x,x,z), shading interp
!}wJ+R ^2  
%           set(gca,'XTick',[],'YTick',[]) EqzS={Olj  
%           axis square a5WVDh,cR  
%           title(['Z_{' num2str(n(k)) '}^{' num2str(m(k)) '}']) >B$ZKE  
%       end ~Nf01,F  
% \dj&4u3  
%   See also ZERNPOL, ZERNFUN2. !*\)7D  
MfUG@  
%   Paul Fricker 11/13/2006 N#{d_v^H?d  
/km^IH  
b Jt397  
% Check and prepare the inputs: ]c{Zh?0  
% ----------------------------- a9z|ef  
if ( ~any(size(n)==1) ) || ( ~any(size(m)==1) ) 5;{d*L  
    error('zernfun:NMvectors','N and M must be vectors.') ,Iq+v  
end u2K{3+r`'  
j &)Xi^^  
if length(n)~=length(m) TF 6_4t6  
    error('zernfun:NMlength','N and M must be the same length.') x8%Q TTY  
end a?6 r4u0  
]d?`3{h9LD  
n = n(:); :~loy'  
m = m(:); T/G1v;]  
if any(mod(n-m,2)) Z"Z&X0Oj  
    error('zernfun:NMmultiplesof2', ... $wU.GM$t~  
          'All N and M must differ by multiples of 2 (including 0).') p,}-8#K[  
end
& Sy0Of  
B9|!8V  
if any(m>n) '5wa"/ ?w  
    error('zernfun:MlessthanN', ... V1Dwh@iS  
          'Each M must be less than or equal to its corresponding N.') dA>t  
end #6'oor X  
K^tM$l\  
if any( r>1 | r<0 ) {EbR =  
    error('zernfun:Rlessthan1','All R must be between 0 and 1.') G T#hqt'1x  
end I z~#G6]M  
N kp>yVj  
if ( ~any(size(r)==1) ) || ( ~any(size(theta)==1) ) tu6oa[s  
    error('zernfun:RTHvector','R and THETA must be vectors.') p3I{  
end b!SGQv(^M  
 Y2vzK;  
r = r(:); cv;&ff2%?  
theta = theta(:); w[\*\'Vm0  
length_r = length(r);  'vj45b  
if length_r~=length(theta) leyhiL<  
    error('zernfun:RTHlength', ... t3u"2B7o
G  
          'The number of R- and THETA-values must be equal.') HZCEr6}(  
end Nkn0G_  
I<|)uK7  
% Check normalization: *#e%3N05_  
% -------------------- Da1BxbDeI  
if nargin==5 && ischar(nflag) o%X_V!B{V  
    isnorm = strcmpi(nflag,'norm'); 7CYu"+Ea  
    if ~isnorm R'qB-v.  
        error('zernfun:normalization','Unrecognized normalization flag.') %1SA!1>j  
    end 1i#uKKwE  
else ;YNN)P%"  
    isnorm = false; 0!veLXeK!  
end G/_#zIN`8M  
2<>n8K  
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% E4[ |=<  
% Compute the Zernike Polynomials ZH/^``[.  
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% /A}3kTp  
"C.'_H!Ex  
% Determine the required powers of r: kt%9PGw
 
