On the Topology of T-manifolds of Higher Codimension

Abstract

This paper undertakes the study of the topology of T-manifolds of arbitrary codimension obtained by combinatorial patchworking with real phase structure as described by Brugall\'e, L\'opez de Medrano and Rau (2024). We prove new bounds on the number of connected components of T-curves and T-surfaces. For sufficiently high codimension, this improves the results of Brugall\'e, L\'opez de Medrano and Rau (2024). In addition, we present a new description of patchworking \`a la Viro for T-manifold of codimension 2. We use this method to construct a family of maximal real algebraic curves in RP3.