Modules over the algebra $\mathcal{V}ir(a,b)$

Abstract: For any two complex numbers $a$ and $b$, $\mathcal{V} ir(a,b)$ is a central extension of $\mathcal{W}(a,b)$ which is universal in the case $(a,b)\neq (0,1)$, where $\mathcal{W}(a,b)$ is the Lie algebra with basis ${L_n,W_n\mid n\in\Z}$ and relations $[L_m,L_n]=(n-m)L_{m+n}$, $[L_m,W_n]=(a+n+bm)W_{m+n}$, $[W_m,W_n]=0$. In this paper, we construct and classify a class of non-weight modules over the algebra $\mathcal{V} ir(a,b)$ which are free $U(\mathbb{C} L_0\oplus\mathbb{C} W_0)$-modules of rank $1$. It is proved that such modules can only exist for $a=0$.