Computing a differential equation using a bessel function.
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How do we use the bessel function of :
y = besselj(0,x)
to compute the differntial equation of 
?
?1 comentario
John D'Errico
el 23 de Oct. de 2022
Please dont ask exactly the same question again, just to get yet more information. I closed your first question.
Respuesta aceptada
The solution y of this differential equation is a combination of J_0(x) and Y_0(x), the Bessel function of the first and second kind of order 0.
So using it to solve the differential equation makes no sense.
syms x y(x)
eqn = diff(y,x,2)*x^2 + diff(y,x)*x + x^2*y == 0;
Dy = diff(y,x);
conds = [y(0)==1,Dy(0)==0];
sol = dsolve(eqn,conds);
hold on
fplot(sol,[0 100])
x = 0:0.1:100;
plot(x,besselj(0,x))
hold off
7 comentarios
Howie
el 23 de Oct. de 2022
Torsten
el 23 de Oct. de 2022
"this" is what ?
Howie
el 23 de Oct. de 2022
See above. You have to specify two initial conditions for the differential equation to get a unique solution. The conditions y(0) = 1 and y'(0) = 0 give J_0(x). As noted, other initial conditions will give a "mixture" of J0(x) and Y0(x).
Howie
el 23 de Oct. de 2022
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