% ----------------------------------- "o#"u[W,  
m_abs = abs(m); }$#e&&)n  
rpowers = []; KCJ zE>  
for j = 1:length(n) r4dG83qg  
    rpowers = [rpowers m_abs(j):2:n(j)]; pSkP8' ?  
end K`* 8*k{  
rpowers = unique(rpowers); &+6XdhX  
#rMMOu9r2  
% Pre-compute the values of r raised to the required powers, i0{pm q  
% and compile them in a matrix: !1+L0,I6  
% ----------------------------- ma@ws,H  
if rpowers(1)==0  dKDtj:  
    rpowern = arrayfun(@(p)r.^p,rpowers(2:end),'UniformOutput',false); GZ/.eYE  
    rpowern = cat(2,rpowern{:}); I?dh"*Js&  
    rpowern = [ones(length_r,1) rpowern]; y/mxdPw  
else ur={+0 y  
    rpowern = arrayfun(@(p)r.^p,rpowers,'UniformOutput',false); \D?6_ ,O  
    rpowern = cat(2,rpowern{:}); T[U&Y`3g  
end {=IK(H  
(ZQ{%-i?qR  
% Compute the values of the polynomials: GV6!
`@<  
% -------------------------------------- WRZi^B8@  
y = zeros(length_r,length(n)); }cgEC-  
for j = 1:length(n) WqqrfzlM  
    s = 0:(n(j)-m_abs(j))/2; n9gj{]%  
    pows = n(j):-2:m_abs(j); HKv:)h{?  
    for k = length(s):-1:1 tf|/_Y2  
        p = (1-2*mod(s(k),2))* ... $5r[YdnY<  
                   prod(2:(n(j)-s(k)))/              ... GBu&2}  
                   prod(2:s(k))/                     ... |!8[Vg^Wh  
                   prod(2:((n(j)-m_abs(j))/2-s(k)))/ ... f3lFpS  
                   prod(2:((n(j)+m_abs(j))/2-s(k))); `B) ~  
        idx = (pows(k)==rpowers); {5-4^|!  
        y(:,j) = y(:,j) + p*rpowern(:,idx); pA"x4\s  
    end T({:Y. A;  
     T9KzVxHp5  
    if isnorm Z/sB72K1  
        y(:,j) = y(:,j)*sqrt((1+(m(j)~=0))*(n(j)+1)/pi); m46Q%hwV  
    end AR`X2m '  
end K6@QZc5.!  
% END: Compute the Zernike Polynomials gR.zL>=_5e  
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% ;nji<  
1d7oR`qr  
% Compute the Zernike functions: s6OnHX\it7  
% ------------------------------ Mr<2I  
idx_pos = m>0; ~ 61?nu  
idx_neg = m<0; o;
{  
p&B98c  
z = y; e{:P!r aM  
if any(idx_pos) H!4!1J.=xw  
    z(:,idx_pos) = y(:,idx_pos).*sin(theta*m(idx_pos)'); Zq2dCp%  
end n*CH,fih:  
if any(idx_neg) g)!B};AA  
    z(:,idx_neg) = y(:,idx_neg).*cos(theta*m(idx_neg)'); ~;aSX
1   
end qCSJ=T
;  
yX$I<L<Suz  
% EOF zernfun

function z = zernfun2(p,r,theta,nflag) &1%W-&bc6  
%ZERNFUN2 Single-index Zernike functions on the unit circle. Z{EHV7  
%   Z = ZERNFUN2(P,R,THETA) returns the Pth Zernike functions evaluated -. L)-%wIV  
%   at positions (R,THETA) on the unit circle.  P is a vector of positive as)2ny!u  
%   integers between 0 and 35, R is a vector of numbers between 0 and 1, @SDsd^N{2P  
%   and THETA is a vector of angles.  R and THETA must have the same xM9EO(u  
%   length.  The output Z is a matrix with one column for every P-value, zPe4WE|  
%   and one row for every (R,THETA) pair. $/}*HWVZ  
% VE& ?Zd~  
%   Z = ZERNFUN2(P,R,THETA,'norm') returns the normalized Zernike 'v* =}k  
%   functions, defined such that the integral of (r * [Zp(r,theta)]^2) 'BpK(PlUh  
%   over the unit circle (from r=0 to r=1, and theta=0 to theta=2*pi) k[6@\D-  
%   is unity.  For the non-normalized polynomials, max(Zp(r=1,theta))=1 AT<gV/1l  
%   for all p. A5!jrSyv  
% wA+J49  
%   NOTE: ZERNFUN2 returns the same output as ZERNFUN, for the first 36 k.rP}76  
%   Zernike functions (order N<=7).  In some disciplines it is [VT&  
%   traditional to label the first 36 functions using a single mode l\-1W2  
%   number P instead of separate numbers for the order N and azimuthal l:a+o gm3  
%   frequency M. K%Mm'$fTw  
% FviLlly6  
%   Example: ik+qx~+`Qv  
% n <6}  
%       % Display the first 16 Zernike functions A-~#ydv

 
%       x = -1:0.01:1; L5
(rP\B  
%       [X,Y] = meshgrid(x,x); j?i Ur2  
%       [theta,r] = cart2pol(X,Y); &9$0v"`H  
%       idx = r<=1; LZMdW #,[  
%       p = 0:15; )UI$
s"  
%       z = nan(size(X)); [z
]@<99/  
%       y = zernfun2(p,r(idx),theta(idx)); $yIcut7  
%       figure('Units','normalized') }Y(Q7l  
%       for k = 1:length(p) jj0@ez{3  
%           z(idx) = y(:,k); O_nk8  
%           subplot(4,4,k) b,Ed}Ir  
%           pcolor(x,x,z), shading interp }Jk.c~P)  
%           set(gca,'XTick',[],'YTick',[]) u6'vzLmM  
%           axis square Ms<^_\iPN  
%           title(['Z_{' num2str(p(k)) '}']) 95_?F7}9  
%       end 9
r fR  
% }
;+'  
%   See also ZERNPOL, ZERNFUN. 'X_iiR8n@p  
::uD%a zd  
%   Paul Fricker 11/13/2006 %/,PY>:|  
?;0=>3p*0
 
