matlab中函数拟合方法—个人总结.doc

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目 录 一维插值方案 2 二维数据内插值(表格查找) 3 等高线 4 三维曲面 5 等高线2 6 三维曲面2 7 matlab绘制温度场(尚未深入研究) 13 二维曲线（非线性）拟合步骤 18 三维曲线（非线性）拟合步骤 19 三维曲线的画法 20 三维曲面的画法 21 画三维图3 只有点的数据,没有函数关系式 23 空间点拟合的基本原理 27 空间点拟合的最小二乘法 28 曲面生成后再进行多项式拟合 37 六点生成曲面 38 四点生成平面 39 用三维离散点拟合光滑曲面1 40 用三维离散点拟合光滑曲面2 40 一维插值方案 clear year = 1900:10:2010; product = [75.995 91.972 105.711 123.203 131.669 150.697 179.323 203.212 226.505 249.633 256.344 267.893 ] p1995 = interp1(year,product,1995) %使用一维数据内插值(该题中只能在1900和2010之间进行插值,大于2010和小于1900都%无效)命令 x = 1900:1:2010 y = interp1(year,product,x,'spine'); plot(year,product,'o',x,y) 插值说明: interp1(x,Y,xi,method) %用指定的算法计算插值： ’nearest’：最近邻点插值，直接完成计算； ’linear’：线性插值（缺省方式），直接完成计算； ’spine’：三次样条函数插值。对于该方法，命令interp1 调用函数spline、ppval、mkpp、umkpp。这些命令生成一系列用于分段多项式操作的函 数。命令spline 用它们执行三次样条函数插值； ’pchip’：分段三次Hermite 插值。对于该方法，命令interp1 调用函数pchip，用于对向量x 与y 执行分段三次内插值。该方法保留单调性与 数据的外形； ’cubic’：与’pchip’操作相同； ’v5cubic’：在MATLAB 5.0 中的三次插值。 对于超出x 范围的xi 的分量，使用方法’nearest’、’linear’、’v5cubic’的插值算法，相应地将返回NaN。对其他的方法，interp1 将对超出的分量执行外插值算法。 yi = interp1(x,Y,xi,method,'extrap') %对于超出x 范围的xi 中的分量将执行特殊的外插值法extrap。 yi = interp1(x,Y,xi,method,extrapval) %确定超出x 范围的xi 中的分量的外插值extrapval，其值通常取NaN 或0。 例1 clear; x = 0:10; y = x.*sin(x); xx = 0:.25:10; yy = interp1(x,y,xx) plot(x,y,'kd',xx,yy) interp2 二维数据内插值(表格查找) [X,Y] = meshgrid(-3:.25:3); Z = peaks(X,Y); [XI,YI] = meshgrid(-3:.125:3); ZZ = interp2(X,Y,Z,XI,YI); surfl(X,Y,Z);hold on; surfl(XI,YI,ZZ+15) axis([-3 3 -3 3 -5 20]); shading flat hold off 功能 三维数据插值interp3（查表） [x,y,z,v] = flow(20); [xx,yy,zz] = meshgrid(.1:.25:10, -3:.25:3, -3:.25:3); vv = interp3(x,y,z,v,xx,yy,zz); slice(xx,yy,zz,vv,[6 9.5],[1 2],[-2 .2]); shading interp;colormap cool 等高线 clear Z=peaks for w=1:1:100 V=[w/10,0,w/10] contour(Z,V) %C=contour(Z,V) %Clabel(C) Hold on title('等高线及其标注') end end 三维曲面 x=0:10 y=0:.1:1 [d,B]=meshgrid(x,y) z=1./(B.*d.^2+1); surf(B,d,z) x=0:0.05:10 y=0:0.05:1 [X,Y]=meshgrid(x,y) Z=( X.^3+ 3.*Y.^2+5*Y); %Z=( X.^2+ 3.*Y.^3+5*Y);% surf(X,Y,Z) %一张普通的三维曲面,有时需要旋转一下才能看到下图的结果; x=0:0.05:1 y=0:0.05:1 [X,Y]=meshgrid(x,y) Z=( X.^2-Y.^2);% Z=( 4*X.^3*Y-4*X.*Y.^3); surf(X,Y,Z) %一张普通的三维曲面,有时需要旋转一下才能看到下图的结果; 等高线2 clear x=-2:0.1:2 y=-2:0.1:2 [X,Y]=meshgrid(x,y) Z=(X.