The affine Grassmannian as a presheaf quotient

Abstract

For a reductive group G over a ring A, its affine Grassmannian GrG plays important roles in a wide range of subjects and is typically defined as the \'etale sheafification of the presheaf quotient LG/L+G of the loop group LG by its positive loop subgroup L+G. We show that the Zariski sheafification gives the same result. Moreover, for totally isotropic G (for instance, for quasi-split G), we show that no sheafification is needed at all: GrG is already the presheaf quotient LG/L+G, which seems new already in the classical case of G over C. For totally isotropic G, we also show that the affine Grassmannian may be formed using polynomial loops. We deduce all of these results from the study of G-torsors on P1A that is ultimately built on the geometry of BunG.