The orbit method for the Virasoro algebra
Abstract
Let W = C[t, t-1]∂t be the Witt algebra of algebraic vector fields on C× and let V\!ir be the Virasoro algebra, the unique nontrivial central extension of W. In 2023, Petukhov and Sierra showed that Poisson primitive ideals of S(W) and S(V\!ir) can be constructed from elements of W* and V\!ir* of a particular form, called local functions. In this paper, we show how to use a local function on W or V\!ir to construct a representation of the Lie algebra. We further show that the annihilators of these representations are new completely prime primitive ideals of U(W) and U(V\!ir). We use this to define a Dixmier map from the Poisson primitive spectrum of S(V\!ir), respectively S(W), to the primitive spectrum of U(V\!ir), respectively U(W), successfully extending the orbit method from finite-dimensional solvable Lie algebras to our countable-dimensional setting. Our method involves new ring homomorphisms from U(W) to the tensor product of a localized Weyl algebra and the enveloping algebra of a finite-dimensional solvable subquotient of W. We further show that the kernels of these homomorphisms are intersections of the primitive ideals constructed from natural subsets of W*. As a corollary, we disprove the conjecture that any primitive ideal of U(W) is the kernel of some map from U(W) to the first Weyl algebra.
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