Cosets of the Wk(sl4, fsubreg)-algebra

Abstract

Let Wk(sl4, f subreg) be the universal W-algebra associated to sl4 with its subregular nilpotent element, and let Wk(sl4, f subreg) be its simple quotient. There is a Heisenberg subalgebra H, and we denote by Ck the coset Com(H, Wk(sl4, f subreg)), and by Ck its simple quotient. We show that for k=-4+(m+4)/3 where m is an integer greater than 2 and m+1 is coprime to 3, Ck is isomorphic to a rational, regular W-algebra W(slm, freg). In particular, Wk(sl4, f subreg) is a simple current extension of the tensor product of W(slm, freg) with a rank one lattice vertex operator algebra, and hence is rational.