I know the algorithm is correct, because when I manually do the process, the results are correct.
The algorithm is correct analytically, but is not stable numerically.
How I do evaluate a function handle in other function handle
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이전 댓글 표시
I define the next function:
function [v] = f_deriv(f,x,y,n)
%f is a function of two variables
%x,y is a number
%n is the number of proccess that I need to do
p_y=@(f,x,y) (f(x,y+0.0001) - f(x,y-0.0001))/(2*0.0001);
p_x=@(f,x,y) (f(x+0.0001,y) - f(x-0.0001,y))/(2*0.0001);
y_p=f(x,y);
for i=1:n
g=@(x,y) f(x,y)*p_y(f,x,y) + p_x(f,x,y);
f=@(x,y) g(x,y)
end
v=f(x,y)
end
This function has a input f, like 
(f=@((x,y) y -x^2 +1), and want to has as output $f^n(x,y)$ (the nth derivative of f, where y depends of x)
(f=@((x,y) y -x^2 +1), and want to has as output $f^n(x,y)$ (the nth derivative of f, where y depends of x)The steps that I follow to solve this problem are:
First, I define the function p_y and p_x that is the partial derivate aproximation of f. (
)
)Next, I define a y_p that is the function f evaluated in (x,y)
And, I define the function g, which is the 
(p_x + p_y*y_p)
(p_x + p_y*y_p)Finally, I want to evaluate n times the function g_k in the same function, something like this:
or something like that:
g_1=@(x,y) f(x,y)*p_y(f,x,y) + p_x(f,x,y);
g_2=@(x,y) g_1(x,y)*p_y(g_1,x,y) + p_x(g_1,x,y);
.
.
.
g_n=@(x,y) g_n-1(x,y)*p_y(g_(n-1),x,y) + p_x(g_(n-1),x,y);
But, when I use the code first I have incorrect results for n> 2. I know the algorithm is correct, because when I manually do the process, the results are correct
A example to try the code, is using f_deriv(@((x,y) y -x^2 +1,0,0.5,n), and for n=1, the result that would be correct is 1.5. For n=2,the result that would be correct is -0.5, for n=3. the result that would be correct is -0.5....
Someone could help me by seeing what the errors are in my code?, or does anyone know any better way to calculate partial derivatives without using the symbolic?
답변 (4개)
Steven Lord
2019년 11월 15일
g_1=@(x,y) y_p*p_y(f,x,y) + p_x(f,x,y);
g_2=@(x,y) y_p*p_y(g_1,x,y) + p_x(g_1,x,y);
.
.
.
g_n=@(x,y) y_p*p_y(g_(n-1),x,y) + p_x(g_(n-1),x,y);
g_n(x,y)
Rather than using numbered variables, store your function handles in a cell array. That will make it easier for you to refer to previous functions.
f = @(x) x;
g = cell(1, 10);
g{1} = f;
for k = 2:10
% Don't forget to _evaluate_ the previous function g{k-1} at x
%
% g{k} = @(x) k + g{k-1} WILL NOT work
g{k} = @(x) k + g{k-1}(x);
end
g{10}([1 2 3]) % Effectively this returns [1 2 3] + sum(2:10)
Guillaume
2019년 11월 15일
Your y_p never changes in your function. It's always the original 
. Shouldn't y_p be reevaluated at each step?
. Shouldn't y_p be reevaluated at each step?Your 0.0001 delta is iffy as well. It's ok when you're evaluating the derivative for 
but for small x (and y) it's not going to work so well. Should the delta be based on the magnitude of x (and y)?
but for small x (and y) it's not going to work so well. Should the delta be based on the magnitude of x (and y)?댓글 수: 3
Guillaume
2019년 11월 15일
x * 1e-4 or something similar would make more sense to me. That way the delta changes with the magnitude of x.
Matt J
2019년 11월 15일
What you probably have to do is use ode45 or similar to solve the differential equation dy/dx = f(x,y) on some interval. Then, fit f(x,y(x)) with an n-th order smoothing spline. Then, take the derivative of the spline at the point of interest.
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