Invariant operator due to F. Klein quantizes H. Poincare's dodecahedral 3-manifold

Abstract

The eigenmodes of the Poincar\'e dodecahedral 3-manifold M are constructed as eigenstates of a novel invariant operator. The topology of M is characterized by the homotopy group π1(M), given by loop composition on M, and by the isomorphic group of deck transformations deck(M), acting on the universal cover M. (π1(M), M) are known to be the binary icosahedral group H3 and the sphere S3 respectively. Taking S3 as the group manifold SU(2,C) it is shown that deck(M) Hr3 acts on SU(2,C) by right multiplication. A semidirect product group is constructed from Hr3 as normal subgroup and from a second group Hc3 which provides the icosahedral symmetries of M. Based on F. Klein's fundamental icosahedral H3-invariant, we construct a novel hermitian H3-invariant polynomial (generalized Casimir) operator K. Its eigenstates with eigenvalues quantize a complete orthogonal basis on Poincar\'e's dodecahedral 3-manifold. The eigenstates of lowest degree λ=12 are 12 partners of Klein's invariant polynomial. The analysis has applications in cosmic topology LA,LE. If the Poincar\'e 3-manifold M is assumed to model the space part of a cosmos, the observed temperature fluctuations of the cosmic microwave background must admit an expansion in eigenstates of K.

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