1.2 Existence and uniqueness for linear first order ode in \(y\)
These are ode’s in the form
\[ y^{\prime }+p\left ( x\right ) y=q\left ( x\right ) \]
The theorem says that if both
\(p\left ( x\right ) ,q\left ( x\right ) \) are continuous at
\(x_{0}\) then
solution exists and is unique. Notice that now we do not check on
\(y_{0}\) but only on
\(x_{0}\). We get
both existence and uniqueness all in one test. If either
\(p\) or
\(q\) are not continuous, then no
guarantee solution exist or be unique.