The Manakov-Zakharov-Ward model as an integrable decoupling limit of the membrane

Abstract

A novel decoupling limit of the membrane is proposed, leading to the (1+2)-dimensional classically integrable model originally introduced by Manakov, Zakharov, and Ward. This limit is the large-wrapping regime of a membrane propagating toy background of the form Rt × T2 × G subject to scaling limit, where G is a Lie group and the geometry is supported by a four-form flux. Such toy backgrounds can arise from consistent eleven-dimensional supergravity solutions, exemplified by the uplift of the pure NSNS AdS3 × S3 × T4 background. The scaling limit can be interpreted as similtaneous small tension and non- or hyper-relativistic limit.