The Z2-orbifold of the W3-algebra

Abstract

The Zamolodchikov W3-algebra Wc3 with central charge c has full automorphism group Z2. It was conjectured in the physics literature over 20 years ago that the orbifold (Wc3)Z2 is of type W(2,6,8,10,12) for generic values of c. We prove this conjecture for all c ≠ 559 7 7665795, and we show that for these two values, the orbifold is of type W(2,6,8,10,12,14). This paper is part of a larger program of studying orbifolds and cosets of vertex algebras that depend continuously on a parameter. Minimal strong generating sets for orbifolds and cosets are often easy to find for generic values of the parameter, but determining which values are generic is a difficult problem. In the example of (Wc3)Z2, we solve this problem using tools from algebraic geometry.