^2+Y.^2).^0.5 for w=1:1:100 V=[w/3,w/pi,w/3] contour(Z,V) hold on end 三维曲面2 clear x=-5:0.05:5 y=-5:0.05:5 [X,Y]=meshgrid(x,y) Z=1./((X+1).^2+(Y+1).^2+1)-1.5./((X-1).^2+(Y-1).^2+1) mesh(X,Y,Z) clear; A=[1.486,3.059,0.1;2.121,4.041,0.1;2.570,3.959,0.1;3.439,4.396,0.1; 4.505,3.012,0.1;3.402,1.604,0.1;2.570,2.065,0.1;2.150,1.970,0.1; 1.794,3.059,0.2;2.121,3.615,0.2;2.570,3.473,0.2;3.421,4.160,0.2; 4.271,3.036,0.2;3.411,1.876,0.2;2.561,2.562,0.2;2.179,2.420,0.2; 2.757,3.024,0.3;3.439,3.970,0.3;4.084,3.036,0.3;3.402,2.077,0.3; 2.879,3.036,0.4;3.421,3.793,0.4;3.953,3.036,0.4;3.402,2.219,0.4; 3.000,3.047,0.5;3.430,3.639,0.5;3.822,3.012,0.5;3.411,2.385,0.5; 3.103,3.012,0.6;3.430,3.462,0.6;3.710,3.036,0.6;3.402,2.562,0.6; 3.224,3.047,0.7;3.411,3.260,0.7;3.542,3.024,0.7;3.393,2.763,0.7]; x=A(:,1);y=A(:,2);z=A(:,3); scatter(x,y,5,z)%散点图 figure [X,Y,Z]=griddata(x,y,z,linspace(1.486,4.271)',linspace(1.604,4.276),'v4');%插值 pcolor(X,Y,Z);shading interp%伪彩色图 figure,contourf(X,Y,Z) %等高线图 clear; A=[1.486,3.059,1858;2.121,4.041, 1858;2.570,3.959, 1858;3.439,4.396, 1858; 4.505,3.012, 1858;3.402,1.604, 1858;2.570,2.065, 1858;2.150,1.970, 1858; 1.794,3.059,2350;2.121,3.615, 2350;2.570,3.473, 2350;3.421,4.160, 2350; 4.271,3.036, 2350;3.411,1.876, 2350;2.561,2.562, 2350;2.179,2.420, 2350; 2.757,3.024, 2600;3.439,3.970, 2600;4.084,3.036, 2600;3.402,2.077, 2600; 2.879,3.036, 2849;3.421,3.793, 2849;3.953,3.036, 2849;3.402,2.219, 2849; 3.000,3.047, 3010;3.430,3.639, 3010;3.822,3.012, 3010;3.411,2.385, 3010; 3.103,3.012, 3345;3.430,3.462, 3345;3.710,3.036, 3345;3.402,2.562, 3345; 3.224,3.047, 3629;3.411,3.260, 3629;3.542,3.024, 3629;3.393,2.763, 3629]; x=A(:,1);y=A(:,2);z=A(:,3); scatter(x,y,5,z)%散点图,5是点的大小 figure %打开显示图的界面 [X,Y,Z]=griddata(x,y,z,linspace(1.486,4.271)',linspace(1.604,4.276),'v4');%插值 pcolor(X,Y,Z);shading interp%伪彩色图 figure;contourf(X,Y,Z) %等高线图 figure;mesh(X,Y,Z) A=[1.109,1.059,1718;2.021,0.841, 1758;2.870,0.359, 1858;4.039,0.196, 1838; 4.505,3.012, 3345;3.402,1.604, 3347;2.570,2.065, 3629;2.150,1.970, 3330; 1.794,3.059,2250;2.121,3.615, 3027;2.570,3.473, 2935;3.421,4.160, 1930; 4.271,3.036, 2050;3.411,1.876, 3144;2.561,2.562, 3739;2.179,2.420, 1950; 2.757,3.024, 3530;3.439,3.970, 