How to solve the system of linear differential equation of the form x'=Ax+b I can

haciendodedorcp

haciendodedorcp

Answered question

2022-02-17

How to solve the system of linear differential equation of the form
x=Ax+b
I can solve the homogeneous form by finding the eigenvalues and respective eigenvectors, but how to find the particular solution part. Also is there any limitation from getting eigenvalues positive, negative or complex. Any other different method involving matrix algebra is also welcome.

Answer & Explanation

benehmenshgf

benehmenshgf

Beginner2022-02-18Added 7 answers

Being b a fixed constant (suppose detA0, we can choose a new variable x that solves Ax+b=0x=A1b The now we can solve the equation in the fixed point z=xx=x+A1b. This variable solves the following equation z˙=Az In fact, form the definition of z z˙=x˙ Az=A(x+A1b)=Ax+b So we're saying that, if x is a solution to x˙=Ax+b then the variable z=x+A1b is a solution to the simpler equation z˙=Az The solution to this simpler equation is just z(t)=[eAt]z(0) where [eAt] is the exponential of the matrix A. At this point you can go back to find x(t) simply by using the definition of z: x(t)=z(t)A1b=[eAt](x(0)+A1b)A1b= [eAt]x(0)+A1b([eAt]1) where we have used the fact that z(0)=x(0)+A1b Easer way You can even use this simpler method: given the system of equations x˙=Ax+f(t) the solution to this is as follows x(t)=[eAt]x(0)+0teA(tt)f(t)dt in your case the function is just a constant function f(t)=b for which you can see that gives the same solution as before! These methods are good because they let you solve every system of equations of this type because all the informations about the system is embedded into the exponential of the matrix
Elsie Tillman

Elsie Tillman

Beginner2022-02-19Added 5 answers

If b is the columnspace of A, define y so that Ay=-b. Then note that x(t)=eAtx(0)+y solves the differential equation since x=AeAtx(0) and Ax=AeAtx(0)b

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