Abstract. We establish some oscillation theorems for the nonlinear differential equation $$ [p(t)g(x)x']'+q(t)f(x)=r(t) $$ where $q,r\colon[t_0,+\infty )\to{\msbm R}$ are continuous functions and $p\colon[t_0,+\infty )\to(0,+\infty )$, $g\colon{\msbm R}\to(0,+\infty )$, $f\colon{\msbm R}\to{\msbm R}$ are continuously differentiable functions.
AMS Subject Classification
(1991): 34C10, 34C15
Received May 7, 1998. (Registered under 2699/2009.)
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