2720;4.084,3.036, 2610;3.402,2.077, 3500; 2.879,3.036, 3249;3.421,3.793, 2149;3.953,3.036, 2849;3.402,2.219, 2849; 3.000,3.047, 3010;3.430,3.639, 3010;3.822,3.012, 2310;3.411,2.385, 3410; 3.103,3.012, 3345;3.430,3.462, 3845;3.710,3.036, 2645;3.402,2.562, 2745; 3.224,3.047, 3229;3.411,3.260, 3329;3.542,3.024, 3429;3.393,2.763, 3529]; x=A(:,1);y=A(:,2);z=A(:,3); scatter(x,y,5,z)%散点图,5是点的大小 figure %打开显示图的界面 [X,Y,Z]=griddata(x,y,z,linspace(1.486,4.271)',linspace(1.604,4.276),'v4');%插值 pcolor(X,Y,Z);shading interp%伪彩色图 figure;contourf(X,Y,Z) %等高线图 figure;mesh(X,Y,Z) A=[1.109,1.059,0.4874;2.021,0.841,0.5643;2.870,0.359,0.4628;4.039,0.196,0.4411; 4.505,3.012,0.4845;3.402,1.604,0.7857;3.570,3.565,0.7071;2.150,4.870,0.4284; 1.794,3.059,1.0000;2.121,3.615,0.8544;2.570,3.473,1.0000;3.421,4.160,0.5447; 4.271,3.036,0.5643;3.411,1.876,0.8771;2.561,2.562,1.0000;2.179,2.420,1.0000; 2.757,3.024,1.0000;3.439,3.970,0.6008;4.084,3.036,0.6325;3.402,2.077,0.9713; 2.879,3.036,1.0000;3.421,3.793,0.6667;3.953,3.036,0.6727;3.402,2.219,1.0000; 3.000,3.047,1.0000;3.430,3.639,0.7036;3.822,3.012,0.7180;3.411,4.215,0.5199; 1.103,4.612,0.3962;3.430,3.462,0.7857;3.710,3.036,0.7692;3.802,2.462,0.7670; 3.424,3.247,0.8771;3.511,3.060,0.8944;4.342,2.724,0.5522;3.803,2.903,0.7352]; x=A(:,1);y=A(:,2);z=A(:,3); scatter(x,y,5,z)%散点图,5是点的大小 figure %打开显示图的界面 [X,Y,Z]=griddata(x,y,z,linspace(1.486,4.271)',linspace(1.604,4.276),'v4');%插值 pcolor(X,Y,Z);shading interp%伪彩色图 figure;contourf(X,Y,Z) %等高线图 figure;mesh(X,Y,Z) matlab绘制温度场(尚未深入研究) clear echo on d1=43;d2=7;dx=0.15;dy=0.1;xy=dx/dy;yx=dy/dx; t=zeros(d1,d2);t1=ones(d1,d2);t0=zeros(d1,d2); x=zeros(d1);y=zeros(d2); x(1)=0;x(2)=dx/2; for i=3:d1-1; x(i)=x(i-1)+dx; end x(d1)=(d1-2)*dx; y(1)=0;y(2)=dy/2; for i=3:d2-1; y(i)=y(i-1)+dy; end y(d2)=(d2-2)*dy; t1=20*ones(d1,d2); t=zeros(d1); dt=0.1;ttt=30; %nnn=tt/dt; echo off %for iii=1:nnn % ttt=iii*dt; tf=30;af=6.6;af=1/af;bta=-6.6;v=0.0625; tin=100;tout=100;d=0.05;l=6; for i=1:42; if x(i)<v*ttt t1(i,1)=tin+(300-tout)*x(i)/(v*ttt); elseif x(i)>v*ttt+28*d t1(i,1)=300-(300-tout)*(x(i)-v*ttt-28*d)/(l-28*d-v*ttt); else zz=-0.123*(x(i)-v*ttt)/d-3.52*exp(-0.123*(x(i)-v*ttt)/d); t1(i,1)=10060*exp(zz); end end for i=1:41; for j=2:6 