Nonlinear collective nuclear motion

Abstract

For each real number a Lie algebra of nonlinear vector fields on three dimensional Euclidean space is reported. Although each algebra is mathematically isomorphic to gl(3, R), only the =0 vector fields correspond to the usual generators of the general linear group. The < 0 vector fields integrate to a nonstandard action of the general linear group; the >0 case integrates to a local Lie semigroup. For each , a family of surfaces is identified that is invariant with respect to the group or semigroup action. For positive the surfaces describe fissioning nuclei with a neck, while negative surfaces correspond to exotic bubble nuclei. Collective models for neck and bubble nuclei are given by irreducible unitary representations of a fifteen dimensional semidirect sum spectrum generating algebra gcm(3) spanned by its nonlinear gl(3, R) subalgebra plus an abelian nonlinear inertia tensor subalgebra.

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