

Is modular it parameterises Riemann surfaces possibly with nodes on

We use a partialĬompactification ¯ ¯¯¯ ¯ N g, h, r, s into an orbifold with corners, The boundary marked points will play the role of openīoundary components, and the marked points in the interior (after weĪdd the data corresponding to the parameterisation) will play the Marked points on the boundary, and s marked points in the Riemann surfaces of genus g, with h boundary components, r Consider the moduli space N g, h, r, s of Let me describe briefly how these cellular models for moduli spaceĪre constructed. 7.3 Open topological conformal field theories and A ∞ categories.6.2 Generators and relations for D d o p e n.6 Combinatorial models for categories controlling open-closed topological conformal field theory.4.1 Differential graded symmetric monoidal categories.4 Some homological algebra for symmetric monoidal categories.3 The open-closed moduli spaces in more detail.2.5 Comparing the TCFT associated to Gromov-Witten theory.2.4 The TCFT associated to Gromov-Witten invariants.2.3 Gromov-Witten invariants and the Fukaya category.1.6 The non-unital version of the result.1.5 Relations to the work of Moore-Segal and Lazariou.1.1 Topological conformal field theories.
