Solutions of a nonlinear differential equation near singular points

We consider the nonlinear singular differential equation where µ and σ are two positive Radon measures on 0 ω not charging points. For a regular function f and under some hypotheses on A, we prove the existence of an infinite number of nonnegative solutions. Our approach is based on the use of the

## Abstract We solve a Fuchsian system of singular nonlinear partial differential equations with resonances. These equations have no smooth solutions in general. We show the solvability in a class of finitely smooth functions. Typical examples are a homology equation for a vector field and a degene

We continue the study of limit-pointrlimit-circle type differential equations of the nth order. In particular, we show that the differential expression y Ž4 k . q ry, k s 1, 2, . . . , is never of the limit-circle type as long as r is not an unbounded oscillatory function; this partially answers an