Graded Thread Modules over the Positive Part of the Witt (Virasoro) Algebra

Abstract

We study Z-graded thread W+-modules V=i Vi, \; Vi=1, -∞ k< i < N +∞, \; Vi=0, \; \; otherwise, over the positive part W+ of the Witt (Virasoro) algebra W. There is well-known example of infinite-dimensional (k=-∞, N=∞) two-parametric family Vλ, μ of W+-modules induced by the twisted W-action on tensor densities P(x)xμ(dx)-λ, μ, λ ∈ K, P(x) ∈ K[t]. Another family Cα, β of W+-modules is defined by the action of two multiplicative generators e1, e2 of W+ as e1fi=α fi+1 and e2fj=β fj+2 for i,j ∈ Z and α, β are two arbitrary constants (eifj=0, i 3). We classify (n+1)-dimensional graded thread W+-modules for n sufficiently large n of three important types. New examples of graded thread W+-modules different from finite-dimensional quotients of Vλ, μ and Cα, β were found.