4\pi<#X  
% Check and prepare the inputs: ;Z-Cn.  
% ----------------------------- ;*:d)'A  
if min(size(p))~=1 &O#a==F!(  
    error('zernfun2:Pvector','Input P must be vector.') U;?%rM6  
end |H2{%!  
kI<C\*N  
if any(p)>35 qlIC{:E0  
    error('zernfun2:P36', ... qDM/ 6xO  
          ['ZERNFUN2 only computes the first 36 Zernike functions ' ... k)'hNk"x  
           '(P = 0 to 35).']) $G"PZ7  
end K)]7e?:Wu  
Y:FV+ SI  
% Get the order and frequency corresonding to the function number: X8ev uN  
% ---------------------------------------------------------------- U_ V0  
p = p(:); N;F1Z-9  
n = ceil((-3+sqrt(9+8*p))/2); VD,F?L!  
m = 2*p - n.*(n+2); mbsdiab#N  
,yWTkql  
% Pass the inputs to the function ZERNFUN: ZF51|b  
% ---------------------------------------- uwj/]#`  
switch nargin Oe'Nn250  
    case 3 '# "Z$  
        z = zernfun(n,m,r,theta); J@oGAa%3)  
    case 4 M`FsKK`  
        z = zernfun(n,m,r,theta,nflag); 5w gtc~  
    otherwise la8se=^  
        error('zernfun2:nargin','Incorrect number of inputs.') H#E   
end R# 8D}5[&  
,vrdtL  
% EOF zernfun2

function z = zernpol(n,m,r,nflag) ]RPv@z:V  
%ZERNPOL Radial Zernike polynomials of order N and frequency M. L-Xd3RCD  
%   Z = ZERNPOL(N,M,R) returns the radial Zernike polynomials of &&ecq  
%   order N and frequency M, evaluated at R.  N is a vector of %pc0a^iB  
%   positive integers (including 0), and M is a vector with the <.l5>mgkCw  
%   same number of elements as N.  Each element k of M must be a 3a:(\:?z  
%   positive integer, with possible values M(k) = 0,2,4,...,N(k) B
C(f1  
%   for N(k) even, and M(k) = 1,3,5,...,N(k) for N(k) odd.  R is ,'Y*e[  
%   a vector of numbers between 0 and 1.  The output Z is a matrix kmy?`P10(z  
%   with one column for every (N,M) pair, and one row for every yZb@  
%   element in R. u7^Z7
; J  
% cK(}B_D$  
%   Z = ZERNPOL(N,M,R,'norm') returns the normalized Zernike poly- |O+R%'z'<  
%   nomials.  The normalization factor Nnm = sqrt(2*(n+1)) is XC?H  
%   chosen so that the integral of (r * [Znm(r)]^2) from r=0 to A{>]M@QC2  
%   r=1 is unity.  For the non-normalized polynomials, Znm(r=1)=1 8<^[xe  
%   for all [n,m]. R{#-IH="  
% ,<R/x
[  
%   The radial Zernike polynomials are the radial portion of the 3dcZ1Yrn  
%   Zernike functions, which are an orthogonal basis on the unit n >xhT r<  
%   circle.  The series representation of the radial Zernike Wxjk}&+pVa  
%   polynomials is e:AB!k^xp$  
% *W(b=u  
%          (n-m)/2 bLCrh(<  
%            __ ,PJl32  
%    m      \       s                                          n-2s (-B0fqh=G  
%   Z(r) =  /__ (-1)  [(n-s)!/(s!((n-m)/2-s)!((n+m)/2-s)!)] * r To}L%
)  
%    n      s=0 /p<mD-:.M  
% i2N*3X~  
%   The following table shows the first 12 polynomials. 2EG"xA5%  
% $]|_xG-6{  
%       n    m    Zernike polynomial    Normalization b7aAP*$  
%       --------------------------------------------- /iy2j8:z  
%       0    0    1                        sqrt(2) Bpo~x2p  
%       1    1    r                           2 { zlq6z  
%       2    0    2*r^2 - 1                sqrt(6) 9rn!U2  
%       2    2    r^2                      sqrt(6) ]K XknEaxl  
%       3    1    3*r^3 - 2*r              sqrt(8) sFSrMI#R  
%       3    3    r^3                      sqrt(8) @faf  
%       4    0    6*r^4 - 6*r^2 + 1        sqrt(10) RZOk.~[v  
%       4    2    4*r^4 - 3*r^2            sqrt(10) d>@{!c-  
%       4    4    r^4                      sqrt(10) e Yyl=YW  
%       5    1    10*r^5 - 12*r^3 + 3*r    sqrt(12) (niZN_qv  
%       5    3    5*r^5 - 4*r^3            sqrt(12) }mu8fm'  
%       5    5    r^5                      sqrt(12) BAzc'x&<  
%       --------------------------------------------- -/#3U{O  
% +(PtOo.  
%   Example: p"q-
sMYl  
% ai#EFo+#  
%       % Display three example Zernike radial polynomials #g~~zwx/N  
%       r = 0:0.01:1; uBl&|yvxB  
%       n = [3 2 5]; 3AWB Y.  
%       m = [1 2 1]; *eUL1m8Y  
%       z = zernpol(n,m,r); )byQ=-<1  
%       figure oJ6 d:  
%       plot(r,z) m6lNZb]  
%       grid on d[TcA2nF
 
