Loop Heisenberg-Virasoro Lie Conformal algebra

Abstract

Let HV be the loop Heisenberg-Virasoro Lie algebra over with basis \L,i,H,j\,|\,,\,,i,j∈\ and brackets [L,i,L,j]=(-)L+,i+j, [L,i,H,j]=- H+,i+j,[H,i,H,j]=0. In this paper, a formal distribution Lie algebra of HV is constructed. Then the associated conformal algebra CHV is studied, where CHV has a [∂]-basis \Li,Hi\,|\,i∈\ with λ-brackets [Li\, λ \, Lj]=(∂+2λ) Li+j, [Li\, λ \, Hj]=(∂+λ) Hi+j, [Hi\, λ \, Lj]=λ Li+j and [Hi\, λ \, Hj]=0. In particular, the conformal derivations of CHV are determined. Finally, rank one conformal modules and -graded free intermediate series modules over CHV are classified.