Loop Grassmannians of quivers and affine quantum groups

Abstract

We construct for each choice of a quiver Q, a cohomology theory A and a poset P a "loop Grassmannian" GP(Q,A). This generalizes loop Grassmannians of semisimple groups and the loop Grassmannians of based quadratic forms. The addition of a dilation torus D⊂Gm2 gives a quantization GPD(Q,A). The construction is motivated by the program of introducing an inner cohomology theory in algebraic geometry adequate for the Geometric Langlands program ['Some extensions of the notion of loop Grassmannians', Rad Hrvat. Akad. Znan. Umjet. Mat. Znan., the Mardesic issue. No. 532, (2017) 53--74.] and on the construction of affine quantum groups from generalized cohomologies ArXiv: 1708.01418.