%       legend('Z_3^1(r)','Z_2^2(r)','Z_5^1(r)','Location','NorthWest') KC}B\~ +  
% cTRCQ+W6:  
%   See also ZERNFUN, ZERNFUN2. H#w?$?nIWu  
5wGyM10  
% A note on the algorithm. yQou8
P=%  
% ------------------------ dr'6N1B@  
% The radial Zernike polynomials are computed using the series ;pAkdX&b  
% representation shown in the Help section above. For many special B-@f.NO/s  
% functions, direct evaluation using the series representation can `e`4
[I  
% produce poor numerical results (floating point errors), because pKr3(5~  
% the summation often involves computing small differences between I62Yg p$K  
% large successive terms in the series. (In such cases, the functions Qf=%%5+?8  
% are often evaluated using alternative methods such as recurrence ZJR{c5TE  
% relations: see the Legendre functions, for example). For the Zernike Yd/qcC(&  
% polynomials, however, this problem does not arise, because the T,WWQm  
% polynomials are evaluated over the finite domain r = (0,1), and t{?_]2vl  
% because the coefficients for a given polynomial are generally all RL)'m  
% of similar magnitude. K''b)v X4  
% >!bYuV
HA  
% ZERNPOL has been written using a vectorized implementation: multiple M~"]h:m&'v  
% Zernike polynomials can be computed (i.e., multiple sets of [N,M] K =7(=Y{  
% values can be passed as inputs) for a vector of points R.  To achieve Kl+
*Sp!  
% this vectorization most efficiently, the algorithm in ZERNPOL 0n(Q@O  
% involves pre-determining all the powers p of R that are required to 0&5}[9?V'  
% compute the outputs, and then compiling the {R^p} into a single JpSS[pOg  
% matrix.  This avoids any redundant computation of the R^p, and i>!f|<  
% minimizes the sizes of certain intermediate variables. f kP WGd  
% ]'M4Unu#@  
%   Paul Fricker 11/13/2006 @XmMD6{<  
aQRZyE}  
!knYD}Rxd  
% Check and prepare the inputs: $f)Y !<b
C  
% ----------------------------- )dlt$VX  
if ( ~any(size(n)==1) ) || ( ~any(size(m)==1) ) k]f73r  
    error('zernpol:NMvectors','N and M must be vectors.') a,
}{f]  
end ](Sp0t  
dFFB\|e;0  
if length(n)~=length(m) JVXBm]  
    error('zernpol:NMlength','N and M must be the same length.') }>tUkXlhJ<  
end 0K#dWc}"a  
`8'|g8,wb0  
n = n(:); 08.dV<P  
m = m(:); B<0lif|  
length_n = length(n); DOR
FK  
@``!P&h  
if any(mod(n-m,2)) $6Ty~.RP5H  
    error('zernpol:NMmultiplesof2','All N and M must differ by multiples of 2 (including 0).') BF]b\/I  
end 7J 0!vq  
i5_gz>  
if any(m<0) L[O+9Yh  
    error('zernpol:Mpositive','All M must be positive.') ,u\M7,a^  
end ueqR@i  
P@*whjPmo  
if any(m>n) vWj|[| <rX  
    error('zernpol:MlessthanN','Each M must be less than or equal to its corresponding N.') IHB{US1G  
end 5gEUE{S  
OSq"q-Q  
if any( r>1 | r<0 ) 2QBq  
    error('zernpol:Rlessthan1','All R must be between 0 and 1.') )IhI~,0Nmj  
end q@^=im  
xpSMbX{e  
if ~any(size(r)==1) +  1v@L  
    error('zernpol:Rvector','R must be a vector.') /yH:ur
 
