Unbounded Branches of Non-Radial Solutions to Semilinear Elliptic Systems on a Disc and their Patterns
Abstract
In this paper, we leverage the O(2) × Z-equivariant Leray-Schauder degree and a novel characterization of the Burnside Ring A(O(2) × Z2) presented by Ghanem in Ghanem1 to obtain ( i) an existence result for non-radial solutions to the problem - u = f(z,u) + Au, u|∂ D = 0 and ( ii) local and global bifurcation results for multiple branches of non-radial solutions to the one-parameter family of equations - u = f(z,u) + A(α)u, u|∂ D = 0, where D is the planar unit disc, u(z) ∈ RN, A : RN → RN is an N × N matrix, A: R → L( RN) is a continuous family of N × N matrices and f: D × RN → RN is a sublinear, O(2) × Z2-equivariant function of order o(|u|) as u approaches the origin in RN.
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