Abstract
Analytical properties like existence, uniqueness, and asymptotic behavior of solutions are studied for the following singular initial value problem: g(i) (t)y'(i) (t) = a(i)y(i) (t)(1 + f(i) (t, y(t), integral(t)(0+) K-i (t, s, y(t), y(s)) ds)), y(i) (0(+)) = 0, t is an element of(0, t(0)], where y = (y(1), ... , y(n)), a(i) > 0, i = 1, ... , n are constants and t(0) > 0. An approach which combines topological method of T. Wazewski and Schauder's fixed point theorem is used. Particular attention is paid to construction of asymptotic expansions of solutions for certain classes of systems of integrodifferential equations in a right-hand neighbourhood of a singular point.