Let $A$ be a continuous function, periodic of period $T > 0$. We are interested in the homogeneous differential system $$\forall t \in \mathbb { R } , \quad X ^ { \prime } ( t ) = A ( t ) X ( t ) \tag{IV.1}$$ $B \in \mathrm { GL } _ { 2 } ( \mathbb { C } )$ is the Floquet matrix of (IV.1) and its eigenvalues are the Floquet multipliers. Assume that the matrix $B$ is diagonalizable. Give a necessary and sufficient condition on the Floquet multipliers for the differential system (IV.1) to admit an unbounded solution on $\mathbb { R }$.
Let $A$ be a continuous function, periodic of period $T > 0$. We are interested in the homogeneous differential system
$$\forall t \in \mathbb { R } , \quad X ^ { \prime } ( t ) = A ( t ) X ( t ) \tag{IV.1}$$
$B \in \mathrm { GL } _ { 2 } ( \mathbb { C } )$ is the Floquet matrix of (IV.1) and its eigenvalues are the Floquet multipliers. Assume that the matrix $B$ is diagonalizable. Give a necessary and sufficient condition on the Floquet multipliers for the differential system (IV.1) to admit an unbounded solution on $\mathbb { R }$.