Quantum lump dynamics on the two-sphere

Abstract

It is well known that the low-energy classical dynamics of solitons of Bogomol'nyi type is well approximated by geodesic motion in Mn, the moduli space of static n-solitons. There is an obvious quantization of this dynamics wherein the wavefunction evolves according to the Hamiltonian H0 equal to (half) the Laplacian on Mn. Born-Oppenheimer reduction of analogous mechanical systems suggests, however, that this simple Hamiltonian should receive corrections including k, the scalar curvature of Mn, and C, the n-soliton Casimir energy, which are usually difficult to compute, and whose effect on the energy spectrum is unknown. This paper analyzes the spectra of H0 and two corrections to it suggested by work of Moss and Shiiki, namely H1=H0+k/4 and H2=H1+C, in the simple but nontrivial case of a single CP1 lump moving on the two-sphere. Here M1=TSO(3), a noncompact kaehler 6-manifold invariant under an SO(3)xSO(3) action, whose geometry is well understood. The symmetry gives rise to two conserved angular momenta, spin and isospin. A hidden isometry of M1 is found which implies that all three energy spectra are symmetric under spin-isospin interchange. The Casimir energy is found exactly on the zero section of TSO(3), and approximated numerically on the rest of M1. The lowest 19 eigenvalues of Hi are found for i=0,1,2, and their spin-isospin and parity compared. The curvature corrections in H1 lead to a qualitatively unchanged low-level spectrum while the Casimir energy in H2 leads to significant changes. The scaling behaviour of the spectra under changes in the radii of the domain and target spheres is analyzed, and it is found that the disparity between the spectra of H1 and H2 is reduced when the target sphere is made smaller.