Positive solutions of singular Dirichlet and periodic boundary value problems

Let A and T be positive numbers. The singular differential equation (r(x)x′)′ = μq(t)f(t, x) is considered. Here r > 0 on (0, A] may be singular at x = 0, and f(t, x) ≤ 0 may be singular at x = 0 and x = A. Effective sufficient conditions imposed on r, μ, q, and f are given for the existence of a solution x to the above equation satisfying either the Dirichlet conditions x(0) = x(T) = 0 or the periodic conditions x(0) = x(T), x′(0) = x′(T), and, in addition, 0 < x < A on (0, T).