On Bifurcation and Symmetry of Solutions of Symmetrical Nonlinear Equations with Odd-Harmonic Forcings

In this work we study existence, bifurcation, and symmetries of small solutions of the nonlinear equation Lx = N(x, p, ϵ) + μƒ, which is supposed to be equivariant under the action of a group OHm, and where ƒ is supposed to be OHm-invariant. We assume that L is a linear operator and N(•, p, ϵ) is a nonlinear operator, both defined in a Banach space X, with values in a Banach space Z, and p, μ, and ϵ are small real parameters. Under certain conditions we show the existence of symmetric solutions and under additional conditions we prove that these are the only feasible solutions. Some examples of nonlinear ordinary and partial differential equations are analyzed.