Given an amount of points in x and y I want to create splines that intersect all points and that have the same slopes in intersections.
My approach has been to establish a set of equations for intersection of points as well as dictating equal slopes at intersections and then use fsolve() to determine coefficients.
However, when plotting the found splines they do not have the same slopes at intersecting points though they do intersect the correct points given in x and y.
I have been trying to debug this script for most of two days now without any luck. Can someone point out why my splines are not getting the correct slopes? Or can it be that fsolve() quits before a satisfactory solution has been found?
result = fsolve(@(K) eqns(x,y,K) , ones(1,(size(x,1)-1)*3) ); %Calls eqns() in eqns.m A = result(1 : size(x,1)-1 ); B = result(size(x,1) : 2*size(x,1)-2 ); C = result(2*size(x,1)-1 : 3*size(x,1)-3 ); %Plot splines splinePts = size(A,2)*100; x_spline = [0 : x(end)/splinePts : x(end)]; fx = ones(splinePts,1); for i = 1:size(A,2) for j = 1:100 k = i*100-100 + j; fx(k) = A(i) * x_spline(k)^2 + B(i) * x_spline(k) + C(i); end end plot(fx);
function fcns=eqns(x,y,K) A = K(1 : size(x,1)-1 ); %Coefficients for X^2 B = K(size(x,1) : 2*size(x,1)-2); %Coefficients for X C = K(2*size(x,1)-1 : 3*size(x,1)-3); %Constants %Equations for hitting all points syms H; temp = H; %Initiate variable for containing equations. for i = 1:size(B,2) temp(end+1) = eqn(x(i),y(i),A,B,C,i); %Calls eqn() in eqn. temp(end+1) = eqn(x(i+1),y(i+1),A,B,C,i); end %Equations for slopes at spline intersections syms X; temp(end+1) = subs( diff(eqn(X,0,A,B,C,1),X) - 0 , 'X' , x(1) ); for i = 1:size(A,2)-1 temp(end+1) = subs( diff(eqn(X,1,A,B,C,i),X) - diff(eqn(X,1,A,B,C,i+1),X) , 'X' , x(i)+1 ); end fcns = double( temp(2:end) ); end
function fcn=eqn(X,Y,A,B,C,i) fcn = A(i)*X^2 + B(i)*X + C(i) - Y; end