end l(<o,Uv[`  
pX2 Ki^)]  
r = r(:); Y> 7/>x6  
length_r = length(r); rV1JJ.I  
*.Kc-f4mP  
if nargin==4 J#JZ^59lOS  
    isnorm = ischar(nflag) & strcmpi(nflag,'norm'); O(!wDnhc  
    if ~isnorm &&>OhH`  
        error('zernpol:normalization','Unrecognized normalization flag.') .CmwR$u&  
    end FC)aR[  
else ogQbST  
    isnorm = false; 'rz*mR8  
end 8"p>_K=  
M%6{A+(  
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% tq1h1  
% Compute the Zernike Polynomials `U?;9!|;6  
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% X,gXgxP\  
*S<>_R 8  
% Determine the required powers of r: [kn`~
hI  
% ----------------------------------- C96|T>bk  
rpowers = [];
-6DfM,  
for j = 1:length(n) Z*kg= hs^  
    rpowers = [rpowers m(j):2:n(j)]; w3B*%x)  
end %>pglI  
rpowers = unique(rpowers); pU}>}  
kgYa0 e5  
% Pre-compute the values of r raised to the required powers, *6=[Hmygi  
% and compile them in a matrix: 44b'40  
% ----------------------------- T!J\Dm-  
if rpowers(1)==0 jaNkWTm:  
    rpowern = arrayfun(@(p)r.^p,rpowers(2:end),'UniformOutput',false); )eUb@Eu  
    rpowern = cat(2,rpowern{:}); X
$cW!a  
    rpowern = [ones(length_r,1) rpowern]; Kb{  
else \N7 E!
82  
    rpowern = arrayfun(@(p)r.^p,rpowers,'UniformOutput',false); 9 ?h)U|J?G  
    rpowern = cat(2,rpowern{:}); ?p6+?\H  
end jJg 'Y:K9q  
<A!v'Y  
% Compute the values of the polynomials: |J~;yO SD  
% -------------------------------------- ^<ayPV)+  
z = zeros(length_r,length_n); 4qiG>^h9  
for j = 1:length_n GHH1jJ_[7  
    s = 0:(n(j)-m(j))/2; I~#'76L[  
    pows = n(j):-2:m(j); %*:-4K  
    for k = length(s):-1:1 g+)T\_#u  
        p = (1-2*mod(s(k),2))* ... py@5]n%  
                   prod(2:(n(j)-s(k)))/          ... ,mjwQ6:Ny  
                   prod(2:s(k))/                 ... Qt!l-/flh  
                   prod(2:((n(j)-m(j))/2-s(k)))/ ... :?yv0Iu  
                   prod(2:((n(j)+m(j))/2-s(k))); FFP>Y*v(  
        idx = (pows(k)==rpowers); +&Sf$t 1  
        z(:,j) = z(:,j) + p*rpowern(:,idx); $t[`}I }  
    end E!jM&\Zj  
     RqH"+/wR  
    if isnorm K4A=lD+  
        z(:,j) = z(:,j)*sqrt(2*(n(j)+1)); vek9. 4! ]  
    end ])
T*T$u  
end eK4\v:oG1  
l[rIjyL@  
% EOF zernpol

这三个文件，我不知道该怎样把我的面型节点的坐标及轴向位移用起来，还烦请指点一下啊，谢谢啦！

我也正在找啊

我也一直想了解这个多项式的应用，还没用过呢

guapiqlh:我也一直想了解这个多项式的应用，还没用过呢 (2014-03-04 11:35)  Q Bc\=}  

oQBfDD0  
数值分析方法看一下就行了。其实就是正交多项式的应用。zernike也只不过是正交多项式的一种。 J'sVT{@GS  
>t.2!Z_RQ  
07年就写过这方面的计算程序了。