t1(i,j)=t1(i,1)-10*(j-1); end end for iii=1:500; t0=t1; cd=1300;a=0.0003; an=[1.69,-0.594,0.401,-0.168,0.027,-0.037,0.046,-0.05, 0.039,-0.012]; bn=[0, 0.333, 0.017,-0.131,0.054,0.0003,0.007,-0.012,0.026,0]; fncp=zeros(d1,d2); for i=1:10; fncp=an(i)*cos(i*pi/9*t1)+bn(i)*sin(i*pi/9*t1)+fncp; end fncp=fncp/4.1868; b=1.3e-6;c=1.5e-9; fnk=(a+b*t1+c*t1.^2)*360; for i=2:42; for j=2:6; fnae(i,j)=2*yx*fnk(i,j)*fnk(i+1,j)/(fnk(i,j)+fnk(i+1,j)); fnaw(i,j)=2*yx*fnk(i,j)*fnk(i-1,j)/(fnk(i,j)+fnk(i-1,j)); fnan(i,j)=2*xy*fnk(i,j)*fnk(i,j+1)/(fnk(i,j)+fnk(i,j+1)); fnas(i,j)=2*xy*fnk(i,j)*fnk(i,j-1)/(fnk(i,j)+fnk(i,j-1)); end end fnap0=cd*fncp*dx*dy/dt; fnbb=fnap0.*t1; %for i=2:41 % for j=1:5 % t1(i,j)=t(i,1)-10*(j-1); % end % end % t0=t1; kk=af+0.5*dx/fnk(1,2); bb=fnbb(2,2)+tf*dy/kk; ap=fnae(2,2)+fnan(2,2)+fnap0(2,2)+dy/kk+2*xy*fnk(2,1)-bta*dx*dy; fff=fnae(2,2)*t1(3,2)+fnan(2,2)*t1(2,3)+2*xy*fnk(2,1)*t1(2,1)+bb; t1(2,2)=fff/ap; for j=3:5; kk=af+0.5*dx/fnk(1,j); bb=fnbb(2,j)+tf*dy/kk; ap=fnae(2,j)+fnas(2,j)+fnan(2,j)+fnap0(2,j)+dy/kk-bta*dx*dy; fff=fnae(2,j)*t1(3,j)+fnan(2,j)*t1(2,j+1)+fnas(2,j)*t1(2,j-1)+bb; t1(2,j)=fff/ap; end kk1=af+0.5*dx/fnk(1,6); kk2=af+0.5*dy/fnk(1,6); bb=fnbb(2,6)+tf*dy/kk1+tf*dx/kk2; ap=fnae(2,6)+fnas(2,6)+fnap0(2,6)+dy/kk1+dx/kk2-bta*dx*dy; fff=fnae(2,6)*t1(3,6)+fnas(2,6)*t1(2,5)+bb; t1(2,6)=fff/ap; for i=3:40; for j=2:6; if j==2; as=2*xy*fnk(i,1); fff=fnae(i,2)*t1(i+1,2)+fnaw(i,2)*t1(i-1,2)+fnan(i,2)*t1(i,3)+as*t1(i,1)+fnbb(i,2); ap=fnae(i,2)+fnaw(i,2)+fnan(i,2)+as+fnap0(i,2)+dy/kk-bta*dx*dy; t1(i,2)=fff/ap; elseif j==6 kk=af+0.5*dy/fnk(i,6); bb=fnbb(i,6)+tf*dx/kk; fff=fnae(i,6)*t1(i+1,6)+fnaw(i,6)*t1(i-1,6)+fnas(i,6)*t1(i,4)+bb; ap=fnae(i,6)+fnaw(i,6)+fnas(i,6)+fnap0(i,6)+dx/kk-bta*dx*dy; t1(i,5)=fff/ap; else fff=fnae(i,j)*t1(i+1,j)+fnaw(i,j)*t1(i-1,j)+fnan(i,j)*t1(i,j+1)+fnas(i,j)*t1(i,j-1)+fnbb(i,j); ap=fnae(i,j)+fnaw(i,j)+fnan(i,j)+fnas(i,j)+fnap0(i,j)-bta*dx*dy; t1(i,j)=fff/ap; end end end for j=3:5; kk=af+0.5*dx/fnk(42,j); bb=fnbb(41,j)+tf*dy/kk; ap=dy/kk+fnaw(41,j)+fnan(41,j)+fnas(41,j)+fnap0(41,j)-bta*dx*dy; fff=fnaw(41,j)*t1(40,j)+fnan(41,j)*t1(41,j+1)+fnas(41,j)*t1(41,j-1)+bb; t1(41,j)=fff/ap; end