Strictification and gluing of Lagrangian distributions on derived schemes with shifted symplectic forms

Abstract

A strictification result is proved for isotropic distributions on derived schemes equipped with negatively shifted homotopically closed 2-forms. It is shown that any derived scheme over C equipped with a -2-shifted symplectic structure, and having a Hausdorff space of classical points, admits a globally defined Lagrangian distribution as a dg C∞-manifold.