The LLV Algebra for Primitive Symplectic Varieties with Isolated Singularities

Abstract

We extend results of Looijenga--Lunts and Verbitsky and show that the total Lie algebra g for the intersection cohomology of a primitive symplectic variety X with isolated singularities is isomorphic to g so((IH2(X, Q), QX) h), where QX is the intersection Beauville--Bogomolov--Fujiki form and h is a hyperbolic plane. This gives a new, algebraic proof for irreducible holomorphic symplectic manifolds which does not rely on the hyperkähler metric. Along the way, we study the structure of IH*(X, Q) as a g-representation -- with particular emphasis on the Verbitsky component, multidimensional Kuga--Satake constructions, and Mumford--Tate algebras -- and give some immediate applications concerning the P = W conjecture for primitive symplectic varieties.

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