But this is a difficult thing for multiple reasons. There clearly is noise in both variables, so an errors in variables problem. These are classically difficult problems to solve. Next, the two variables are scaled dramatically differently. So any smoothing in the x variable will overwhelm y.
x = [1536.5481 1566.4674 1501.5181 1531.5818 1631.3671 1631.0238 1614.7418 1618.1639 1589.9281 1589.6050 1605.2854 1581.2317 1625.7908 1618.1263 1545.4797 1549.7091 1438.2362 1557.2871 1525.0092 1472.9464 1373.4078 1425.7688 1312.1053 1239.4050 1210.2449 1171.1703 1165.6056 1074.7808 1065.6233 -248.93562 -167.40446 -164.76059 -126.13679 -120.86833 -166.72931 -134.69136 1045.9526 1005.8028 938.80090 -38.630116 -35.228153 12.393751 23.498005 103.81524 192.35429 245.67119 304.68271 313.25061 772.24829 1182.0425 1142.4915 1301.7898 1279.6500 1254.1230 1297.6682 1224.3103 1283.0277];
y = [0.123966942148760 0.115702479338843 0.107438016528926 0.102479338842975 0.100826446280992 0.0975206611570248 0.0892561983471074 0.0876033057851240 0.0859504132231405 0.0793388429752066 0.0776859504132231 0.0743801652892562 0.0727272727272727 0.0694214876033058 0.0677685950413223 0.0661157024793388 0.0628099173553719 0.0611570247933884 0.0595041322314050 0.0578512396694215 0.0528925619834711 0.0495867768595041 0.0479338842975207 0.0462809917355372 0.0363636363636364 0.0264462809917355 0.0247933884297521 0.0231404958677686 0.0214876033057851 0.0198347107438017 0.0181818181818182 0.266115702479339 0.264462809917355 0.262809917355372 0.261157024793388 0.259504132231405 0.257851239669422 0.254545454545455 0.0115702479338843 0.00991735537190083 0.00826446280991736 0.252892561983471 0.251239669421488 0.249586776859504 0.247933884297521 0.242975206611570 0.239669421487603 0.238016528925620 0.236363636363636 0.234710743801653 0.221487603305785 0.203305785123967 0.201652892561983 0.196694214876033 0.195041322314050 0.188429752066116 0.183471074380165 0.175206611570248 0.171900826446281];
whos x y
And, of course, the two vectors are not even the same lengths. Sigh. It looks like two vectors were chosen from different data sets, or something. So for the same of having something to look at, I'll zap out two points from y at random.
y([20 30]) = [];
Next, I would normalize the two variables to have roughly the same units. We can re-scale the fit at the end.
xscale = std(x);
yscale = std(y);
xhat = x/xscale;
yhat = y/yscale;
plot(xhat,yhat,'o')
Next, a real problem here is this is not a single-valued function of x, and barely so if we look at x(y), flipping the axes. So I'm going to do a coordinate change, moving to polar coordinates around a point somewhere in the middle.
x0 = 1;y0 = 1.5;
[theta,r] = cart2pol(xhat - x0,yhat - y0);
Next, plot the result, in the form of r(theta)
plot(theta,r,'o')
p = fit(theta',r','poly6')
plot(p,theta,r)
That seems reasonable enough. A higher order polynomial would be too much. Note that I carefully scaled the data so that at least moderately high order polynomials are not an issue. 6 is not too bad here. Please don't get carried away with the idea, as degree 15 polynomials will almost always be a problem.
Now we can reconstruct the curve and plot it back in the original coordinate system.
thetapred = linspace(min(theta),max(theta),500)';
rpred = p(thetapred);
[xpred,ypred] = pol2cart(thetapred,rpred);
xpred = (xpred + x0)*xscale;
ypred = (ypred + y0)*yscale;
plot(x,y,'bo',xpred,ypred,'r-')
And that seems as good as we can hope for. With slightly more effort, I might have used a smoothing spline, or a regression spline of some sort, but this is surely adequate, as long as I did not overdo the polynomial degree.
