Restricted Irreducible Representations for the Non-graded Hamiltonian H(2; (1,1); (1))

Abstract

We classify the simple restricted modules for the minimal p-envelope of the non-graded, non-restricted Hamiltonian Lie algebra H(2; (1,1); (1)) over an algebraically closed field k of characteristic p ≥ 5. We also give the restrictions of these modules to a subalgebra isomorphic to the first Witt Algebra, a result stated in [S. Herpel and D. Stewart, Selecta Mathematica 22:2 (2016) 765--799] with an incomplete proof.