Separation of branches of O(N-1)-invariant solutions for a semilinear elliptic equation
Abstract
We consider a semilinear elliptic problem in an annulus of RN, with N>1. Recent results ensure that there exists a sequence pk of exponents of the nonlinear term at which a nonradial bifurcation from the radial solution occurs. Exploiting the properties of O(N-1)-invariant spherical harmonics, we introduce two suitable cones K1 and K2 of O(N-1)-invariant functions that allow to separate the branches of bifurcating solutions from the others, getting the unboundedness of these branches.
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