Irreducible -Verma modules for hyperelliptic Heisenberg algebras

Abstract

We study induced representations of the universal central extension g = (sl2 R) R1/dR, where R = C[t 1, u]/(u2 - p(t)) is a hyperelliptic coordinate ring and p(t) has degree r+1. The center of g has dimension r+1. Inside g sits a hyperelliptic Heisenberg subalgebra h. A sign function Z \0\ \+,-\ determines a nonstandard polarization of the imaginary modes, yielding -Verma modules Mh, and M. Under the specialization 1 = ·s = r = 0 and a p-admissibility condition on , we prove: Mh, is irreducible if and only if 0 ≠ 0, and the same criterion governs M after parabolic induction. For the four-point case r=1, we remove the specialization and treat general central characters (0, 1) ∈ C2: under p-admissibility, Mh, is irreducible if and only if (0, 1) ≠ (0,0) (Theorem A'). A key ingredient is the closed form mn(a) = δm+n, 0\, ω1 for all m, n when r=1, placing the mixed b1-b bracket on the anti-diagonal, independent of the hyperelliptic parameter. We also give a finite checkable criterion for p-admissibility via reachable sets in Z. We further describe the weight-space decomposition and formal character of Mh, , provide a complete structure theorem for the level-zero case, and prove that p-admissibility is sharp by constructing explicit reducible modules at nonzero level for non-admissible polarizations.