Pl\"ucker Coordinates and the Rosenfeld Planes

Abstract

The exceptional compact hermitian symmetric space EIII is the quotient E6/Spin(10)×Z4U(1). We introduce the Pl\"ucker coordinates which give an embedding of EIII into CP26 as a projective subvariety. The subvariety is cut out by 27 Pl\"ucker relations. We show that, using Clifford algebra, one can solve this over-determined system of relations, giving local coordinate charts to the space. Our motivation is to understand EIII as the complex projective octonion plane (C)P2, whose construction is somewhat scattered across the literature. We will see that the EIII has an atlas whose transition functions have clear octonion interpretations, apart from those covering a sub-variety X∞ of dimension 10. This subvariety is itself a hermitian symmetric space known as DIII, with no apparent octonion interpretation. We give detailed analysis of the geometry in the neighbourhood of X∞. We further decompose X= EIII into F4-orbits: X=Y0 Y∞, where Y0(OP2)C is an open F4-orbit and is the complexification of OP2, whereas Y∞ has co-dimension 1, thus EIII could be more appropriately denoted as (OP2)C. This decomposition appears in the classification of equivariant completion of homogeneous algebraic varieties by Ahiezer Ahiezer.