Equivariant recollements and singular equivalences

In this paper we investigate equivariant recollements of abelian (resp. triangulated) categories. We first characterize when a recollement of abelian (resp. triangulated) categories induces an equivariant recollement, i.e. a recollement between the corresponding equivariant abelian (resp. triangulated) categories. We further investigate singular equivalences in the context of equivariant abelian recollements. In particular, we characterize when a singular equivalence induced by the quotient functor in an abelian recollement lift to a singular equivalence induced by the equivariant quotient functor. As applications of our results: (i) we construct equivariant recollements for the derived category of a quasi-compact, quasi-separated scheme where the action is coming from a subgroup of the automorphism group of the scheme and (ii) we derive new singular equivalences between certain skew group algebras.