The monodromy of T-folds and T-fects

Abstract

We construct a class of codimension-2 solutions in supergravity that realize T-folds with arbitrary O(2,2,Z) monodromy and we develop a geometric point of view in which the monodromy is identified with a product of Dehn twists of an auxiliary surface fibered on a base B. These defects, that we call T-fects, are identified by the monodromy of the mapping torus obtained by fibering over the boundary of a small disk encircling a degeneration. We determine all possible local geometries by solving the corresponding Cauchy-Riemann equations, that imply the equations of motion for a semi-flat metric ansatz. We discuss the relation with the F-theoretic approach and we consider a generalization to the T-duality group of the heterotic theory with a Wilson line.