Cohen-Montgomery duality for bimodules and singular equivalences of Morita type

Let $G$ be a group and $\Bbbk$ a commutative ring. All categories and functors are assumed to be $\Bbbk$-linear. We define a $G$-invariant bimodule ${}_SM_R$ over $G$-categories $R, S$ and a $G$-graded bimodule ${}_BN_A$ over $G$-graded categories $A, B$, and introduce the orbit bimodule $M/G$ and the smash product bimodule $N\# G$. We will show that these constructions are inverses to each other. This will be applied to Morita equivalence, stable equivalences of Morita type, singular equivalences of Morita type, and singular equivalences of Morita type with level.
Comment: 40 pages. Sect. 6 changed and corrected