kk1=af+0.5*dx/fnk(42,6); kk2=af+0.5*dy/fnk(41,7); bb=fnbb(41,6)+tf*dy/kk1+tf*dx/kk2; ap=fnaw(41,6)+fnas(41,6)+fnap0(41,6)+dy/kk1+dx/kk2-bta*dx*dy; fff=fnaw(41,6)*t1(40,6)+fnas(41,6)*t1(41,5)+bb; t1(41,6)=fff/ap; kk=af+0.5*dx/fnk(42,2); bb=fnbb(41,2)+tf*dy/kk; ap=fnaw(41,2)+fnan(41,2)+fnap0(41,2)+dy/kk+2*xy*fnk(41,1)-bta*dx*dy; fff=fnaw(41,2)*t1(40,2)+fnan(41,2)*t1(41,3)+2*xy*fnk(41,1)*t1(41,1)+bb; t1(41,2)=fff/ap; if abs(abs(t1)-abs(t0))<20; break; %else %t1=t0+0.5*(t1-t0); end end %if rem(iii,10)==0 figure subplot(3,2,1) t111=t1'; %mesh(t111); %view(2); pcolor(t111); subplot(3,2,5) ccc=contour(t111,[200,400,600,800,1000]); %ccc=contour(t111,5); clabel(ccc); %end % 将平面网格映射到三维网格面上 x1=1:7; y1=1:43; [X1,Y1]=meshgrid(y1,x1); %绘制加密前三维网格 subplot(3,2,3); mesh(X1,Y1,t111); % 用二元差值公式将网格加密并绘出温度场的三维图 x2=1:.25:7; y2=1:.25:43; [X2,Y2]=meshgrid(y2,x2); Z2=griddata(X1,Y1,t111,X2,Y2); t111=round(t111); subplot(3,2,4); mesh(X2,Y2,Z2) % 绘制加密后的平面网格 subplot(3,2,2); pcolor(Z2) % 绘制加密后的温度场等高线图 subplot(3,2,6) CCC=contour(Z2,[100,200,300,400,500,600,700,800,900,1000]); clabel(CCC); % end %下面输入平板中某点坐标以查看此点温度 a1=input('请输入你要查看温度的点的X轴坐标值（范围为1到169）'); b1=input('请输入你要查看温度的点的Y轴坐标值（范围为1到25）'); disp('输入坐标值为'),a1,b1 a2=round((a1+3)/4); b2=round((b1+3)/4); disp('计算出网格加密前坐标点的温度为') Q1=(t111(b2,a2)) display('计算出网格加密后坐标点的温度为') Q2= Z2(b1,a1) 二维曲线（非线性）拟合步骤 1. 建立函数 function F = myfun(x,xdata) %F = x(1)*xdata.^2 + x(2)*sin(xdata) + x(3)*xdata.^3; F = x(1)+x(2)*xdata.^2 + x(3)*sin(xdata) + x(4)*xdata.^3; % 这个函数的可以是任意的,这个要%根据实际情况自己来选; 2.然后给出数据xdata和ydata xdata = -1.0:0.5:2.0; ydata = [-4.447,-0.452,0.551,0.048,-0.447,0.549,4.552]; x0 = [10, 10, 10,1]; %初始估计值,可以随意给,有了这个初值后matlab才能进行迭代, 这是matlab的迭代的初始条件, 这个初始条件与结果无关; % [ ]中的初值的数量要和myfun中x(1) x(2) x(3) x(4)的数量一致才行 %拟合函数的表达式: [x,resnorm] = lsqcurvefit(@myfun,x0,xdata,ydata) %回车后; x = 0.5491 -2.9977 -0.0000 1.9991 x结果即为myfun 中对应的x(1) x(2) x(3) x(4)的值；这样就得到了所求的多项式的系数, resnorm是在x处残差的平方和, 在workpsace中可以查到, resnorm=sum ((fun(x,xdata)-ydata).^2)， 函数建立成功后,在matlab输入的程序如下; clear;%可以有,也可以没有,最好有. xdata = -1.0:0.5:2.0; ydata = [-4.447,-0.452,0.551,0.048,-0.447,0.549,4.552]; x0 = [10, 10, 10, 1]; %初始估计值 [x,resnorm] = lsqcurvefit(@myfun,x0,xdata,ydata) 怎么样,很简单吧? 如果不想编写函数的话也可以将最后一句话改为: [x,resnorm] = lsqcurvefit(@(x,xdata)x(1)+x(2)*xdata.^2 + x(3)*sin(xdata) + x(4)*xdata.