Homogeneous linear systems: constant coefficients: Difference between revisions

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(Created page with "Category:Differential Equations Homogeneous linear systems of ODEs take the following form: <math> \vec{x}'=Ax </math> Similar to the scalar case, we look for some exponential solutions: <math> \vec{x}=e^{rt}\vec{\xi } </math>")
 
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<math>
<math>
\vec{x}=e^{rt}\vec{\xi }
\vec{x}=e^{rt}\vec{\xi }
</math>
Doing some basic differentiation and substitution from the above two equations, we get
<math>
r\vec{\xi}=A\vec{\xi}
</math>
Notice that \xi is an [[eigenvector]]. The entire eigenspace is solutions. As such, we use the characteristic polynomial
<math>
A-\lambda I
</math>
where lambda is the eigenvalues.
There are cases where there are repeated roots.
There will be a general solution if A is [[diagonalization|diagonalizable]] and n eigenvectors are linearly independent and form a basis in R^n, where we get the fundamental set
<math>
e^{r_1t}\xi^{(1)}, \ldots, e^{r_nt}\xi^{(n)}
</math>
The [[Wronskian]] is then
<math>
e^{t\sum r}|\xi^{(1)}, \xi^{(1)}|
</math>
</math>

Latest revision as of 17:15, 10 June 2024


Homogeneous linear systems of ODEs take the following form:

Similar to the scalar case, we look for some exponential solutions:

Doing some basic differentiation and substitution from the above two equations, we get

Notice that \xi is an eigenvector. The entire eigenspace is solutions. As such, we use the characteristic polynomial

where lambda is the eigenvalues.

There are cases where there are repeated roots.

There will be a general solution if A is diagonalizable and n eigenvectors are linearly independent and form a basis in R^n, where we get the fundamental set

The Wronskian is then