Two-point boundary problem for degenerate singularly perturbed system of differential equations in the case of multiple spectrum of principal operator (Q2901707)

The linear singularly perturbed boundary value problem NEWLINE\[NEWLINE \varepsilon^h B(t,\epsilon)\dfrac{dx}{dt} = A(t,\epsilon)x +f(t,\epsilon),\,\, t\in [0,1],\eqno(1)NEWLINE\]NEWLINE NEWLINE\[NEWLINE Mx(x,\epsilon)+Nx(1,\epsilon)= d(\epsilon)\eqno(2) NEWLINE\]NEWLINE is considered, where \(\epsilon\in (0,\epsilon_0] \) is a small parameter, \(h\) is a natural number, \(B(t,\epsilon)\), \(A(t,\epsilon)\), \(M\), \(N\) are \( n\times n\)-matrices, \(x(t,\epsilon)\), \(f(t,\epsilon)\), \(d(\epsilon)\) are correspondingly unknown and given \( n\times 1\)-vectors. The author derives a condition under which there are exists a unique asymptotic representation of the solution of (1), (2).