Asymptotic integration of a singularly perturbed problem with multiple spectrum under violation of the stability condition (Q1901938)

In a real finite-dimensional Hilbert space \(H\) the authors consider the singularly perturbed Cauchy problem (1) \(\varepsilon \dot y - A(t)y = h(t)\), \(y(0, \varepsilon) = y^*\), \(t \in [0, \alpha]\), under specific assumptions for the spectrum of the operator \(A(t)\) which are weaker than the stability conditions supposed by \textit{S. A. Lomov} [Introduction to the general theory of singular perturbations. Moscow (1981; Zbl 0514.34049)]. Under these assumptions (which include certain orthogonality conditions for the right-hand side \(h(t)\) in the points where the operator \(A(t)\) is not invertible) they calculate a regularized asymptotic expansion of the solution of (1) for \(\varepsilon \to + 0\).