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How to define the step size of steepest-descent method and update the step size simultaneously in multiple variable function?

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Jinghua Li
Jinghua Li le 24 Nov 2016
Clôturé : Walter Roberson le 24 Nov 2016
How to define the step size of steepest descent method and update the step size simultaneously in multiple variable function? As following, the initial value of 2-dimensional object function are x0 and y0, but if i view { (x1’,y1’), (x2’,y2’) … (xn’,yn’) } as the initial value and i view f=[(x1-2)^2+(y1-4)^2]*[(x2-2)^2+(y2-4)^2]…[(xn-2)^2+(yn-4)^2] as the object function.how to apply steepest-descent method to f? (For (x1,y1) lamda1 is its step size,for (x2,y2) lamda1 is its step size,… for (xn,yn) lamda1 is its step size.)
function [ R,n ] = steel(x0,y0,eps ) syms x; syms y; f=(x-2)^2+(y-4)^2; v=[x,y]; j=jacobian(f,v);%计算梯度 T=[subs(j(1),x,x0),subs(j(2),y,y0)]; temp=sqrt((T(1))^2+(T(2))^2); x1=x0; y1=y0; n=0; syms kk; while(temp>eps) d=T;%计算下降方向 f1=x1+kk*d(1); f2=y1+kk*d(2); fT=[subs(j(1),x,f1),subs(j(2),y,f2)]; fun=sqrt((T(1))^2+(T(2))^2); fun1=vpa(fun); x0=x1-0.1*d(1); y0=y1-0.1*d(2); T=[subs(j(1),x,x0),subs(j(2),y,y0)]; temp=sqrt((T(1))^2+(T(2))^2); temp1=vpa(temp); x1=x0; y1=y0; n=n+1; end R=double([x0,y0]);
end

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