^3,x0,xdata,ydata);这样就不用编写函数了; 三维曲线（非线性）拟合步骤 1 设定目标函数. （M函数书写）% 可以是任意的 例如： function f=mydata(a,data) %y的值目标函数值 或者是第三维的,a=[a(1) ，a(2)] 列向量 x=data(1,:); %data 是一2维数组，x=x1 y=data(2,:); %data 是一2维数组，x=x2 f=a(1)*x+a(2)*x.*y; %这里的a(1)， a(2)为目标函数的系数值。 f的值相当于ydata的值 2 然后给出数据xdata和ydata的数据和拟合函数lsqcurvefit 例如： x1=[1.0500 1.0520 1.0530 1.0900 1.0990 1.1020 1.1240 1.1420... 1.1490 1.0500 1.0520 1.0530 1.0900 1.0990 1.1020 1.1240 1.1420 1.1490]; x2=[3.8500 1.6500 2.7500 5.5000 7.7000 3.3000 4.9500 8.2500 11.5500... 1.6500 2.7500 3.8500 7.7000 3.3000 5.5000 8.2500 11.5500 4.9500]; ydata=[56.2000 62.8000 62.2000 40.8000 61.4000 57.5000 44.5000 54.8000... 53.9000 64.2000 62.9000 64.1000 63.0000 62.2000 64.2000 63.6000... 52.5000 62.0000]; data=[x1;x2]; %类似于将x1 x2整合成一个2维数组。 a0= [-0.0014,0.07]; option=optimset('MaxFunEvals',5000); format long; [a,resnorm]=lsqcurvefit(@mydata,a0,data,ydata,[],[],option); yy=mydata(a,data); result=[ydata' yy' (yy-ydata)'] 将数据按列的形式排列:第一列是yadata; 第二列是yadata(根据拟合函数得到的计算值);第三列是上述二者的插值; ' 这个符号实现了数据按列进行排列的功能;这个符号后面有空格 result = 56.200000000000003 57.919539361940053 1.719539361940051 62.799999999999997 60.487127691642989 -2.312872308357008 62.200000000000003 59.314824360714432 -2.885175639285571 40.799999999999997 58.216478553229628 17.416478553229631 61.399999999999999 56.130116906144998 -5.269883093855000 57.500000000000000 61.431449491527204 3.931449491527204 44.500000000000000 60.688766221557501 16.188766221557501 54.799999999999997 57.659418794420404 2.859418794420407 53.899999999999999 53.987090284681393 0.087090284681395 64.200000000000003 60.372133152305260 -3.827866847694743 62.899999999999999 59.258494992850515 -3.641505007149483 64.099999999999994 58.085023760117025 -6.014976239882969 63.000000000000000 55.670452618469561 -7.329547381530439 62.200000000000003 61.264213240642817 -0.935786759357185 64.200000000000003 58.857393913448675 -5.342606086551328 63.600000000000001 56.750601335313952 -6.849398664686049 52.500000000000000 53.658187210710317 1.158187210710317 62.000000000000000 62.038605327908876 0.038605327908876 % a的值为拟合的目标函数的参数值 利用lsqcurvefit进行拟合的 它完整的语法形式是： % [x,resnorm,residual,exitflag,output,lambda,jacobian] =lsqcurvefit(fun,x0,xdata,ydata,lb,ub,options) 三维曲线的画法 三维空间