Abstract
In this paper we establish the existence of three weak solutions of an equation which involves a general elliptic operator in divergence form (in particular, a p -Laplacian operator), while the nonlinearity has a ( p − 1 ) -sublinear growth at infinity. This result completes some recent papers, where mountain pass type solutions were obtained providing the nonlinear term via a ( p − 1 ) -superlinear growth at infinity (fulfilling an Ambrosetti–Rabinowitz type condition). In our case, an abstract critical point result is applied, proved by G. Bonanno [G. Bonanno, Some remarks on a three critical points theorem, Nonlinear Analysis 54 (2003) 651–665].
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