Frobenius–Schur indicators for twisted Real representation theory and two dimensional unoriented topological field theory

We construct a two dimensional unoriented open/closed topological field theory from a finite graded group $\pi :\hat{G}\twoheadrightarrow \{1,-1\}$, a π-twisted 2-cocycle $\hat{\theta }$ on $B\hat{G}$ and a character $\lambda :\hat{G}\to U\left(1\right)$. The underlying oriented theory is a twisted Dijkgraaf–Witten theory. The construction is based on a detailed study of the $(\hat{G},\hat{\theta },\lambda )$-twisted Real representation theory of $\ker \pi$. In particular, twisted Real representations are boundary conditions of the unoriented theory and the generalized Frobenius–Schur element is its crosscap state.