On a Chouinard's formula for $C$-quasi-injective dimension

The $C$-quasi-injective dimension is a recently introduced homological invariant that unifies and extends the notions of quasi-injective dimension and of injective dimension with respect to a semidualizing module, previously studied by Gheibi and by Takahashi and White, respectively. In the main results of this paper, we provide extensions of the Bass'formula and a version of the Chouinard's formula for modules of finite $C$-quasi-injective dimension over an arbitatry ring.