K\"ahler Soliton Surfaces Are Generically Toric

Abstract

Let (M, g, ω, f, λ) be a K\"ahler gradient Ricci soliton in real dimension four. One first observes that it is an integrable Hamiltonian system in a classical sense. Indeed, all known complete examples are toric and the symmetry is intrinsically related to the potential function f and the scalar curvature . While another article addresses the case that these functions are functionally dependent, this one considers the independent case. The main result states that the soliton admits a toric action under a generic assumption. That is, one assumes that the system is non-degenerate and the potential function f is proper. Then there is an effective, completely integrable Hamiltonian toric T2- action on (M, ω).

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