We consider the Schrodinger equation
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,
where N >= 2, lambda,mu > 0 are parameters, V, K, L : R-N -> R are radially symmetric potentials, f : R -> R is a continuous function with sublinear growth at infinity, and g : R -> R is a continuous sub-critical function. We first prove that for lambda small enough no non-zero solution exists for (P-lambda,P-0), while for A large and /./ small enough at least two distinct non-zero radially symmetric solutions do exist for (P-lambda,P-mu). By exploiting a Ricceri-type three-critical points theorem, the principle of symmetric criticality and a group-theoretical approach, the existence of at least N - 3 (N mod 2) distinct pairs of non-zero solutions is guaranteed for (P-lambda,P-mu) whenever lambda is large and mu is small enough, N does not satisfy 3, and f,g are odd.

• 出版日期2013-9