A Criterion for the Algebraic Density Property of Affine SL2-Manifolds

Abstract

Let B be an affine k-domain which admits a nontrivial fundamental pair (D,U) of locally nilpotent derivations, i.e., if E=[D,U] then (D,U,E) is an sl2-triple. We prove an algebraic criterion, characterizing under which conditions the fundamental pair (D,U) resp. the triple (D,U,E) is compatible in a technical sense that allows us to construct many vector fields on the spectrum of B from the complete ones. This criterion enables us to prove the algebraic density property for the following widely studied classes of SL2-varieties arising in physics: Classical Calogero--Moser spaces, Calogero--Moser spaces with "inner degrees of freedom'' and smooth cyclic quiver varieties.

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