Infinitely many solutions for a class of resonant problems
Abstract
We consider radially symmetric solutions for a class of resonant problems on a unit ball B ⊂ Rn around the origin \[ u+ 1 u +g(u)=f(r) for x ∈ B, u=0 on ∂ B \,. \] Here the function g(u) is periodic of mean zero, x ∈ Rn, r=|x|, 1 is the principal eigenvalue of on B. The problem has either infinitely many or finitely many solutions depending on the space dimension n. The situation turns out to be different for each of the following cases: 1 ≤ n ≤ 3, n=4, n=5, n=6, and n ≥ 7.
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