Yu. Klokov and F. Sadyrbaev.  
Differential Equations with Exponentially Growing Nonlinearities
 

Differential equations of the type $x''+g(x)=f(t,x,x')$ are considered, where $g(x)$ is an exponentially growing nonlinearity and $f$ is a ``slow growth'' function. We derive conditions on $g$ and $f,$ which ensure the superlinear behaviour of solutions. The Dirichlet boundary value problem, for example, has infinitely many solutions.

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