It has been known since a paper of Armbruster and Chossat (AC91) that robust heteroclinic cycles between equilibria can bifurcate in differential systems which are invariant under the action of the groupO(3) defined as the sum of its “natural” irreducible representations of degrees 1 and 2 (i.e., of dimensions 3 and 5). Moreover, these cycles can be seen numerically in the simulation of the amplitude equations resulting from a center manifold reduction of the Bénard problem in a nonrotating spherical shell with suitable aspect ratio (FH86). In the present work we first generalize the results of AC91to the interactions of irreducible representations of degrees ℓ and ℓ+1 for any ℓ0. Heteroclinic cycles of various types are shown to exist under certain “generic” conditions and are classified. We show in particular that these conditions are satisfied in most cases when the differential system proceeds from a ℓ, ℓ+1 mode interaction bifurcation in the spheri
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