Asymptotic solution of the Cauchy problem for a first-order equation with a small parameter in a Banach space. The regular case (Q722148)

The asymptotic solution of the Cauchy problem for a linear inhomogeneous ordinary first-order differential equation with a small parameter on the right-hand side of an equation in a Banach space is constructed. The singularity of the problem: the coefficient of the derivative of the unknown function is a Fredholm operator with zero index and one-dimensional kernel. It is interesting that the small parameter is not a coefficient of the derivative of an unknown function, but there is a boundary layer in the neighborhood of the initial point. The constructed asymptotic solution is justified, i.e., an estimate for the remainder is obtained.