Reducibility of linear differential equations in a Banach space with quasiperiodic coefficients (Q912270)

The equation \(dx/dt=A_ 0x+B(t)x\) where \(A_ 0:\) \(D(A_ 0)\subset X\to X\) is a spectral operator, X is a complex Banach space and B: \({\mathbb{R}}\to L(X)\) is a quasiperiodic function, under the suitable condition is reduced to a linear differential equation with constant coefficients.