Computational homological methods for integrable field theories

Abstract

We develop explicit computational tools for the recent homological approach to the construction of 2-dimensional integrable field theories on Σ from 4-dimensional semi-holomorphic Chern-Simons theory on Σ× C. In this framework, the operation of integrating out the spectral curve C is realized by homotopy transfer of a cyclic L∞-algebra associated with the 4-dimensional theory with prescribed singularities and boundary conditions. We construct explicit strong deformation retracts for divisor-twisted Dolbeault complexes on C=CP1 and use them to make the transferred L∞-structure computationally accessible. As an application, we study the choice of meromorphic 1-form corresponding to the principal chiral model with a Wess-Zumino term. We compute the transferred Maurer-Cartan action and the associated Lax connection, showing that the former resums to the standard principal chiral model action with a Wess-Zumino term and that the latter reproduces the usual Lax connection.

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