Why is the resulting time-domain curve from Euler method and ode45 not stable?

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Ni Made Ayu Sinta Dewi
Ni Made Ayu Sinta Dewi el 12 de En. de 2021
Respondida: Mischa Kim el 13 de En. de 2021
I am writing a program to obtain the solution of an undamped free vibration system. At first, I used the Euler method and the resulting time-domain curve seemed normal (perfectly sinusoidal with the initial displacement as the amplitude). But when I checked the peaks using findpeaks, its value increased continuously (0.1, 0.1001, 0.1002, and so on). Then, I used the ode45 to do the same. The peaks of the time-domain curve decreased continuously from the initial displacement (0.1, 0.0999, 0.0998, and so on). Why is this happening? Am I doing something wrong?
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Ni Made Ayu Sinta Dewi
Ni Made Ayu Sinta Dewi el 13 de En. de 2021
Thank you for reading my problem. This is the code using Euler method.
m=1;
k=16;
kr=0.5;
ks=k*kr;
ke=(k*ks)/(k+ks);
c=0;
fs=100000;
dt=1/fs;
t=0:dt:20;
F1=0*sin(2*pi*t);
F=F1;
A=[0 1;-ke/m -c/m];
B=[0;1/m];
y=zeros(2,length(t));
y(1,1)=0.1;
y(2,1)=0;
for i=2:length(t)
dx=A*y(:,i-1)+B*F(:,i-1);
x=y(:,i-1)+dx*dt;
y(:,i)=x;
end
%FFT
L=numel(t)-1;
f=0:fs/L:fs/2;
Y=fft(y(1,:));
P2=abs(Y/L);
P1=P2(1:L/2+1);
P1(2:end-1)=2*P1(2:end-1);
subplot(2,1,1)
plot(t,y(1,:));
subplot(2,1,2)
plot(f,P1);
[pks_y,locs_t]=findpeaks(y(1,:));
The resulting peaks are shown here. As I have said previously, the amplitude is increasing continuously.
>> format long
>> pks_y
pks_y =
Columns 1 through 5
0.100007255462951 0.100014511451836 0.100021767966689 0.100029025007554 0.100036282574466
Columns 6 through 7
0.100043540667467 0.100050799286586
This is the code using ode45.
t0=0;
tf=20;
T=0.00001;
n=(tf-t0)/T;
seq=0:n;
tspan=T*seq;
x0=[0.1 0]';
[t,x]=ode45(@state_space,tspan,x0);
[ba,ko]=size(x);
N=ba;
T=tf/ba;
k=0:N-1;
f=k*(1/(N*T));
magF=2/ba*abs(fft(x));
subplot(211)
plot(t,x(:,1))
subplot(212)
N1=round(N/2000);
plot(f(1:N1),magF(1:N1,1),'r')
[pks,locs]=findpeaks(x(:,1));
function dx=odefun(t,x)
m=1;
k=16;
kr=0.5;
ks=k*kr;
ke=(k*ks)/(k+ks);
A=[0 1;-ke/m 0];
dx=A*x;
The resulting peaks are shown here. The amplitude is decreasing continuously.
>> format long
>> pks
pks =
0.100004887335947
0.099986382626947
0.099968120795277
0.099949910847763
0.099931713047562
0.099913520122880
0.099895330803077

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Mischa Kim
Mischa Kim el 13 de En. de 2021
Hi Ni Made Ayu Sinta Dewi, there is nothing you are doing wrong. What you are seeing is expected behavior. This is because you are using a numerical solver (e.g. ode45) to solve the differential equation. Numerical solutions are not exact solutions, they are only approximations. However, you have some control regarding the accuracy of the solution. E.g. you can set tolerance levels:
options = odeset('RelTol',1e-13); % the smaller the tolerance, the more accurate the result
[t,x] = ode45(@state_space,tspan,x0,options);

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