Equivariant Cartan-Eilenberg supergerbes for the Green-Schwarz superbranes III. The wrapping anomaly and the super-${\rm AdS}_5\times\mathbb{S}^5$ background

Abstract: This is a continuation of a programme, initiated in the work arXiv:1706.05682 [hep-th], of supersymmetry-equivariant geometrisation of the Green-Schwarz super-$(p+2)$-cocycles coupling to the topological charges carried by super-$p$-branes of the superstring theory on reductive homogeneous spaces of supersymmetry Lie supergroups. In the present part, the ideas and geometro-algebraic tools developed previously are substantially enhanced, adapted to and applied in the physically significant curved backround of Metsaev and Tseytlin, determining the propagation of the critical superstring in the super-${\rm AdS}_5\times\mathbb{S}^5$ geometry. The analysis brings to the fore the r^ole, in the geometrisation scheme proposed, of the wrapping anomaly of the Poisson algebra of the Noether charges of the rigid symmetries of the relevant super-{\sigma}-model that lift the geometric symmetries of the supertarget. In particular, the significance of the charges quantifying the monodromy of the Grassmann-odd coordinates in the Kosteleck\'y-Rabin-type quotient of the supertarget is emphasised. A trivial super-1-gerbe is associated with the Metsaev-Tseytlin super-3-cocycle over the super-${\rm AdS}_5\times\mathbb{S}^5$ target. The issue of compatibility of the geometrisation with the .In\"on\"u-Wigner contraction of the supersymmetry Lie superalgebra to its flat-superspace counterpart is investigated at some length, revealing the rigidity of the relevant Cartan-Eilenberg cohomology and signalling an attractive potential alternative to the non-contractible trivial super-1-gerbe constructed.